Higher Regularity Theory for a Mixed-Type Parabolic Equation

Abstract

In this paper, we study the higher regularity theory of a mixed-type parabolic problem. We extend the recent work of DMR to construct solutions that have an arbitrary number of derivatives in Sobolev spaces. To achieve this, we introduce a counting argument based on a quantity called the "degree". In the second part of this paper, we apply this existence theory to the Prandtl system near the classical Falkner-Skan self-similar profiles in order to supplement the stability analysis of IM22 with a rigorous construction argument.

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