Permanental processes with kernels that are not equivalent to a symmetric matrix
Abstract
Kernels of α-permanental processes of the form \[ v(x,y)=u(x,y)+f(y), x,y∈ S, \] in which u(x,y) is symmetric, and f is an excessive function for the Borel right process with potential densities u(x,y), are considered. Conditions are given that determine whether \v(x,y);x,y∈ S\ is symmetrizable or asymptotically symmetrizable.
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