Precipitation and Dissolution of Iron and Manganese ...

Precipitation and Dissolution of Iron and Manganese Oxides

by

Scot T. Martin

Division of Engineering and Applied Sciences 29 Oxford St., Pierce Hall, Room 122 Harvard University, Cambridge, MA 02138

E-mail: [email protected] Web: http://www.deas.harvard.edu/~smartin

Submitted: September 2003

Chapter 4 of Environmental Catalysis (Editor, Vicki H. Grassian)

1

1. Introduction

2

Iron and manganese are the first and third most abundant transition metals in the

3

earth’s crust (5.6 × 104 ppm and 9.5 × 102 ppm, respectively) (1). The redox chemistries

4

of iron II/III and manganese II/III/IV have important roles and impacts in the

5

environment (2-5). In contrast, the second most abundant transition metal, titanium (5.7 ×

6

103 ppm), occurs only in the IV oxidation state. Abundant crustal aluminosilicates, such

7

as clays and quartz, also lack a dynamic redox chemistry in natural waters (6).

8

Redox chemistry strongly influences the precipitation and dissolution of Fe and

9

Mn solid phases (Figure 1) (7-10). Aqueous Fe(II) and Mn(II) are significant in natural

10

waters only in the absence of O2. Insoluble Fe(III) and Mn(III/IV) oxides form under oxic

11

conditions. Their solubilities limit the aqueous concentrations of Fe and Mn species.

12

The interconversions among redox states and physical states, while often

13

thermodynamically favorable, are frequently slow in the absence of catalysis. For

14

example, aqueous solutions of Mn(II) in the presence of O2 at pH = 8.4 are exoergic

15

toward oxidation, yet the uncatalyzed reaction proceeds slowly across years (11).

16

Surfaces, ligands, and other metals have varying levels of catalytic activity for Fe(II) and

17

Mn(II) oxidation (4, 12). As a second example, both the rate and the pathway of the

18

crystallization of supersaturated solutions is influenced catalytically by a range of factors,

19

including foreign surfaces, surface active ions, pH, and the magnitude of supersaturation

20

(4, 9). As a final example, iron and manganese oxide solids exposed to undersaturated

21

solutions have a free energy driving force favorable to dissolution, but the uncatalyzed

22

rates are often slow, especially in relation to the demand rate of biological organisms.

23

Catalyzed pathways, which usually entail the formation of surface complexes between

1

24

active ligands and oxide surface groups, are generally necessary to meet biological

25

demand. In these examples, the distinction is blurred between a true catalyst, which is

26

recycled during a reaction, and a stoichiomeric agent, which is consumed. As defined in

27

this chapter, a catalyst is any agent that increases the rate of a desired process, including

28

oxidation, precipitation, and dissolution, regardless of whether the agent is recycled or

29

consumed.

30

Quantifying and predicting Fe and Mn cycling is separately motivated within at

31

least four scientific communities (13):

32

(1) In the absence of more favorable terminal electron acceptors like O2 or NO3-,

33

Geobacter, Shewanella, and other microbes reduce Fe(III) and Mn(III/IV) oxides (14-

34

16). The reduction reaction couples with hydrocarbon oxidation to complete the

35

energy-producing metabolic pathways.

36

(2) In natural waters and soil zones having high dissolved oxygen concentrations, Fe and

37

Mn acquisition at concentrations sufficient for enzymatic function (17-20) challenges

38

microbes and plants (21-24). The enzymes developed when aqueous Fe(II) and

39

Mn(II) were abundant prior to oxygenation of the early Earth atmosphere (25).

40

Cellular FeT and MnT concentrations of 10-4 M (26) are 105 greater than typical ocean

41

waters (27) and 102 greater than typical acidic soil solutions (6). Organic ligands like

42

oxalate, which are common biological exudates, and siderophores, which are tailored

43

biological molecules, increase the dissolution rates of Fe(III) and Mn(III/IV) oxides

44

and increase Fe and Mn bioavailability (28-30).

2

45

(3) The carbon, nitrogen, sulfur, oxygen, and phosphorous geochemical cycles require

46

oxidation/reduction at many steps. Fe and Mn cycling is a key thermodynamic

47

regulator and kinetic catalyst in natural waters (2, 4, 5).

48

(4) The transport and fate of heavy metal pollutants in natural waters is strongly affected

49

by Fe and Mn oxide precipitation and dissolution (31). Heavy metals, especially in

50

sediments or groundwater, adsorb on Fe and Mn oxide surfaces (31-33). The heavy

51

metals are also incorporated in the Fe and Mn oxide matrix as impurities when

52

precipitation occurs or when new mixed metal/Fe and metal/Mn coprecipitates are

53

possible (31, 34-38). As such, the cycling of redox conditions in natural waters and

54

the associated precipitation and dissolution of Fe and Mn oxides lead to the cyclical

55

uptake and release of heavy metal pollutants (39-44). Movement of heavy metals

56

through soils is also increased when these metals adsorb onto iron oxide colloids (45-

57

47) and retarded when they adsorb onto iron and manganese oxide coatings on coarse

58

grains, such as quartz sand.

59

This chapter focuses on the rates and mechanisms of Fe and Mn oxide

60

precipitation and dissolution. The chapter’s organization is as follows. Thermodynamic

61

driving forces, illustrated by pE-pH diagrams, are shown to constrain oxidation,

62

precipitation, and dissolution (§2). Rates of aqueous Fe(II) and Mn(II) oxidation by O2

63

have both homogeneous and heterogeneous pathways (§3 and §4). Dissolution occurs by

64

proton-promoted, ligand-promoted, reductive, and synergistic pathways (§5). Modern

65

molecular techniques provide an increasing basis for mechanistic descriptions and

66

predictions of oxidation, precipitation, and dissolution (§6). Rather than reviewing all

67

available experimental techniques (48), three informative examples are chosen for §6, 3

68

including infrared spectroscopy, atomic force microscopy, and X-ray absorption

69

spectroscopy. Beyond the scope of this chapter are photochemical reactions (49-51),

70

biological reactions (16, 52-55), field studies (4, 56-58), and computational chemistry

71

(59).

72

2. Thermodynamic Driving Forces

73

The free energy driving forces relating the various Fe and Mn aqueous and solid

74

species (Figure 1) are represented in pE-pH diagrams (Figure 2) (9, 10, 60). The pE axis

75

represents the equilibrium partial pressures of O2 (increasing at high pE) and H2

76

(increasing at low pE) in the system, and hence the oxidizing or reducing power of the

77

environment. Specifically, pE is defined as:

78

1 pE = − pH − log PH2 2 1 pE = 20.77 − pH + log PO2 4

(1)

79

The dashed lines show the water stability region for 1 atm of gases. Above the top line,

80

water should thermodynamically form O2 if oxygen partial pressure is below 1 atm.

81

Similarly, below the bottom line, water should thermodynamically form H2 if hydrogen

82

partial pressure is below 1 atm. Natural environments have a range of pE/pH values:

83

oceans (pE = O2 saturated, pH = 8), surface waters of lakes and rivers (pE = O2 saturated,

84

pH = 4 to 6), mine waters (pE = O2 saturated, pH = 1 to 3), groundwater and sediments

85

(pE = 0 to 3, pH = 7 to 9), and swamps (pE = 0 to -3, pH = 5 to 7) (9, 61, 62).

86

In the aqueous phase in the Fe system, there is an interchange among aqueous

87

Fe(II) and Fe(III) redox species with decreasing pE. There is also a shift among the

88

dominant hydrolysis species, such as from [Fe(H2O)6]3+ to [Fe(H2O)5OH]2+ with

89

changing pH. In contrast, [Mn(H2O)6]2+ is the unique dominant at the common pE and 4

90

pH values of natural waters. Hydrolysis begins only for pH > 10, while the stabilization

91

of aqueous Mn(III) requires strong ligands (63).

92

Figure 2 is drawn for 10-6 M FeT (top) and 10-6 M MnT (btm) at 25ºC, where FeT is

93

the sum of all species including for example Fe2+(aq), Fe3+(aq), FeOH2+(aq), and the

94

various solids. MnT is similarly defined. The lines in the diagram shift to form smaller

95

gray regions and larger white regions for decreasing FeT and MnT. The white pE-pH

96

regions show where FeT and MnT are thermodynamically speciated entirely in the

97

aqueous phase. For instance, if the prescription of 10-6 M FeT or MnT initially includes

98

solid species (e.g., as prepared in the lab or in an aquifer subject to seasonal pE-pH

99

cycles) in the white regions, then it is predicted that these solids will dissolve. However,

100

the dissolution rate is slow compared to the timescales of days, weeks, and months

101

usually relevant to the environment (§5).

102

The gray pE-pH regions conversely show where some (viz. near the boundary

103

lines) or most (viz. moving inward in the gray region) of 10-6 FeT or MnT should

104

thermodynamically include solid phases, with a small amount of aqueous Fe and Mn

105

species in equilibrium (e.g., 10-9 to 10-15 aq Fe and Mn). However, the precipitation rate

106

may be slow (§3 and §4). For instance, in the absence of catalysis, aq Mn(II) at pE = 10

107

and pH = 8 persists for years in solution, even though oxidation and precipitation of Mn

108

oxide solid phases is thermodynamically favored. By increasing pH, supersaturation

109

increases and Mn(II) oxidizes and precipitates. However, the first solid to form is

110

generally the least favored thermodynamically, a phenomenon described as Ostwald’s

111

rule of stages. For instance, Mn(III) solids such as MnOOH form initially even when the

112

free energy of formation for MnIVO2 is greater. The MnIV oxides form only after long

5

113

aging times of MnIIIOOH (64). For a similar reason, in the diagram for Fe oxides,

114

amorphous Fe(OH)3(s) is employed in the analysis rather than thermodynamically

115

favored but slowly forming hematite (α-Fe2O3) and goethite (α-FeOOH).

116

The pE-pH diagrams are useful for establishing the thermodynamically favorable

117

pathways for transformations. However, predicting the transformation rates requires a

118

kinetic analysis (§3, §4, and §5).

119

3. Rates of Homogeneous Oxidation

120

Aqueous Fe(II) and Mn(II) are oxidized by reaction with dissolved O2 (5, 12, 65,

121

66). Thermodynamic analysis shows that the species Fe(III) is thermodynamically

122

favorable for pE > 13.2 at acidic pH (Figure 2). However, the reaction of Fe(II) with O2 is

123

not observed in the absence of catalysis at low pH. Only for pH > 6 is the rate appreciable,

124

with a lifetime of approximately 1 day in water equilibrated with air at 25ºC at pH = 6

125

(Figure 3). For increasing pH, the lifetime rapidly decreases, being 30 min at pH = 7. For

126

more alkaline pH, the reaction is even faster, but the dominant pathway shifts from

127

homogeneous to heterogeneous (§4.2) because the reaction product Fe(OH)3(aq) rapidly

128

polymerizes to form am-Fe(OH)3(s), thus providing a reactive surface (67, 68).

129

The pH dependence of the reaction rate for pH < 7 is explained by the mechanism

130

shown in Table 1 (69). With increasing pH, the dominant aqueous species shifts from

131

[Fe(H2O)6]2+ to [Fe(H2O)5OH]+ to [Fe(H2O)4(OH)2]0, each of which having a

132

progressively more rapid water-exchange rate and faster bimolecular reaction rate

133

constant with O2 (70). The overall reaction rate is the sum of parallel pathways (Table 1

134

and Figure 3). The rate is also catalyzed by other dissolved species such as Cu2+, Fe3+,

135

Al3+, Co2+, and Mn2+ (71-73).

6

Compared to Fe(II)(aq), reaction of Mn(II)(aq) with O2 is at least 106 times slower

136 137

at circumneutral pH (Table 1 and Figure 3). Only for pH > 8 does the reaction rate

138

become appreciable. The reaction proceeds through the aqueous Mn(OH)2 species,

139

although the bimolecular rate constant of Mn(OH)2 with O2 is 105.2 lower than that of

140

Fe(OH)2. The reaction product (Mn(III)), in the absence of strongly complexing ligands,

141

rapidly polymerizes to form Mn oxide solids (67, 68), which catalyze further Mn(II)

142

oxidation (§4.2). Hence, separating homogeneous from heterogeneous pathways in

143

Mn(II) oxidation is difficult because they occur simultaneously under most experimental

144

conditions.

145

4. Rates of Heterogeneous Oxidation

146

The rate of Mn(II) and Fe(II) oxidation by O2 is catalyzed by metal oxide surfaces

147

(>S) (12, 72, 74-76). These surfaces are terminated by hydroxyl groups (>SOH), which

148

bind Mn(II) and Fe(II) as (>SO)2Mn and (>SO)2Fe. The inner-sphere surface complexes

149

promote rapid oxidation, just as OH ligands do for the homogeneous complexes (§3). The

150

catalysis occurs both on foreign surfaces (e.g., Mn(II) on FeOOH) (§4.1) and also for the

151

special case of autocatalysis (e.g., Mn(II) on MnOOH producing additional MnOOH)

152

(§4.2).

153

4.1 Mineral Surfaces

154

Reaction rates at surfaces (77, 78) are given either as the conversion rate per unit

155

surface area of the foreign surface (mol m-2 s-1) or as the conversion rate per liter of a

156

particulate suspension (M s-1) (13). The latter is the basic observable in experiments

157

employing particulates, whereas the former is a more intrinsic measure, which can be

158

estimated for a suspension of known loading (g L-1) and specific surface area (m2 g-1)

7

159

(Table 2). For single crystals, the conversion rate per unit surface is measured directly.

160

For comparing the relative importance of homogeneous versus heterogeneous oxidation

161

rates under a specific set of conditions, the heterogeneous rate expressed as (M s-1) is

162

more convenient because these units are the same as for homogeneous oxidation rates

163

(Table 1). Heterogeneous oxidation rates in natural waters commonly exceed

164

homogeneous oxidation rates.

165

Rate equations for heterogeneous oxidation are summarized in Table 2, where k is

166

the oxidation rate coefficient (M-1 s-1), [>SOFe2+] and [>SOMn2+] are the respective

167

binuclear surface concentrations of adsorbed Fe(II) and Mn(II) (mol m-2), KH is the

168

Henry’s law partition coefficient of O2 (M atm-1), PO2 is the partial pressure of O2 (atm),

169

A is the particulate surface area (m2), and V is the container volume of the aqueous

170

particulate suspension (L). [>SOFe2+] and [>SOMn2+], which depend on FeT/MnT and pH,

171

are typically quantified by measurements of adsorption isotherms. Examples of

172

heterogeneous rate coefficients are log k = 0.7 (M-1 s-1) for Fe2+/O2 reaction on FeOOH

173

and log k = -1.55 (M-1 s-1) for Mn2+/O2 reaction on Al2O3.

174

In many real-world applications, aqueous concentrations of Fe(II) and Mn(II) are

175

known rather than surface concentrations [>SOFe2+] and [>SOMn2+]. It is convenient to

176

recast the heterogeneous oxidation rate laws in terms of aqueous concentrations by the

177

use of adsorption isotherm equations. For incomplete surface coverage not sufficient to

178

significantly perturb the surface charge, surface concentration and aqueous concentration

179

are related by a simple mass action equilibrium law quantified by an intrinsic binding

180

constant βs of the surface complex. This more detailed rate law is provided in Table 2.

181

There, [>SOH] is the site density of OH groups on the metal oxide surface (mol m-2).

8

182

The first term gives the intrinsic chemical reactivity (i.e., the rate coefficient). The second

183

term relates the surface concentration of adsorbed manganese to the aqueous

184

concentration of manganese (i.e., a 3D to 2D transformation). The third term expresses

185

the aqueous oxygen concentration. The fourth term scales the specific surface reactivity

186

(mol m-2 s-1) to the particulate suspension reactivity (M s-1).

187

4.2 Autocatalysis

188

A special category of heterogeneous oxidation occurs when the product of the

189

oxidation further accelerates the reaction rate (79, 80). For example, the oxidation of

190

Mn(II) produces MnOOH(s), as follows:

191

homogeneous or → 4 MnOOH(s) + 8 H+ O2 + 4 Mn2+ + 6 H2O ⎯⎯⎯⎯⎯ heterogeneous

(2)

192

As the reaction proceeds, the MnOOH(s) surface area and hence the heterogeneous

193

reaction rate increase. The rate laws of autocatalysis (Table 3) are less precise than those

194

of heterogeneous reactions on foreign mineral surfaces. Detailed descriptions for the

195

autocatalysis pathways are hindered both by the complexities of separating homogeneous

196

from heterogeneous pathways and by limitations in characterizing the increasing mineral

197

surface area and the altering mineral phases during reaction.

198

5. Dissolution Rates

199

Iron and manganese oxide solids dissolve at the rates shown in Figure 4 (center;

200

right) when the contacting aqueous solution is strongly undersaturated (i.e., no back

201

reaction from precipitation). The dissolution rates depend on many factors (2, 4, 13, 81-

202

83). For instance, the rates increase with acidic pH. There are also several parallel

203

pathways having differing dissolution rates, including proton-promoted (§5.1) (slowest),

204

ligand-promoted (§5.2), reductive (§5.3), and synergistic (§5.4) (fastest). The

9

205

stoichiometries and the relative rates of these reaction pathways are given in Table 4. The

206

rates further depend on crystalline phase: amorphous Fe(OH)3 dissolves at least ten times

207

faster than γ-FeOOH. The rates also depend on initial chemical or physical preparation

208

and often pass through initial transients of rapid dissolution, which are at least ten times

209

faster than the steady-state dissolution rates (84, 85).

210

Although the rates depend on sample crystallinity and preparation and are quite

211

variable on a linear scale, on a log scale the differences among samples are less apparent.

212

With this caveat, organizational statements are possible. For example, γ-FeOOH

213

dissolves more slowly than amorphous Fe(OH)3; iron oxides dissolve more slowly than

214

manganese oxides; reductive dissolution is faster than ligand-promoted dissolution; and

215

proton-promoted dissolution is the slowest of all. The dissolution rates of iron and

216

manganese oxides can also be compared with the dissolution rates of other minerals

217

(Figure 4, left versus center and right). Iron oxides dissolve at rate comparable to chain

218

and sheet aluminosilicates. Manganese oxides dissolve at rates comparable to carbonates,

219

although the precise rate depends strongly on reductant concentration.

220

5.1 Proton-Promoted

221

Protons increase dissolution rates (86), which is rationalized by a catalytic role in

222

depolymerization. For example, dimers such as [Fe2(OH)2]4+, [Al2(OH)2]4+, and

223

[(VO)2(OH)2]2+ decompose at the compound rate: k = k1 + k2[H+], where k is the pseudo

224

first-order rate coefficient, k1 is the H2O reaction pathway, and k2 is the H+ reaction

225

pathway (87-90). Protons accelerate the rate by attaching to the oxygen in the hydroxyl

226

groups bridging the metals, thus removing electron density and weakening the bond

227

strength of the metal-oxygen linkage:

10

228 229

A mineral such as FeOOH or Fe2O3 is regarded as an infinite n-mer extension of

230

[Fe2(OH)2]4+. Mineral dissolution is then a stepwise depolymerization, and protons have

231

the role of weakening bonds and thus increasing dissolution rates (83). The log of the rate

232

is proportional to the log of the surface proton concentration (>SOH2+).

233

5.2 Ligand-Promoted

234

Ligands binding as inner-sphere complexes to the surface groups of iron and

235

manganese oxides increase dissolution rates (30, 83, 86, 91-93). The increase is

236

proportional to the ligand surface concentration and the ligand binding strength. The rate

237

law is: R = kL [>SL] where R is the dissolution rate (mol m-2 s-1), kL is the rate coefficient

238

(s-1), and [>SL] is the surface concentration of the ligand. For a homologous series of

239

surface structures, the rate coefficient is proportional to the adsorption strength of the

240

ligand, e.g., kL = 4.5 × 10-10 KL – 1.1 × 10-6 where KL is the Langmuir binding constant

241

for the series oxalate, glutarate, and malonate binding to hematite (93). The relationship

242

occurs because strong electron donation by the oxygen-ligand to a surficial metal atom

243

removes electron density in the bonds between the metal atom and the oxygen atoms of

244

the mineral lattice, thus weakening the bond and lowering the energy barrier for the

245

dissolution of the metal atom (82). In this regard, Mn and Fe cations bind much more

246

strongly to oxygen- than nitrogen-containing ligands (9). Furthermore, ligands effective

247

for promoting dissolution have two or more functional groups capable of chelation to

248

form inner-sphere bidentate mononuclear complexes. An example is oxalate (cf. Figure 6, 11

249

n = 0). In contrast, ligands forming bidentate binuclear complexes such as phosphate or

250

borate stabilize the surface against attack by H+ and H2O and thus reduce (inhibit) the

251

dissolution rate. Monodentate ligands such as acetate do not perceptibly affect the

252

dissolution rate.

253

5.3 Reductive

254

Reductants rapidly accelerate iron and manganese oxide dissolution (94-99).

255

Examples of reductants are ascorbic acid, hydrogen sulfide, and phenols. A reductant

256

typically forms an inner-sphere complex at the surface, though not always so. When an

257

electron is transferred to a Mn(III/IV) oxide, a surficial Mn(II) ion locked inside an oxide

258

lattice is formed. Because Mn(II) oxides are much more soluble than the corresponding

259

higher oxides (Figure 2), rapid Mn(II) depolymerization occurs, which is followed by

260

release to the aqueous phase of Mn(II). Fe(III) I oxides are similarly reduced, followed by

261

the release of aqueous Fe(II).

262 263

The Mn oxide solids are strong oxidants capable of oxidizing common organic matter:

264

MnO2(s) + 2 e- + 4 H+ → Mn2+ + 2 H2O, pE0 = 20.8, E10 2 = +1.23 V

(3)

265

MnOOH(s) + e- + 3 H+ → Mn2+ + 2 H2O, pE0 = 25.4, E10 2 = +1.50 V

(4)

266

H2CO(aq) + 2 MnO2(s) + 4 H+ → 2 Mn2+ + CO2(aq) + 3 H2O

(5)

∆pE0 = 18.4, E 0 = +1.09 V

267 268

The thermodynamic driving force of the reaction is often a good predictor of rate for a

269

homologous series of reactants (i.e., a linear free energy relationship). For example, for a

270

series of substituted phenols like p-methylphenol at 10-4 M and pH = 4.4, the Hammett

12

271

constant σ is a predictor of reductive dissolution rate R (mol m-2 s-1) of manganese oxide

272

(95): log10 R = −7.79 − 3.63 σ

273 274

The correlation holds because the Hammett constant is also a predictor of reduction

275

potential, which is the driving force for manganese oxide dissolution. Equation (6) is

276

derived over a ∆σ range of 0.66, so the effect on log R is substantial.

277

5.4 Synergistic

278

(6)

Some species interact cooperatively to increase the dissolution rate above the sum

279

of the individual dissolution rates. For example, Fe(III) oxides dissolve more rapidly in

280

the presence of aqueous Fe(II) and oxalate than in the presence of either separately (100).

281

The Fe(II)-oxalato aqueous complex is a strong reductant, which rapidly reduces the iron

282

oxide through reductive dissolution. Another example is the rapid dissolution of iron

283

oxides in the presence of a ligand-reductant pair, such as oxalate and ascorbate (101).

284

Ascorbate reduces Fe(III) to Fe(II) at the surface of the Fe(III) oxide, while oxalate forms

285

an inner-sphere complex at the surface and rapidly dissolves Fe(II). A final example is a

286

surface and aqueous ligand pair, such as oxalate and a trihydroxamate siderophore,

287

desferrioxamine B (DFO-B) (102). At low concentrations, oxalate adsorbs to the iron

288

oxide surface. However, for sufficiently low oxalate concentrations, the free energy

289

driving force toward dissolution is small because the total aqueous solubility of an iron

290

oxide is low. The DFO-B, however, binds aqueous iron very strongly. Addition of DFO-

291

B provides a sink for aqueous iron. Under these conditions, in one step oxalate dissolves

292

Fe(III) as a Fe(III)-oxalato complex, which rapidly hands off the Fe(III) to DFO-B.

293

Oxalate is then free to recycle to the iron oxide surface, leading to further dissolution.

13

294

The rates in all three examples are proportional to the surface concentrations of the

295

reactive species.

296

5.5 Master Equation

297 298 299

The overall dissolution rate R (mol m-2 s-1) is the sum of several process, as represented conceptually in the equation below (83): R = k H [>SOH +2 ]n + kOH [>SO- ]m + kaq + ∑ a k L ,a [>SL a ]

− ∑ b k I ,b [>SIb ] + ∑ c k R ,c [>SR c ] + ∑ d kM ,d [>SM d ]

(7)

300

for proton-promoted (H), hydroxide (OH), aqueous (aq), a ligands (L), b inhibitors (I), c

301

reductants (R), and d metal ions (M). Under tested applications, no more than two or

302

three terms dominate the overall dissolution rate. Hence, eq (7) is not to be interpreted

303

literally in its complexity.

304

6. Molecular Environmental Chemistry

305

The growth of molecular environmental chemistry in recent years provides a

306

renewed basis for testing and constraining models of mineral precipitation and

307

dissolution (48, 103-106). The left hand side of eqs (6) or (7) and the quantitative

308

formulations given in Tables 1 to 3 provide examples of macroscopic quantities, which in

309

these cases are the measurable dissolution rates. From the dependencies of these direct

310

macroscopic observables on factors such as pH or reductant concentration, molecular

311

descriptions of surface processes, such as given in the right hand side of eq (7), are

312

constructed by inference. These molecular inferences from macroscopic observables are

313

the common approach for the studies described in §2-§5. In the latest research (e.g., §6.1

314

to §6.3), direct measurement of the molecular quantities, which is always preferable to

315

inference, is an accelerating trend and provides a manner for further improving

14

316

mechanistic descriptions and thus our predictive capability of macroscopic quantities. Of

317

the numerous available techniques (48, 105), three illustrative examples include infrared

318

spectroscopy (§6.1), atomic force microscopy (§6.2), and X-ray absorption spectroscopy

319

(§6.3).

320

6.1 Infrared (IR) Spectroscopy

321

Inner-sphere surface complexes, whose concentrations appear as [>SX] in the

322

right hand side of eq (7), are directly observable by infrared spectroscopy (93, 107-111).

323

Infrared absorption occurs at the resonance frequencies of atomic vibrations. The number

324

of vibrations and their wavenumber positions depend upon the symmetry of the surface

325

complex and its local chemical environment.

326

Duckworth and Martin (93) employ a homologous series of dicarboxylic acids,

327

including oxalate, malonate, succinate, glutarate, and adipate, to study the effect of chain

328

length on the nature of the surface complexation structures formed on hematite. The

329

infrared spectra (Figure 5) lead to the deduction of the structure of the inner-sphere

330

surface complexes (Figure 6). Oxalate, malonate, and glutarate form bidentate surface

331

complexation structures, while succinate and adipate form monodentate structures. The

332

ligand-promoted dissolution rates are also measured, and the three bidentate ligands have

333

dissolution rates at least 10 to 100 times faster than the monodentate structures (Table 5).

334

These results nicely illustrate the gains possible from molecular level insights. For

335

instance, rationalizing the difference in the dissolution rate of glutarate versus that of

336

succinate is guesswork when only macroscopic measurements are available.

337

6.2 Atomic Force Microscopy (AFM)

15

338

The master equation for dissolution (eq (7)), which is derived from macroscopic

339

observations, assumes each surface site is equivalent. Under this treatment, the surface is

340

a terrace of infinite extent. In reality, manganese and iron oxide surfaces have

341

microtopogaphy, including for example terraces, steps, kinks, and pits (99, 112, 113).

342

Terrace ions locked into place by five bonds to nearest neighbors are released more

343

slowly than ions at kink positions having only three nearest neighbors (114). Moreover,

344

point defects, line defects, and other dislocations dissolve rapidly. A master equation

345

derived solely from macroscopic observations is thus inherently limited in its accuracy

346

and range of application.

347

The atomic force microscope (AFM) allows measurement of mineral surface

348

topography under aqueous conditions (Figure 7) (115, 116). A sharp tip with a curvature

349

radius of approximately 10 nm is rastered laterally across the surface, and vertical

350

deflections of the tip provide the topography of the underlying surface (117). The

351

microscopic data collected in time series allow new models of mineral dissolution to be

352

formulated and constrained (118). The dynamic range of the AFM, which is limited by

353

the scanning rate on the upper side and the tip lifetime on the lower side, is convenient

354

for studying minerals having dissolution rates of 10-6 to 10-10 mol m-2 s-1 (119). Hence,

355

manganese oxides are easily studied (Figure 4), whereas iron oxides dissolve too slowly

356

for AFM work, except under extreme conditions. Manganite (MnOOH) reductive

357

dissolution shows overall step retreat (e.g., circled region in Figure 7), while certain areas

358

of the surface are simultaneously reconstructing to minimize surface energy by filling in

359

pits (e.g., central arrow in Figure 7). Scaling of the complex time-dependent changes

16

360

shown in Figure 7 to the surface-averaged (i.e., macroscopic) dissolution rate is an

361

outstanding research challenge.

362

Atomic force microscopy is also useful for studying precipitation. Junta and

363

Hochella (120, 121) report on the heterogeneous oxidation of Mn(II) at hematite, goethite,

364

and albite surfaces by O2 for 7.8 < pH < 8.7. For the specified reaction conditions,

365

manganese oxide precipitates form preferentially at the steps and kinks of the substrates,

366

which could suggest a higher rate of heterogeneous oxidation at those microtopographic

367

features. Alternatively, the oxidation may occur widely on the terrace, and the oxidized

368

monomeric products may diffuse rapidly to more stable step and kink positions.

369

6.3 X-ray Absorption Spectroscopy (XAS)

370

X-ray absorption spectroscopy responds to the local coordination environment

371

and chemical oxidation state of the inner-sphere surface complexes of heavy metals on

372

iron and manganese oxides (122-126). X-ray absorption is modulated at energies near

373

and above an absorption edge because the final quantum mechanical state of the system,

374

which is a hole in the sample and a photoelectron in vacuum, is affected by scattering and

375

constructive/destructive interference of the ejected electron at its de Broglie wavelength

376

by coherent shells of neighboring atoms. Experiments must be conducted on synchrotron

377

beam lines to obtain the high intensity monochromatic X-rays necessary for XAS studies.

378

The interaction of arsenic with manganese oxide surfaces provides an example of

379

the important molecular information possible with XAS studies (127, 128). The

380

macroscopic observation is that As(III) reductively dissolves Mn(IV) oxides to form

381

As(V). Understanding the mechanisms and pathways in greater molecular detail and

382

hence quantifying the reductive dissolution rates in greater accuracy is important because

17

383

As(III) is more mobile in aquifers than As(V). X-ray absorption near-edge spectroscopy

384

(XANES) shows that when aqueous As(III) adsorbs to the surface of MnO2, the surface

385

complex is As(V). The extended X-ray absorption fine-structure (EXAFS) results show

386

that the inner-sphere complex is bidentate binuclear, (>MnIVO)2AsVOOH (Figure 8).

387

High-precision, quantitative structural information on local ordering is also derived from

388

EXAFS measurements: the As-Mn distance is 3.22 Å. The precise distances coupled with

389

computational modeling of optimized structures allow an investigator to rule out a host of

390

other possibilities, e.g., bidentate mononuclear binding, mixed Mn/As co-precipitates,

391

Mn(II)/Mn(III) structures, and As(III) structures. The only optimized structure providing

392

good agreement with the measurements (Figure 8, left) is shown in Figure 8 (right). XAS

393

studies show that bidentate binuclear structures are also formed by arsenic on iron oxides

394

(129-131).

395

7. Concluding Remarks

396

Because the uncatalyzed rates of Fe and Mn oxide precipitation and dissolution

397

are often slow, an understanding of the catalyzed pathways and mechanisms is necessary

398

for quantitative predictions of Fe and Mn transformations and the associated impacts in

399

the environment. Tables 1 to 5 and Figures 3 and 4 summarize the known rate

400

information. Aqueous Fe(II) and Mn(II) oxidation by O2 is catalyzed heterogeneously by

401

other mineral surfaces. The oxidized products polymerize and precipitate, first as higher

402

energy oxides having little long-range order and after aging as lower energy crystalline

403

oxides. When exposed to undersaturated aqueous conditions, the oxides dissolve at rates

404

dependent upon catalytic additives, including proton-promoted, ligand-promoted,

405

reductive, and synergistic dissolution pathways. Molecular techniques increasingly

18

406

provide a detailed mechanistic description of these processes. Under favorable

407

circumstances, these new descriptions are detailed enough that they can be modeled by ab

408

initio and semiempirical methods, allowing for direct comparison of experimental

409

observations and computational results and thus for the further improvement and

410

refinement of the latter.

411 412

Acknowledgments

413

STM is grateful for support received from the Chemical Sciences, Geosciences, and

414

Biosciences Division of the Office of Basic Energy Sciences in the U.S. Department of

415

Energy and the American Chemical Society Petroleum Research Fund.

19

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25

109. SJ Hug and B Sulzberger, In situ Fourier transform infrared spectroscopic evidence for the formation of several different surface complexes of oxalate on TiO2 in the aqueous phase, Langmuir 10: 3587-3597, 1994. 110. ST Martin, JM Kesselman, DS Park, NS Lewis, and MR Hoffmann, Surface structures of 4-chlorocatechol adsorbed on titanium dioxide, Environ. Sci. Technol. 30: 2535-2542, 1996. 111. SJ Hug, In situ Fourier transform infrared measurements of sulfate adsorption on hematite in aqueous solutions, J. Colloid Interface Sci. 188: 415-422, 1997. 112. WK Burton, N Cabrera, and FC Frank, The growth of crystals and the equilibrium structure of their surfaces, Philos. Trans. R. Soc. London. Ser. A 243: 299-358, 1951. 113. C Eggleston, S Higgins, and P Maurice, Scanning probe microscopy of environmental interfaces, Environ. Sci. Technol. 32: 456A-459A, 1998. 114. IV Markov, Crystal Growth for Beginners, Singapore: World Scientific, 1995, 422 pp. 115. AJ Gratz, S Manne, and PK Hansma, Atomic force microscopy of atomic-scale ledges and etch pits formed during dissolution of quartz, Science 251: 1343-1346, 1991. 116. PE Hillner, AJ Gratz, S Manne, and PK Hansma, Atomic-scale imaging of calcite growth and dissolution in real time, Geology 20: 359-362, 1992. 117. VJ Morris, AR Kirby, and AP Gunning, Atomic Force Microscopy for Biologists, London: Imperial College Press, 1999, 332 pp. 118. OW Duckworth and ST Martin, Connections between surface complexation and geometric models of mineral dissolution investigated for rhodochrosite, Geochim. Cosmochim Acta 67: 1787-1801, 2003. 119. PM Dove and FM Platt, Compatible real-time rates of mineral dissolution by atomic force microscopy (AFM), Chem. Geol. 127: 331-338, 1996. 120. JL Junta and MF Hochella Jr., Manganese (II) oxidation at mineral surfaces: A microscopic and spectroscopic study, Geochim. Cosmochim. Acta 58: 4985-4999, 1994. 121. J Junta, MF Hochella, Jr., and D Rimstidt, Linking microscopic and macroscopic data for heterogeneous reactions illustrated by oxidation of manganese (II) at mineral surfaces, Geochim. Cosmochim. Acta 61: 149-159, 1997. 122. EE Koch, ed. Handbook of Synchrotron Radiation, Amsterdam: North-Holland, 1983, pp. 123. DC Koningsberger and R Prins, ed. X-ray Absorption: Principles, Applications, Techniques of EXAFS, SEXAFS, and XANES, New York: Wiley, 1987, 673 pp. 124. KF Hayes, AL Roe, GE Brown, KO Hodgson, JO Leckie, and GA Parks, In situ Xray absorption study of surface complexes: Selenium oxyanions on αFeOOH, Science 238: 783-786, 1987. 125. GE Brown, Jr. and GA Parks, Sorption of trace elements on mineral surfaces: modern perspectives from spectroscopic studies and comments on sorption from the marine environment, Int. Geol. Rev. 43: 963-1073, 2001. 126. PA Fenter, ML Rivers, NC Sturchio, and SR Sutton, ed. Applications of Synchrotron Radiation in Low-Temperature Geochemistry and Environmental Science, Washington, D.C.: Mineralogical Society of America, 2002, 579 pp. 26

127. BA Manning, SE Fendorf, B Bostick, and DL Suarez, Arsenic(III) oxidation and arsenic(V) adsorption reactions on synthetic birnessite, Environ. Sci. Technol. 36: 976-981, 2002. 128. AL Foster, GE Brown, and GA Parks, X-ray absorption fine structure study of As(V) and Se(IV) sorption complexes on hydrous Mn oxides, Geochim. Cosmochim. Acta 67: 1937-1953, 2003. 129. GA Waychunas, BA Rea, CC Fuller, and JA Davis, Surface-chemistry of ferrihydrite. 1. EXAFS studies of the geometry of coprecipitated and adsorbed arsenate, Geochim. Cosmochim. Acta 57: 2251-2269, 1993. 130. GA Waychunas, JA Davis, and CC Fuller, Geometry of sorbed arsenate on ferrihydrite and crystalline FeOOH: Reevaluation of EXAFS results and topological factors in predicting sorbate geometry and evidence for monodentate complexes, Geochim. Cosmochim. Acta 59: 3655-3661, 1995. 131. S Fendorf, MJ Eick, P Grossl, and DL Sparks, Arsenate and chromate retention mechanisms on goethite. 1. Surface structure, Environ. Sci. Technol. 31: 315-320, 1997. 132. B Simon, Dissolution rates of NaCl and KCl in aqueous-solution, J. Cryst. Growth 52: 789-794, 1981. 133. E Busenberg and LN Plummer, A comparative study of the dissolution and crystal growth kinetics of calcite and aragonite, U.S. Geol. Surv. Bull. 1578, 1986. 134. HU Sverdrup, The Kinetics of Base Cation Release due to Chemical Weathering, Lund: Lund University Press, 1990, 245 pp. 135. RA Wogelius and JV Walther, Olivine dissolution at 25ºC: Effects of pH, CO2, and Organic-Acids, Geochim. Cosmochim. Acta 55: 943-954, 1991. 136. JI Drever, The effect of land plants on weathering rates of silicate minerals, Geochim. Cosmochim. Acta 58: 2325-2332, 1994. 137. JV Walther, Relation between rates of aluminosilicate mineral dissolution, pH, temperature, and surface charge, Am. J. Sci. 296: 693-728, 1996. 138. AA Jeschke, K Vosbeck, and W Dreybrodt, Surface controlled dissolution rates of gypsum in aqueous solutions exhibit nonlinear dissolution kinetics, Geochim. Cosmochim. Acta 65: 27-34, 2001. 139. OW Duckworth and ST Martin, Role of molecular oxygen in the dissolution of siderite and rhodochrosite, Geochim. Cosmochim. Acta, accepted July, 2003.

27

List of Tables Table 1.

Rate equations for homogeneous phase oxidation of aqueous Fe(II) and Mn(II) by O2 (5, 12). The product Mn(OH)2+ rapidly polymerizes, forming a Mn oxide precipitate such as MnOOH(s).

Table 2.

Rate equations for catalytic heterogeneous oxidation of aqueous Fe(II) and Mn(II) by O2 on mineral surfaces (5, 12, 78). The surface group >SOM2+ is binuclear (i.e., (>FeO)2Fe2+).

Table 3.

Rate equations for the autocatalytic heterogeneous oxidation of aqueous Fe(II) and Mn(II) by O2 (5, 12, 99). The oxidation products of Fe(II) and Mn(II) precipitate and provide increasing particulate surface area loading and hence greater reactivity with time. As compared to Table 2, the formulation in Table 3 is less precise due to the poor characterization and the time evolution of the precipitate product.

Table 4.

Stoichiometry and relative dissolution rates of the proton-promoted, ligandpromoted, reductive, and synergistic pathways (2, 4, 83). Photoreductive pathways are omitted.

Table 5.

Physical data and experimental results for the ligand-promoted dissolution of iron oxide (hematite) by dicarboxylic acids (93). The numbers in parentheses give the carbon chain length, n, in -OOC(CH2)nCOO-. Also given are the Langmuir binding constants, K (M-1), of the inner-sphere surface complexes, which are determined by analysis of infrared spectra. Conditions: 5 mM acetate buffer, pH = 5.0, 2 g L-1 hematite, 25°C.

28

List of Figures Figure 1.

Common dissolved and precipitated iron and manganese species in several oxidation states.

Figure 2.

pE-pH diagrams of iron and manganese species (5, 10, 60). The water stability field is shown for PO2 = 1 atm and PH2 = 1 atm.

Figure 3.

Homogeneous phase oxidation rates of aqueous Fe(II) and Mn(II) by O2 (5, 12).

Figure 4.

Comparison of pH-dependent dissolution rates of iron and manganese oxides with other common minerals (86, 99, 132-139). Rates apply when the aqueous solution concentrations are far from equilibrium, i.e., strongly undersaturated. (Ascorbic acid rates are shown for reductive dissolution.)

Figure 5.

Infrared spectra of the surface-adsorbed complexes of dicarboxylic acids on hematite at pH = 5.0 (93). ∆ν is the difference between νas(CO2) and νs(CO2). For comparison, gray bars indicate the absorption regions of νas(CO2) and νs(CO2) vibrations of the aqueous species. The bidentate structures cause faster ligand-promoted dissolution than the monodentate structures (Table 5).

Figure 6.

Proposed surface chemical reactions of oxalate, malonate, succinate, glutarate, and adipate to a hematite surface hydroxyl group at pH = 5.0 (93). The bidentate structures cause faster ligand-promoted dissolution than the monodentate structures (Table 5).

Figure 7.

AFM deflection-mode micrographs of surfaces changes observed in situ at 298 K during exposure of manganite (γ-MnOOH) to ascorbic acid at pH =

29

3.2 (10 mM NaNO3) (99). (A) Prior to exposure to reductant. (B) Same as A after exposure to 1 mM reductant for 95 min. In height images (not shown), z-scale is 125 nm. Figure 8.

Structural information for surface complexes from synchrotron-based extended X-ray absorption fine structure (EXAFS) measurements (127). (left) Radial structure functions (not phase corrected) for As(III)- and As(V)treated synthetic birnessite (MnO2) and 1.0 mM As(V) solution. Dashed lines are the fits to the experimental RSF data and peaks correspond to As-O and As-Mn atomic shells around the As atom. (right) Structural diagram of MnO2 crystallite showing possible linkages between an arsenate ion (As(V) tetrahedron) and a pair of edge-linked MnO6 octahedra. As-Mn interatomic distance is 3.22 Å, suggesting a bidentate binuclear complex. (Adapted from ref (127).)

30

Homogeneous Fe2+ Oxidation Fe2+ + O2

log k0 = –5.1 (M-1 s-1)

→ Fe3+ + O−2

Fe(OH)+ + O2 → Fe(OH)2+ + O −2

log k1 = +1.4 (M-1 s-1)

Fe(OH) +2 + O 2−

log k2 = +6.9 (M-1 s-1)

Fe(OH)2 + O2

→

[Fe(OH)+] = K1[Fe2+]/[H+]

log K1 = –9.5 (M)

[Fe(OH)2] = β2[Fe2+]/[H+]2

log β2 = –20.6 (M2) log KH = –2.9 (M atm-1)

[O2] = KH PO2 − ( d [Fe 2+ ] dt )

homo

= k0 [O 2 ][Fe 2+ ] + k1[O 2 ][Fe(OH) + ] + k2 [O 2 ][Fe(OH) 2 ] = ( k0 [Fe 2+ ] + k1 K1[Fe 2+ ] /[H + ] + k2 β 2 [Fe 2+ ] /[H + ]2 ) K H PO2

Homogeneous Mn2+ Oxidation

Mn(OH)2 + O2

→

Mn(OH) +2 + O 2−

[Mn(OH)2] = β2[Mn2+]/[H+]2 − ( d [Mn 2+ ] dt )

Table 1.

homo

log k2 = +1.7 (M-1 s-1) log β2 = –22 (M2)

= k2 [O 2 ][Mn(OH) 2 ] = ( k2 β 2 [Mn 2+ ] /[H + ]2 ) K H PO2

-2 -1

-1

-1

Table 2.

Detailed formulation

Rate of release of particulate suspension (M s )

Rate per mineral surface area (mol m-2 s-1)

Heterogeneous Mn2+ Oxidation

Detailed formulation

Rate of release of particulate suspension (M s )

Rate per mineral surface area (mol m s )

Heterogeneous Fe2+ Oxidation

) hetero

(

= k[>SOFe 2+ ]( mol / m2 ) K H PO2

)

hetero

=

hetero

PO2

(

( m2 )

)( A

)

)

V( L )

)

= k[>SOMn 2+ ]( mol / m2 ) K H PO2

H

V( L )

hetero

− ( d [Mn 2+ ] dt )

=

)(K

H

PO2

( m2 )

)( A

( m2 )

)( A

)

V( L )

V( L )

) 10-12.7 M, and [>SOH] = 1.6 × 10-5 mol m-2.

Example: for Mn2+/O2 reaction on FeOOH, log k = -0.16 (M-1 s-1), βs =

k β s [Mn 2+ ][>SOH]( mol / m2 ) [H + ]2

hetero

= k[>SOMn 2+ ]( mol / m2 ) K H PO2

(

log k = -1.55 (M-1 s-1) for Mn2+/O2 reaction on Al2O3

Examples: as above

(

)

)(K

( m2 )

)( A

log k = -0.16 (M-1 s-1) for Mn2+/O2 reaction on FeOOH

− ( d [Mn 2+ ] dt )

Examples:

− d [>SOMn 2+ ]( mol / m2 ) dt

(

hetero

(

= k[>SOFe 2+ ]( mol / m2 ) K H PO2

k β s [Fe 2+ ][>SOH]( mol / m2 ) [H + ]2

(

− ( d [Fe 2+ ] dt )

Example: as above

− ( d [Fe 2+ ] dt )

Example: log k = 0.7 (M-1 s-1) for Fe2+/O2 reaction on FeOOH

(

− d [>SOFe 2+ ]( mol / m2 ) dt

Heterogeneous Autocatalytic Fe2+ Oxidation

Autocatalytic rate (M s-1)

⎛ d [Fe 2+ ] ⎞ −⎜ = k[FeO x (s)][Fe 2+ ] ⎟ ⎝ dt ⎠ autocatalytic FeOx is poorly characterized and can contain several mineral phases (e.g., amorphous Fe(OH)3 or FeOOH).

Heterogeneous Autocatalytic Mn2+ Oxidation

⎛ d [Mn 2+ ] ⎞ −⎜ = k[MnO x (s)][Mn 2+ ] ⎟ ⎝ dt ⎠autocatalytic Autocatalytic rate (M s-1)

Example: ks = 5 × 1018 M-4 day-1 where MnOx is poorly characterized and can contain several mineral phases (e.g., MnOOH, Mn3O4, MnO2, or birnessite).

Table 3.

Iron (III) Oxide Dissolution

Proton-Promoted Slowest

FeOOH + 3 H+ → Fe(III)(aq) + 2 H2O Ligand-Promoted (FeOOH)>FeIII-OH + L- + H+ → (FeOOH)>FeIII-L + H2O → FeOOH + Fe(III)-L(aq) Examples: L- = oxalate, malonate, citrate, Reductive FeOOH + e- + 3 H+ → Fe(II)(aq) + 2 H2O Examples: see below for manganese. Synergistic

Fastest

(FeOOH)>FeIII-L + e- → FeOOH + Fe(II)(aq) + LExamples: L- = oxalate, malonate, or citrate; e- = ascorbate or Fe2+

Manganese (III, IV) Oxide Dissolution

Reductive MnOOH + e- + 3 H+ → Mn(II)(aq) + 2 H2O MnO2 + 2 e- + 4 H+ → Mn(II)(aq) + 2 H2O Examples: e- = ascorbate, hydroquinone, dithionite (S2O42-), H2S, pyrogallol

Table 4.

Table 5.

4.21

-

OOC(CH2)4COO-

4.34

-OOC(CH2)3COO-

Glutarate (3)

Adipate (4)

4.42

2.85

1.25

pKa1

OOC(CH2)2COO-

-

OOC(CH2)COO-

-

OOCCOO-

-

Formula

Succinate (2)

Malonate (1)

Oxalate (0)

Ligand

5.64

5.43

5.42

5.70

4.27

pKa2

5.0

5.0

5.0

5.0

5.0

pH

< 2.8 × 10-12

3.3 × 10-11

< 2.8 × 10-12

1.4 × 10-11

1.0 × 10-10

Rate (mol m-2 s-1)

< 4.1 × 10-7

4.8 × 10-6

< 4.1 × 10-7

2.0 × 10-6

1.5 × 10-5

Rate Constant, k (s-1)

N/A

7200 ± 700

2700 ± 300

3000 ± 300

30000 ± 3000

Langmuir Binding Constant, K (M-1)

Figure 1.

Figure 2.

Figure 3.

Figure 4.

1.0

Oxalate ~ = 400 cm-1 0.8 Dn Bidentate nas(CO2) 0.6 Structure 1711 cm-1 0.4

nas(CO2) 1701 cm-1

ns(CO2) 1305 cm-1

0.2 0

Malonate ~ -1 0.8 Dn = 282 cm Bidentate 0.6 Structure

nas(CO2) 1631 cm-1

0.4

ns(CO2) 1349 cm-1

0.2

Arbitrary Units

0

Succinate ~ = 219 cm-1 0.8 Dn Monodentate 0.6 Structure 0.4

nas(CO2) 1628 cm-1

nas(CO2) 1547 cm-1 ns(CO2) 1409 cm-1

0.2 0

nas(CO2) Glutarate ~ = 219 cm-1 1632 cm-1 0.8 Dn Bidentate 0.6 Structure 0.4 0.2

ns(CO2) 1450 cm-1

0

Adipate n (CO2) ~ = 221 cm-1 as 0.8 Dn 1635 cm-1 Monodentate 0.6 Structure 0.4

nas(CO2) 1540 cm-1 ns(CO2) 1404 cm-1

0.2 0

Figure 5.

1950

1850

1750 1650 1550 1450 Wavenumber (cm-1)

1350

1250

O

OH

n=0

Fe

O C

+ OH2+

-

O

O

C

C

+ H3O+

Fe

O-

O

C

O

O

O

n=1

Fe

O

O

OH

C

+ OH2+

-

CH2

O

C

C

Fe

O

O

OH

+ 2H2O

CH2 C O -

O

O C

n=2

O

O

OH

C

OH2+

(CH2)2

C

-

-

+ H2O

Fe OH2+

OH

O

C O

O

+

Fe

(CH2)2

O

n=3

Fe

O

O

OH

C

+ OH2+

-

(CH2)3

Fe

C

CH2 CH2

O

OH

O

C

O

C

+ 2H2O

CH2

O -

O

O C

n=4

Fe OH2+

Figure 6.

O C

+ -

O

C

O

O

OH

(CH2)4

(CH2)4

C

-

+ H 2O

Fe

OH

O

OH2+

B

A

1 µm

Figure 7.

1 µm

5.00

3.00

As-O Shell 1.70 Å

Mn-Mn = 2.86 Å

As-Mn Shell 3.22 Å

As(III)-MnO 2

Mn4+

Mn4+

As

As

n=

As(V)-MnO 2

3.2 2Å

2.00

1.00 As(V) Solution 0.00 0.00 1.00 2.00 3.00 4.00 5.00 6.00 Distance (Å)

Figure 8.

Bidentate Binuclear Surface Complex >(MnIVO)2AsVOOH

-M

Fourier Transform Magnitude

4.00

Data Fit

= Oxygen