A flow approach to the generalized Loewner-Nirenberg problem of the σk-Ricci equation

Abstract

We introduce a flow approach to the generalized Loewner-Nirenberg problem (1.5)-(1.7) of the σk-Ricci equation on a compact manifold (Mn,g) with boundary. We prove that for initial data u0∈ C4,α(M) which is a subsolution to the σk-Ricci equation (1.5), the Cauchy-Dirichlet problem (3.1)-(3.3) has a unique solution u which converges in C4loc(M) to the solution u∞ of the problem (1.5)-(1.7), as t∞.

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