Regularized n-Conformal heat flow and global smoothness
Abstract
In this paper, we introduce the regularized conformal heat flow of n-harmonic maps, or simply regularized n-conformal heat flow from n-dimensional Riemannian manifold. This is a system of evolution equations combined with regularized n-harmonic map flow and a metric evolution equation in conformal direction. For n=2, the conformal heat flow does not develop finite time singularity unlike usual harmonic map flow P23 (Park, 2024). In this paper, we show the analogous result, that regularized n-conformal heat flow does not develop finite time singularity unlike the (regularized) n-harmonic map flow.
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