Continuum limit of $p$-Laplacian evolution problems on graphs:$L^q$ graphons and sparse graphs

Abstract: In this paper we study continuum limits of the discretized p-Laplacian evolution problem on sparse graphs with homogeneous Neumann boundary conditions. This extends the results of [24] to a far more general class of kernels, possibly singular, and graph sequences whose limit are the so-called L q -graphons. More precisely, we derive a bound on the distance between two continuous-in-time trajectories defined by two different evolution systems (i.e. with different kernels, second member and initial data). Simila… Show more