Heat flow on Finsler manifolds

Abstract

We present two approaches to the heat flow on a Finsler manifold (M,F): either as gradient flow on L2(M,m) for the energy; or as gradient flow on the reverse L2-Wasserstein space P2(M) of probability measures on M for the relative entropy. Both approaches depend on the choice of a measure m on M and then lead to the same nonlinear evolution semigroup. We prove C1,α-regularity for solutions to the (nonlinear) heat equation on the Finsler space (M,F,m). Typically, solutions to the heat equation will not be C2. Moreover, we derive pointwise comparison results a la Cheeger-Yau and integrated upper Gaussian estimates a la Davies.