A comparison principle for viscosity solutions of nonlinear PDEs on finite nonnegative measures is proved and used to characterize the value function of a controlled branching McKean-Vlasov diffusion as the unique viscosity solution of the associated HJB equation.
Mean field control with absorption
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abstract
In this paper we study a mean field control problem in which particles are absorbed when they reach the boundary of a smooth domain. The value of the N-particle problem is described by a hierarchy of Hamilton-Jacobi equations which are coupled through their boundary conditions. The value function of the limiting problem; meanwhile, solves a Hamilton-Jacobi equation set on the space of sub-probability measures on the smooth domain, i.e. the space of non-negative measures with total mass at most one. Our main contributions are (i) to establish a comparison principle for this novel infinite-dimensional Hamilton-Jacobi equation and (ii) to prove that the value of the N-particle problem converges in a suitable sense towards the value of the limiting problem as N tends to infinity.
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math.PR 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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Comparison of viscosity solutions for a class of non-linear PDEs on the space of finite nonnegative measures
A comparison principle for viscosity solutions of nonlinear PDEs on finite nonnegative measures is proved and used to characterize the value function of a controlled branching McKean-Vlasov diffusion as the unique viscosity solution of the associated HJB equation.