English

Monge-Amp\`{e}re measures on contact sets

Complex Variables 2020-01-01 v1

Abstract

Let (X,ω)(X, \omega) be a compact K\"ahler manifold of complex dimension n and θ\theta be a smooth closed real (1,1)(1,1)-form on XX such that its cohomology class {θ}H1,1(X,R)\{ \theta \}\in H^{1,1}(X, \mathbb{R}) is pseudoeffective. Let φ\varphi be a θ\theta-psh function, and let ff be a continuous function on XX with bounded distributional laplacian with respect to ω\omega such that φf.\varphi \leq f. Then the non-pluripolar measure θφn:=(θ+ddcφ)n\theta_\varphi^n:= (\theta + dd^c \varphi)^n satisfies the equality: 1{φ=f} θφn=1{φ=f} θfn, {\bf{1}}_{\{ \varphi = f \}} \ \theta_\varphi^n = {\bf{1}}_{\{ \varphi = f \}} \ \theta_f^n, where, for a subset TXT\subseteq X, 1T{\bf{1}}_T is the characteristic function. In particular we prove that θPθ(f)n=1{Pθ(f)=f} θfnandθPθ[φ](f)n=1{Pθ[φ](f)=f} θfn. \theta_{P_{\theta}(f)}^n= { \bf {1}}_{\{P_{\theta}(f) = f\}} \ \theta_f^n\qquad {\rm and }\qquad \theta_{P_\theta[\varphi](f)}^n = { \bf {1}}_{\{P_\theta[\varphi](f) = f \}} \ \theta_f^n.

Keywords

Cite

@article{arxiv.1912.12720,
  title  = {Monge-Amp\`{e}re measures on contact sets},
  author = {Eleonora Di Nezza and Stefano Trapani},
  journal= {arXiv preprint arXiv:1912.12720},
  year   = {2020}
}

Comments

comments are welcome!

R2 v1 2026-06-23T12:58:32.782Z