On the extension of quasiplurisubharmonic functions

Abstract

Let (V,ω) be a compact K\"ahler manifold such that V admits a cover by Zariski-open Stein sets with the property that ω has a strictly plurisubharmonic exhaustive potential on each element of the cover. If X⊂ V is an analytic subvariety, we prove that any ω|X-plurisubharmonic function on X extends to a ω-plurisubharmonic function on V. This result generalizes a previous result of ours on the extension of singular metrics of ample line bundles. It allows one to show that any transcendental K\"ahler class in the real Neron-Severi space NS R(V) has this extension property.