The space of finite-energy metrics over a degeneration of complex manifolds

Abstract

Given a degeneration of compact projective complex manifolds X over the punctured disc, with meromorphic singularities, and a relatively ample line bundle L on X, we study spaces of plurisubharmonic metrics on L, with particular focus on (relative) finite-energy conditions. We endow the space 1(L) of relatively maximal, relative finite-energy metrics with a d1-type distance given by the Lelong number at zero of the collection of fibrewise Darvas d1-distances. We show that this metric structure is complete and geodesic. Seeing X and L as schemes X, L over the discretely-valued field =C((t)) of complex Laurent series, we show that the space 1(L) of non-Archimedean finite-energy metrics over L embeds isometrically and geodesically into 1(L), and characterize its image. This generalizes previous work of Berman-Boucksom-Jonsson, treating the trivially-valued case. We investigate consequences regarding convexity of non-Archimedean functionals.