Type: Article
Publication Date: 2017-06-04
Citations: 1
DOI: https://doi.org/10.1515/forum-2017-0049
We investigate convolution semigroups of probability measures with continuous densities on locally compact abelian groups, which have a discrete subgroup such that the factor group is compact. Two interesting examples of the quotient structure are the $d$--dimensional torus, and the adelic circle. Our main result is to show that the Poisson summation formula for the density can be interpreted as a probabilistic trace formula, linking values of the density on the factor group to the trace of the associated semigroup on $L^{2}$-space. The Gaussian is a very important example. For rotationally invariant $\alpha$-stable densities, the trace formula is valid, but we cannot verify the Poisson summation formula. To prepare to study semistable laws on the adeles, we first investigate these on the $p$--adics, where we show they have continuous densities which may be represented as series expansions. We use these laws to construct a convolution semigroup on the adeles whose densities fail to satisfy the probabilistic trace formula.
| Action | Title | Year | Authors |
|---|---|---|---|
| + PDF Chat | Fluctuations of Linear Statistics for Gaussian Perturbations of the Lattice $${\mathbb {Z}}^d$$ | 2021 |
Oren Yakir |