Mixed nonlocal problem for a nonlinear singular hyperbolic equation

## Abstract We investigate the existence of positive solutions to the singular fractional boundary value problem: \documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$^c\hspace{-1.0pt}D^{\alpha }u +f(t,u,u^{\prime },^c\hspace{-2.0pt}D^{\mu }u)=0$\end{document}, __u__′(0) = 0

In this paper, we study the free-boundary problem associated with a singular diffusion equation. An entropy equality derived by the authors for BV solutions in an earlier paper is used in its formulation. Existence, uniqueness, and regularity results are obtained.

## Abstract For partial differential equations of mixed elliptic‐hyperbolic type we prove results on existence and existence with uniqueness of weak solutions for __closed__ boundary value problems of Dirichlet and mixed Dirichlet‐conormal types. Such problems are of interest for applications to tr

is small. The next order in the linear dispersion relation (fifth derivative) is then as important as the third We numerically calculate bions, which are bound states of two solitary waves which travel together as a single coherent structure derivative. It is then necessary to replace the KdV with a