The strong topology of ω-plurisubharmonic functions

Abstract

On (X,ω) compact K\"ahler manifold, given a model type envelope ∈ PSH(X,ω) (i.e. a singularity type) we prove that the Monge-Amp\`ere operator is an homeomorphism between the set of -relative finite energy potentials and the set of -relative energy measures endowed with their strong topologies given as the coarsest refinements of the weak topologies such that the relative energies become continuous. Moreover, given a totally ordered family A of model type envelopes with positive total mass representing different singularities types, the sets XA, YA given respectively as the union of all -relative finite energy potentials and of all -relative finite energy measures varying ∈A have two natural strong topologies which extends the strong topologies on each component of the unions. We show that the Monge-Amp\`ere operator produces an homeomorphism between XA and YA. As an application we also prove the strong stability of a sequence of solutions of prescribed complex Monge-Amp\`ere equations when the measures have uniformly Lp-bounded densities for p>1 and the prescribed singularities are totally ordered.