Optimal transportation and monotonic quantities on evolving manifolds

Abstract

In this note we will adapt Topping's L-optimal transportation theory for Ricci flow to a more general situation, i.e. to a closed manifold (M,gij(t)) evolving by ∂tgij=-2Sij, where Sij is a symmetric tensor field of (2,0)-type on M. We extend some recent results of Topping, Lott and Brendle, generalize the monotonicity of List's (and hence also of Perelman's) W-entropy, and recover the monotonicity of Muller's (and hence also of Perelman's) reduced volume.