Semialgebraic and Continuous Solution of Linear Equations with Semialgebraic Coefficients
Abstract
Starting from the results of Charles Fefferman and Janos Koll\'ar in \texit{Continuous Solutions of Linear Equations} [1], we adopt a new approach based on Fefferman's techniques of Glaeser refinement to show a more general result than the one proved by Koll\'ar by using techniques from algebraic geometry. Considering a system of linear equations with semialgebraic (not only polynomial as in [1]) coefficients on , we get a necessary and sufficient condition for the existence of a continuous and semialgebraic solution on . This is different from what Fefferman and Luli obtained in \textit{Semialgebraic Sections Over the Plane} since they stated their result for solutions of regularity on the plane . More in depth, we prove that a continuous and semialgebraic solution on exists if and only if there is a continuous solution i.e., if the Glaeser-stable bundle associated to the system has no empty fiber.
Cite
@article{arxiv.2202.05815,
title = {Semialgebraic and Continuous Solution of Linear Equations with Semialgebraic Coefficients},
author = {Marcello Malagutti},
journal= {arXiv preprint arXiv:2202.05815},
year = {2023}
}
Comments
12 pages. arXiv admin note: text overlap with arXiv:2005.00067