arXiv:2405.20571 Abstract | arXiv Analytics

arXiv:2405.20571 [math.PR]Abstract References Reviews Resources

On the principal eigenvalue for compound Poisson processes

Published 2024-05-31Version 1

We investigate the explicit expression for the principal eigenvalue $\lambda_{1}^{X}(D)$ for a large class of compound Poisson processes $X$ on a bounded open set $D$ by examining its spectral heat content. When the jump density of the compound Poisson process is radially symmetric and strictly decreasing, we demonstrate that balls are the unique minimizers for $\lambda_{1}^{X}(D)$ among all sets with equal Lebesgue measure. Furthermore, we show that this uniqueness fails if the jump density is not strictly decreasing.

Categories: math.PR

Subjects: 60J76

Keywords: compound poisson process, principal eigenvalue, jump density, spectral heat content, equal lebesgue measure

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