Spectral properties of evolutionary operators in branching random walk models
Abstract
We introduce a model of continuous-time branching random walk on a finite-dimensional integer lattice with finitely many branching sources of three types and study the spectral properties of the operator describing the evolution of the mean numbers of particles both at an arbitrary source and on the entire lattice. For the leading positive eigenvalue of the operator, we obtain existence conditions determining exponential growth in the number of...
Paper Details
Title
Spectral properties of evolutionary operators in branching random walk models
Published Date
Jul 1, 2012
Journal
Volume
92
Issue
1-2
Pages
115 - 131
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