Multi-scale Vandermonde test kernels for spectral trace formulas
Abstract
We construct a family of test kernels for use in spectral trace formulas on locally symmetric spaces. The key innovation is the factorization , which simultaneously achieves: (i) automatic positive semi-definiteness of the spectral multiplier ; (ii) -fold moment annihilation via a multi-scale Vandermonde construction, yielding super-polynomial decay of all error terms; (iii) uniform spectral parameter bounds (Master-Bound) with depending only on the symmetry order and the annihilation depth , representing a power saving over the main term . The cost is a controlled polynomial growth in the Vandermonde coefficients (with exponent strictly less than 1), which is dominated by the super-polynomial decay of the off-diagonal terms. The construction is axiomatized over two analytic hypotheses -- a Weyl law and Bessel/Airy asymptotics -- making it applicable beyond the classical setting.
Cite
@article{arxiv.2602.11205,
title = {Multi-scale Vandermonde test kernels for spectral trace formulas},
author = {Stefan Horvath},
journal= {arXiv preprint arXiv:2602.11205},
year = {2026}
}
Comments
Error found in kuznetsov side of annihilation. keeping kloosterman side and resubmit