ESTIMATES FOR THE SINGULAR SOLUTIONS OF THE 3-D PROTTER’S PROBLEM

Authors

  • Nedyu Popivanov
  • Todor Popov

Keywords:

boundary value problems, generalized solution, propagation of singularities, singular solutions, special functions, wave equation

Abstract

For the wave equation we study boundary value problems, stated by Protter in 1952, as some three-dimensional analogues of Darboux problems on the plane. It is known that Protter's problems are not well posed and the solution may have singularity at the vertex $O$ of a characteristic cone, which is a part of the domain's boundary $\partial \Omega $. It is shown that for $n$ in $\mathbb{N}$ there exists a right-hand side smooth function from $C^{n}(\bar{\Omega})$, for which the corresponding unique generalized solution belongs to $C^{n}(\bar{\Omega}\backslash O)$, but it has a strong power-type singularity. It is isolated at the vertex $O$ and does not propagate along the cone. The present article gives some necessary and sufficient conditions for the existence of a fixed order singularity. It states some exact a priori estimates for the solution.

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Published

2004-12-12

How to Cite

Popivanov, N., & Popov, T. (2004). ESTIMATES FOR THE SINGULAR SOLUTIONS OF THE 3-D PROTTER’S PROBLEM. Ann. Sofia Univ. Fac. Math. And Inf., 96, 117–139. Retrieved from https://ftl5.uni-sofia.bg./index.php/fmi/article/view/167