Evolution problem for the 1-Laplacian with mixed boundary conditions
Abstract
This paper deals with evolution problem for the 1-Laplacian with mixed boundary conditions on a bounded open set of N. We prove existence and uniqueness of strong solutions for data in L2() by mean of the theory of maximal monotone operator. We also see that if the flux on the boundary is~1 (that is, the maximum possible) then these strong solutions can be seen as the large solutions introduced in MP. We give explicit examples of solutions.
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