Monge-Amp\`ere measures on contact sets

Abstract

Let (X, ω) be a compact K\"ahler manifold of complex dimension n and θ be a smooth closed real (1,1)-form on X such that its cohomology class \ θ \∈ H1,1(X, R) is pseudoeffective. Let be a θ-psh function, and let f be a continuous function on X with bounded distributional laplacian with respect to ω such that ≤ f. Then the non-pluripolar measure θn:= (θ + ddc )n satisfies the equality: 1\ = f \ \ θn = 1\ = f \ \ θfn, where, for a subset T⊂eq X, 1T is the characteristic function. In particular we prove that \[ θPθ(f)n= 1\Pθ(f) = f\ \ θfn and θPθ[](f)n = 1\Pθ[](f) = f \ \ θfn. \]