Gradient flows with jumps associated with nonlinear Hamilton-Jacobi equations with jumps

Abstract

We analyze gradient flows with jumps generated by a finite set of complete vector fields in involution using some Radon measures u∈ Ua as admissible perturbations. Both the evolution of a bounded gradient flow \xu(t,)∈ B(x*,3)⊂eq : \,t∈[0,T],\,∈ B(x*,2)\ and the unique solution =u(t,x)∈ B(x*,2)⊂eq of integral equation xu(t,)=x∈ B(x*,), \,t∈[0,T], are described using the corresponding gradient representation associated with flow and Hamilton-jacobi equations.