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Strong convergence to global solutions for multidimensional flows of compressible, viscous fluids with polytropic equations of state and discontinuous initial data

✍ Scribed by David Hoff

Publisher: Springer
Year: 1995
Tongue: English
Weight: 637 KB
Volume: 132
Category: Article
ISSN: 0003-9527
DOI: 10.1007/bf00390346

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✦ Synopsis

We extend to general polytropic pressures P(p)= KpT,7 > 1, the existence theory of [8] for isothermal (7 = 1) flows of Navier-Stokes fluids in two and three space dimensions, with fairly general initial data. Specifically, we require that the initial density be close to a constant in L 2 and L ~~ and that the initial velocity be small in L 2 and bounded in L 2" (in two dimensions the L 2 norms must be weighted slightly). Solutions are obtained as limits of approximate solutions corresponding to mollified initial data. The key point is that the approximate densities are shown to converge strongly, so that nonlinear pressures can be accommodated, even in the absence of any uniform regularity information for the approximate densities.

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