The level crossings of random sums

Abstract

Let \ηj\j = 0N be a sequence of independent and identically distributed complex normal random variables with mean zero and variances \σj2\j = 0N. Let \fj (z)\j = 0N be a sequence of holomorphic functions that are real-valued on the real line. The purpose of the present study is that of examining the number of times that the random sum Σj = 0N ηj fj (z) crosses the complex level K = K1 + i K2, where K1 and K2 are constants independent of z. More specifically, we establish an exact formula for the expected density function for the complex zeros. We then reformulate the problem in terms of successive observations of a Brownian motion. We further answer the basic question about the expected number of complex zeros for coefficients of nonvanishing mean values.