The unique continuation property for a nonlinear equation on trees
Abstract
In this paper we study the game p-Laplacian on a tree, that is, u(x)=α2\y∈ (x)u(y) + y∈ (x)u(y)\ + βmΣy∈ (x) u(y), here x is a vertex of the tree and S(x) is the set of successors of x. We study the family of the subsets of the tree that enjoy the unique continuation property, that is, subsets U such that uU=0 implies u 0.
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