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An improvement of regularity result for pseudo Calabi flow

Jingrui Cheng, Junhao Tian

Abstract

In this paper, we observe that if the initial data of pseudo Calabi flow has volume form $C^0$ close to a smooth one, then the flow is immediately smooth for $t>0$. As an application, we show that if the initial data has volume form $C^0$ close to that of a cscK metric, then the pseudo Calabi flow exists for $t\in (0,+\infty)$. We also prove similar improvement of regularity and long time existence result for pseudo Calabi flow on a Fano manifold when the volume form is bounded and the class is close to $c_1(M)$.

An improvement of regularity result for pseudo Calabi flow

Abstract

In this paper, we observe that if the initial data of pseudo Calabi flow has volume form close to a smooth one, then the flow is immediately smooth for . As an application, we show that if the initial data has volume form close to that of a cscK metric, then the pseudo Calabi flow exists for . We also prove similar improvement of regularity and long time existence result for pseudo Calabi flow on a Fano manifold when the volume form is bounded and the class is close to .
Paper Structure (8 sections, 43 theorems, 327 equations)

This paper contains 8 sections, 43 theorems, 327 equations.

Table of Contents

  1. Introduction
  2. preliminary and background
  3. $C^0$ estimate along Pseudo Calabi flow
  4. Higher order estimate
  5. When $P$ is close to a continuous function
  6. When initial volume form is small
  7. When the Kähler metric is close to cscK in volume form
  8. When $M$ is Kähler-Einstein

Key Result

Theorem 1.1

Let $(M,\omega_0)$ be a compact Kähler manifold, then:

Theorems & Definitions (69)

  • Theorem 1.1
  • Proposition 1.1
  • Theorem 1.2
  • Theorem 1.3
  • Theorem 3.1: Theorem $A^*$ in DDGH2008
  • Theorem 3.2
  • Theorem 3.3
  • Lemma 3.1
  • proof : Proof of Lemma \ref{['Lem21']}
  • proof : Proof of Theorem \ref{['MT21']}
  • ...and 59 more