Riso-stratifications and a tree invariant
Abstract
We introduce a new notion of stratification (``riso-stratification''), which is canonical and which exists in a variety of settings, including different topological fields like , and , and also including different o-minimal structures on . Riso-stratifications are defined directly in terms of a suitable notion of triviality along strata; the key difficulty and main result is that the strata defined in this way are ``algebraic in nature'', i.e., definable in the corresponding first-order language. As an example application, we show that local motivic Poincar\'e series are, in some sense, trivial along the strata of the riso-stratification. Behind the notion of riso-stratification lies a new invariant of singularities, which we call the ``riso-tree'', and which captures, in a canonical way, information that was contained in the non-canonical strata of a Lipschitz stratification. On our way to the Poincar\'e series application, we show, among others, that our notions interact well with motivic integration.
Cite
@article{arxiv.2206.03438,
title = {Riso-stratifications and a tree invariant},
author = {David Bradley-Williams and Immanuel Halupczok},
journal= {arXiv preprint arXiv:2206.03438},
year = {2024}
}
Comments
64 pages, 6 figures; v2: Revised figures and Introduction otherwise minor changes to presentation