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

We analyze gradient flows with jumps generated by a finite set of complete vector fields in involution using some Radon measures $u\in \mathcal{U}_a$ as admissible perturbations. Both the evolution of a bounded gradient flow $\{x^u(t,ł)\in B(x^*,3\g)\subseteq \mbn: \,t\in[0,T],\,ł\in B(x^*,2\g)\}$ and the unique solution $ł=ψ^u(t,x)\in B(x^*,2\g)\subseteq \mbn$ of integral equation $x^u(t,ł)=x\in B(x^*,\g), \,t\in[0,T]$, are described using the corresponding gradient representation associated with flow and Hamilton-jacobi equations.