Some results on evolution
Abstract
Let K be a compact subset of Cn, K K a closed subset. In this paper we are dealing with evolution Et(K,K) of K with fixed part K by Levi form. This amounts to solve a parabolic problem for an elliptic operator. We prove existence and unicity for such a problem and the solution u(z,t) exists for any time t 0.If K is a smooth graph and K= b the the evolution Et(, b) is still a graph. In particular, if b bounds a Levi flat hypersurface M then Et(, b) M as t+∞.
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