English

Log truncated threshold and zero mass conjecture

Complex Variables 2025-01-29 v1

Abstract

For plurisubharmonic functions φ\varphi and ψ\psi lying in the Cegrell class of Bn\mathbb{B}^n and Bm\mathbb{B}^m respectively such that the Lelong number of φ\varphi at the origin vanishes, we show that the mass of the origin with respect to the measure (ddcmax{φ(z),ψ(Az)})n(dd^c\max\{\varphi(z), \psi(Az)\})^n on Cn\mathbb{C}^n is zero for A\mboxHom(Cn,Cm)=CnmA\in \mbox{Hom}(\mathbb{C}^n,\mathbb{C}^m)=\mathbb{C}^{nm} outside a pluripolar set. For a plurisubharmonic function φ\varphi near the origin in Cn\mathbb{C}^n, we introduce a new concept coined the log truncated threshold of φ\varphi at 00 which reflects a singular property of φ\varphi via a log function near the origin (denoted by lt(φ,0)lt(\varphi,0)) and derive an optimal estimate of the residual Monge-Amp\`ere mass of φ\varphi at 00 in terms of its higher order Lelong numbers νj(φ)\nu_j(\varphi) at 00 for 1jn11\leq j\leq n-1, in the case that lt(φ,0)<lt(\varphi,0)<\infty. These results provide a new approach to the zero mass conjecture of Guedj and Rashkovskii, and unify and strengthen well-known results about this conjecture.

Cite

@article{arxiv.2501.16669,
  title  = {Log truncated threshold and zero mass conjecture},
  author = {Fusheng Deng and Yinji Li and Qunhuan Liu and Zhiwei Wang and Xiangyu Zhou},
  journal= {arXiv preprint arXiv:2501.16669},
  year   = {2025}
}

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R2 v1 2026-06-28T21:21:14.509Z