Local curvature estimates for the Ricci-harmonic flow

Abstract

In this paper we give an explicit bound of g(t)u(t) and the local curvature estimates for the Ricci-harmonic flow under the condition that the Ricci curvature is bounded along the flow. In the second part these local curvature estimates are extended to a class of generalized Ricci flow, introduced by the author LY1, whose stable points give Ricci-flat metrics on a complete manifold, and which is very close to the (K, N)-super Ricci flow recently defined by Xiangdong Li and Songzi Li LL2014. Next we propose a conjecture for Einstein's scalar field equations motivated by a result in the first part and the bounded L2-curvature conjecture recently solved by Klainerman, Rodnianski and Szeftel KRS2015. In the last two parts of this paper, we discuss two notions of "Riemann curvature tensor" in the sense of Wylie-Yeroshkin KW2017, KWY2017, Wylie2015, WY2016, respectively, and Li LY3, whose "Ricci curvature" both give the standard Bakey-\'Emery Ricci curvature BE1985, and the forward and backward uniqueness for the Ricci-harmonic flow.