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Nov 12, 2009 - Z. ARVASËI, T.S. KUZPINARI and E.¨O. USLU. (communicated by ... Ellis-Stein [17] showed that catn-groups are equivalent to ... (iii) It gives a possible way of generalising n-crossed modules (or equivalently n- groups (see ...
Dec 13, 1984 - Let X(x9 y) = (ax + by + F(x, y)9 ex + dy + G(x, y)) be a vector field ... Ix4 + ax3 + (d â m) x2 â bx + n has no real roots different from zero.
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Mar 15, 2002 - (Discrete) Gruss' inequality, a complement of $6eby\check{s}evs$ in- ..... [5] S. IZUMINO, H. MORI and Y. SEO, On Ozeb's inequality, J. Inequal.
n â 1 and n, respectively, after killing the common factors, we arrive at a new rational .... A counterexample below destroys our dream for the first question,.
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Feb 14, 1994 - (log(D)+ 3c)3. In order to show that the hypothesis (H) is satisfied whenever N is a quaternion octic CM-field with ideal class group of exponent ...
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Aug 7, 2005 - D.B. Duncan, M. Grinfeld and I. Stoleriu, Coarsening in an integro- ... M. Grinfeld, G. Hines, V. Hutson, K. Mischaikow and G.T. Vickers, Non- ...
COMMUNICATIONS IN INFORMATION AND SYSTEMS c 2006 International Press. Vol. ... ROBERT J. ELLIOTT AND SIMON HAYKIN. Suppose for each k = 0, 1, ...
Jun 14, 2000 - finiteness of the set of prime ideals of R that expand to a given ideal of S. To this end we introduce the notions of. GD(1) domains and GD(2) ...
field function, which replaces the sharp boundary of the domain with a diffuse layer (e.g. diffuse domain), the equation is reformulated on a larger regular domain ...
Jul 18, 2012 - The third author is the corresponding author. ... Copyright c 2013 Rocky Mountain Mathematics Consortium ...... the Hilbert series of S. ââ .... that 2Ã2 minors of a 3Ã2 matrix with homogeneous entries of ..... 150 (1963), 99 110
Apr 28, 1999 - Topological group, approach space, approach group, ...... L.S. Pontryagin, Topological groups, Gordon and Breach Science Publishers,.
Jonathan Lubin for his insights and suggestions in the development and presentation of ... One of the most important results of Lazard [3] was that, given a formal.
Apr 18, 2006 - [5 ] H. Davenport, Multiplicative number theory, Second ed. revised by Hugh L. Montgomery,. Springer-Verlag, New York-Berlin, 1980.
Oct 12, 1981 - rational cohomology group of the surface S. Then, bya theory of. Deligne [1] .... is isogenous to the product BB, and by restriction the maximal.
In 1973, R. Bowen [5] constructed Markov families for Axiom. A flows. ..... [11] M. Rees, Checking ergodicity of some geodesic flows with infinite Gibbs measure,.
T. Adachi Nagoya Math. J. Vol. 104 (1986), 55-62
MARKOV FAMILIES FOR ANOSOV FLOWS WITH AN INVOLUTIVE ACTION TOSHIAKI ADACHI
§ 1. Introduction The aim of this note is to construct "involutive" Markov families for geodesic flows of negative curvature. Roughly speaking, a Markov family for a flow is a finite family of local cross-sections to the flow with fine boundary conditions. They are basic tools in the study of dynamical systems. In 1973, R. Bowen [5] constructed Markov families for Axiom A flows. Using these families, he reduced the problem of counting periodic orbits of an Axiom A flow to the case of hyperbolic symbolic flows. It is well-known that geodesic flows of negative curvature are Anosov flows, hence are of Axiom A type. But within the class of Anosov flows the geodesic flows still retain a special importance. Let ψt be the geodesic flow on the unit tangent bundle UN of a compact manifold N of negative curvature. If we define an involution θ: UN'—• UN by θ(v) = — v, then we have ψt°θ = θoψ_t. This is a typical property and should be utilized for getting some informations on geodesies. For applying Bowen's symbolic dynamics, Markov families which inherit this involutive property are very useful. In the forthcoming paper [2], we shall show that there exist infinitely many prime closed geodesies in each one-dimensional homology class of N. By using our preliminary work, one can reduce the problem to the case of "involutive" graphs. Our construction goes on the same lines as in [5]. Since it is not difficult to fill up between the lines, we just point out where should be modified. The author is grateful to Professors K. Shiraiwa and T. Sunada for valuable advice.
Received February 7, 1985. 55
56
§2.
TOSHIAKI ADACHI
Involutive Markov families
A differentiate flow 0 such that \\dφt(v)\\
< Ce-"\\v\\ C 0 , for ϋ e £ u , ί > 0 .
A finite family of closed sets &~ = {TΊ, of size α if the followings hold;
, Tn} is called a proper family
2) there are differentiable closed disks A , , Dn transverse to φt of diameter smaller than a such that a) dim (A) = dim (Af) - 1, b) Tt C Lit (A) and T, =lnt^~(TΪ)9 where ΊntDt (Ti) is the interior of Γ? with respect to the relative topology of A , c) for i Φ j , at least one of the sets A Π ^[0,α](A) a n ( i DJ Π φ^^DΪ) is empty. For each x e Γ ( ^ ) - UΓ=i Γ* let 0 < t,{x) < a be the least time for which ψt{x)eΓ{3Γ). We define a bijection Hr\ Γ{3Γ)->Γ(3Γ) by J9rr(x) =
