M. Sammartino scite author profile

Abstract. We consider the mild solutions of the Prandtl equations on the half space. Requiring analyticity only with respect to the tangential variable, we prove the short time existence and the uniqueness of the solution in the proper function space. The proof is achieved applying the abstract Cauchy-Kowalewski theorem to the boundary layer equations once the convection-diffusion operator is explicitly inverted. This improves the result of [M. Sammartino and R. E. Caflisch, Comm. Math. Phys., 192 (1998), pp. 433-461], as we do not require analyticity of the data with respect to the normal variable.

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A thermodynamical approach to Eddington factors

Anile

Pennisi

Sammartino

1991

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Turing instability and traveling fronts for a nonlinear reaction–diffusion system with cross-diffusion

Gambino

Lombardo

Sammartino

2012

Mathematics and Computers in Simulation

101

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M. Sammartino

Zero Viscosity Limit for Analytic Solutions, of the Navier-Stokes Equation on a Half-Space.¶I. Existence for Euler and Prandtl Equations

Zero Viscosity Limit for Analytic Solutions of the Navier-Stokes Equation on a Half-Space.¶ II. Construction of the Navier-Stokes Solution

Well-Posedness of the Boundary Layer Equations

A thermodynamical approach to Eddington factors

Turing instability and traveling fronts for a nonlinear reaction–diffusion system with cross-diffusion

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