The 2-systole on compact K\"ahler surfaces with positive scalar curvature

Abstract

We study the 2-systole on compact K\"ahler surfaces of positive scalar curvature. For any such surface (X,ω), we prove the sharp estimate X S(ω)·sys2(ω) 12π, with equality if and only if X=P2 and ω is the Fubini-Study metric. Using the classification of positive scalar curvature K\"ahler surfaces, we determine the optimal constant in each case and describe the corresponding rigid models. When X is a non-rational ruled surface, we also give an independent analytic proof, adapting Stern's level set method to the holomorphic fibration in K\"ahler setting.