Euler–Poisson–Darboux equation: Difference between revisions

In mathematics, the Euler–Poisson–Darboux(EPD)^[1][2] equation is the partial differential equation

${\displaystyle u_{x,y}+\frac{N(u_x+u_y)}{x+y}=0.}$

This equation is named for Siméon Poisson, Leonhard Euler, and Gaston Darboux. It plays an important role in solving the classical wave equation.

This equation is related to

${\displaystyle u_{rr}+\frac{m}{r}{u}_r-u_{tt}=0,}$

by ${\displaystyle x=r+t}$, ${\displaystyle y=r-t}$, where ${\displaystyle N=\frac{m}{2}}$ ^[2] and some sources quote this equation when referring to the Euler–Poisson–Darboux equation.^[3][4][5][6]

The EPD equation equation is the simplest linear hyperbolic equation in two independent variables whose coefficients exhibit singularities, therefore it has an interest as a paradigm to relativity theory.^[7]

Compact support self-similar solution of the EPD equation for thermal conduction was derived starting from the modified Fourier-Cattaneo law.^[8]

It is also possible to solve the non-linear EPD equations with the method of generalized separation of variables.^[9]

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