A YTD correspondence for constant scalar curvature metrics

Abstract

Given a compact K\"ahler manifold, to better understand Mabuchi's K energy we introduce a family of Kβ energies, whose favorable properties are similar to those of the Ding energy from the Fano case. The construction uses Berman's transcendental quantization, and we show that the slope of the Kβ energies along test configurations can be computed using intersection theory. With these ingredients in place we provide a uniform Yau-Tian-Donaldson correspondence that characterizes the existence of a unique constant scalar curvature K\"ahler metric using test configurations. Combining our techniques with the non-Archimedean approach to K-stability pioneered by Boucksom--Jonsson, we show that the properness of the classical K energy can be tested by checking its slope along a distinguished subclass of Chi Li-type models, called log discrepancy models, thus yielding another G-uniform Yau--Tian--Donaldson correspondence.