1302.0591 (Maria Lewtchuk Espindola)
Maria Lewtchuk Espindola
A method for finding the general solution to the partial differential equations: \ $F(u_x,u_y)=0$; \ $F(f(x)\:u_x,u_y)=0$ \ (or \ $F(u_x,h(y)\:u_y)=0$) \ is presented, founded on a Legendre like transformation and a theorem for Pfaffian differential forms. As the solution obtained depends on an arbitrary function, then it is a general solution. As an extension of the method it is obtained a general solution to PDE: \ $F(f(x)\:u_x,u_y)=G(x)$, and then applied to unidimensional Hamilton-Jacobi equation.
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http://arxiv.org/abs/1302.0591
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