Naomi Feldheim
Published 2011-05-19, updated 2011-06-26Version 3
We study zeroes of Gaussian analytic functions in a strip in the complex plane, with translation-invariant distribution. We prove that the a limiting horizontal mean counting-measure of the zeroes exists almost surely, and that it is non-random if and only if the spectral measure is continuous (or degenerate). In this case, the mean zero-counting measure is computed in terms of the spectral measure. We compare the behavior with Gaussian analytic function with symmetry around the real axis. These results extend a work by Norbert Wiener.
Comments: 24 pages, 1 figure. Some corrections were made and presentation was improved
Spectral measures of powers of random matrices
Image of the spectral measure of a Jacobi field and the corresponding operators
Spectral measure of large random Hankel, Markov and Toeplitz matrices
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