Polynomial stability conditions for vector bundles: Positivity, equivariance and blow-ups

TL;DR

This paper introduces P-critical connections for hermitian holomorphic vector bundles, providing a framework that generalizes existing stability conditions and offers practical tools for verifying solution existence on complex manifolds.

Contribution

It defines P-critical connections, links them to stability conditions, and develops methods to verify positivity and stability, especially on toric and blown-up varieties.

Findings

P-positivity is equivalent to its equivariant version on T-varieties.

Explicit tests for P-positivity are available in toric cases.

Uniform P-positivity is preserved under blow-ups.

Abstract

We introduce the notion of P-critical connections for hermitian holomorphic vector bundles over compact balanced manifolds: integrable hermitian connections whose curvature solves a polynomial equation. Such connections include HYM and dHYM connections, as well as solutions to higher rank Monge-Amp\`ere or J-equations, and are a slight generalisation of Dervan-McCarthy-Sektnan's Z-critical connections motivated by Bayer's polynomial Bridgeland stability conditions. The associated equations come with a moment map interpretation, and we provide numerical conditions that are expected to characterise existence of solutions in suitable cases: P-positivity and P-stability. We then provide some devices to check those numerical conditions in practice. First, we observe that P-positivity is equivalent to its equivariant version over T-varieties. In the toric case, we thus obtain an explicit finite set of subvarieties to test P-positivity on, independently on the choice of the polynomial equation. We also introduce equivariant P-stability and discuss its relation to P-stability. Secondly, we show that a uniform version of P-positivity is preserved by pulling back along a blow-up of points. We apply those results to some examples, such as blow-ups of Hirzebruch surfaces, or a Fano 3-fold.