101. 102. 103. 104. 105. 100. 101. 102. 103. 104. 105. N. ( t. ) t p(z)=z-2e-z p(z)=e-z/10. Slope=1. Figure S6: Comparison of the growing tendencies of N(t) ...
105 104 103 102
N(t)
Slope=1
p(z)=z e z p(z)=e z -2
101
- /10
t
0
10
100
-
101
102
103
104
105
Figure S6: Comparison of the growing tendencies of N(t) between the cases of power-law distribution with an exponential cutoff and the purely exponential distribution. The black and red solid lines denote the results generated by a power-law distribution with a very strong exponential cutoff (p(z) ∼ z−2 exp(−z)) and a purely exponential distribution (p(z) ∼ exp(−z/10)). The dash line is of slope 1 for eye guidance.
