Permanental sequences that are related to a Markov chain example of Kolmogorov
Abstract
Permanental sequences with non-symmetric kernels that are generalization of the potentials of a Markov chain with state space \0,1/2, …, 1/n,…\ that was introduced by Kolmogorov, are studied. Depending on a parameter in the kernels we obtain an exact rate of divergence of the sequence at 0, an exact local modulus of continuity of the sequence at 0, or a precise bounded discontinuity for the sequence at 0.
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