An energy analysis of degenerate hyperbolic partial differential equations.
An energy analysis is carried out for the usual semidiscrete Galerkin method for the semilinear equation in the region (E) , subject to the initial and boundary conditions, on and . (E) is degenerate at and thus, even in the case , time derivatives of will blow up as . Also, in the case where is locally Lipschitz, solutions of (E) can blow up for in finite time. Stability and convergence of the scheme in is shown in the linear case without assuming (which can blow up as is...