Partial Differential Equations in Applied Mathematics (Jun 2022)
Fully integrable one-dimensional nonlinear wave equation: Solution of a general initial value problem
Abstract
A new integrable case of the one-dimensional nonlinear wave equation was found. A general solution for this case depending on two arbitrary functions was derived. The functional form of the speed of sound can be used to model weak nonlinear waves in non-dispersive media. For the initial value problem the nonlinear generalization of the d’Alembert’s formula was obtained.
