Litcius/Paper detail

Global $C^∞$ regularity of the steady Prandtl equation with favorable pressure gradient

Yue Wang, Zhifei Zhang

2021Annales de l Institut Henri Poincaré C Analyse Non Linéaire21 citationsDOI

Abstract

In the case of favorable pressure gradient , Oleinik obtained the global-in- x solutions to the steady Prandtl equations with low regularity (see Oleinik and Samokhin [9], P.21, Theorem 2.1.1). Due to the degeneracy of the equation near the boundary, the question of higher regularity of Oleinik's solutions remains open. See the local-in- x higher regularity established by Guo and Iyer [5]. In this paper, we prove that Oleinik's solutions are smooth up to the boundary y = 0 for any x > 0 , using further maximum principle techniques. Moreover, since Oleinik only assumed low regularity on the data prescribed at x = 0 , our result implies instant smoothness (in the steady case, x = 0 is often considered as initial time).

Topics & Concepts

SmoothnessDegeneracy (biology)Prandtl numberPressure gradientMathematicsMathematical analysisBoundary (topology)Maximum principleThermodynamicsPhysicsMechanicsConvectionMathematical optimizationBioinformaticsBiologyOptimal controlAdvanced Mathematical Physics ProblemsNavier-Stokes equation solutionsNonlinear Partial Differential Equations