Jean-David Hoernel scite author profile

Jean-David Hoernel

4Publications

85Citation Statements Received

114Citation Statements Given

How they've been cited

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114

Affiliations

Technion – Israel Institute of Technology, University of Upper Alsace, Laboratoire de Mathématiques

Publications

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On similarity solutions for boundary layer flows with prescribed heat flux

Brighi

Hoernel

2005

Math. Meth. Appl. Sci.

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This paper is concerned with existence, uniqueness and behavior of the solutions of the autonomous third order nonlinear differential equation f ′′′ +(m + 2) f f ′′ −(2m + 1) f ′2 = 0 on R + with the boundary conditions f (0) = −γ, f ′ (∞) = 0 and f ′′ (0) = −1. This problem arises when looking for similarity solutions for boundary layer flows with prescribed heat flux. To study solutions we use some direct approach as well as blowing-up coordinates to obtain a plane dynamical system.

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Recent Advances on Similarity Solutions Arising During Free Convection

Brighi¹,

Hoernel²

2005

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This paper reviews results about free convection near a vertical flat plate embedded in some saturated porous medium. We focus on a third order autonomous differential equation that gives a special class of solutions called similarity solutions. Two cases are under consideration: in the first one we prescribe the temperature on the plate and in the second one we prescribe the heat flux on it. We will also see that the same equation appears in other industrial processes.

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On the concave and convex solutions of a mixed convection boundary layer approximation in a porous medium

Brighi

Hoernel

2006

Applied Mathematics Letters

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On the similarity solutions for a steady MHD equation

Hoernel

2008

Communications in Nonlinear Science and Numerical Simulation

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In this paper, we investigate the similarity solutions for a steady laminar incompressible boundary layer equations governing the magnetohydrodynamic (MHD) flow near the forward stagnation point of two-dimensional and axisymmetric bodies. This leads to the study of a boundary value problem involving a third order autonomous ordinary differential equation. Our main results are the existence, uniqueness and nonexistence for concave or convex solutions. MSC: 34B15, 34C11, 76D10 PACS: 47.35.Tv, 47.65.d, 47.15.Cb

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