On quadratic persistence and Pythagoras numbers of totally real projective varieties

Abstract

In this paper, we study the relationship between quadratic persistence and the Pythagoras number of totally real projective varieties. Building upon the foundational work of Blekherman et al. in arXiv:1902.02754, we extend their characterizations of arithmetically Cohen-Macaulay varieties with next-to-maximal quadratic persistence to arbitrary case. Our main result classifies totally real non-aCM varieties of codimension c and degree d that exhibit next-to-maximal quadratic persistence in the cases where c=3 and d ≥ 6 or c ≥ 4 and d ≥ 2c+3. We further investigate the quadratic persistence and Pythagoras number in the context of curves of maximal regularity and linearly normal smooth curves of genus 3.