Asymptotic property of the distribution of the maxima of a random walk

Ideas cultivated in spectral geometry are applied to obtain an asymptotic property of a reversible random walk on an infinite graph satisfying a certain periodic condition. In the course of our argument, we employ perturbation theory for the maximal eigenvalues of twisted transition operator. As a r

This paper extends the research of Wiegel (J. Math. Phys. 21 (1980) 2111) on random walks which differ from free random walks through the occurrence of an extra weightfactor ( 1) at every crossing of a half-line. Starting from a new closed-form expression for the weight distribution of these walks,

Let 1 2n be the set of paths with 2n steps of unit length in Z 2 , which begin and end at (0, 0). For # # 1 2n , let area(#) # Z denote the oriented area enclosed by #. We show that for every positive even integer k, there exists a rational function R k with integer coefficients, such that: We calc