L1 metric geometry of potentials with prescribed singularities on compact K\"ahler manifolds

Abstract

Given (X,ω) compact K\"ahler manifold and ∈M+⊂ PSH(X,ω) a model type envelope with non-zero mass, i.e. a fixed potential determing some singularities such that ∫X(ω+ddc)n>0, we prove that the -relative finite energy class E1(X,ω,) becomes a complete metric space if endowed with a distance d which generalizes the well-known d1 distance on the space of K\"ahler potentials. Moreover, for A⊂ M+ total ordered, we equip the set XA:=∈AE1(X,ω,) with a natural distance dA which coincides with the distance d on E1(X,ω,) for any ∈A. We show that (XA,dA) is a complete metric space. As a consequence, assuming k and k,∈ M+, we also prove that (E1(X,ω,k),d) converges in a Gromov-Hausdorff sense to (E1(X,ω,),d) and that there exists a direct system (E1(X,ω,k),d),Pk,j in the category of metric spaces whose direct limit is dense into (E1(X,ω,),d).