An algebraic proof of K-semistability of the projective plane
Jihun Park, Joonyeong Won
TL;DR
This paper provides an algebraic geometric proof demonstrating that the projective plane is K-semistable, contributing to the understanding of stability conditions in algebraic geometry.
Contribution
It offers a novel algebraic proof of K-semistability specifically for the projective plane, expanding the toolkit for stability analysis.
Findings
Confirmed the K-semistability of the projective plane
Provided an algebraic approach to stability proofs
Enhanced understanding of algebraic methods in stability theory
Abstract
We present an algebro-geometric proof of the K-semistability of the projective plane.
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Taxonomy
TopicsGeometry and complex manifolds · Geometric Analysis and Curvature Flows · Advanced Differential Equations and Dynamical Systems