Nonlocal Lagrange multipliers and transport densities

Abstract

We prove the existence of generalised solutions of the Monge-Kantorovich equations with fractional s-gradient constraint, 0<s<1, associated to a general, possibly degenerate, linear fractional operator of the type, equation* Lsu=-Ds·(ADsu+ b\,u)+ d· Dsu+c\,u , equation* with integrable data, in the space s,p0(), which is the completion of the set of smooth functions with compact support in a bounded domain for the Lp-norm of the distributional Riesz fractional gradient Ds in d (when s=1, D1=D is the classical gradient). The transport densities arise as generalised Lagrange multipliers in the dual space of L∞(d) and are associated to the variational inequalities of the corresponding transport potentials under the constraint |Dsu|≤ g. Their existence is shown by approximating the variational inequality through a penalisation of the constraint and nonlinear regularisation of the linear operator Lsu. For this purpose, we also develop some relevant properties of the spaces s,p0(), including the limit case p=∞ and the continuous embeddings s,q0()⊂ s,p0(), for 1 p q∞. We also show the localisation of the nonlocal problems (0<s<1), to the local limit problem with classical gradient constraint when s→1, for which most results are also new for a general, possibly degenerate, partial differential operator L1u only with integrable coefficients and bounded gradient constraint.