Gradient estimates on graphs with the CD(n,-K)condition

Abstract

This paper investigates gradient estimates on graphs satisfying the CD(n,-K) condition with positive constants n,K, and concave C1 functions :(0,+∞)→R. Our study focuses on gradient estimates for positive solutions of the heat equation ∂tu= u. Additionally, the estimate is extended to a heat-type equation ∂tu= u+cuσ, where σ is a constant and c is a continuous function defined on [0,+∞). Furthermore, we utilize these estimates to derive heat kernel bounds and Harnack inequalities.

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