The Generalized radiation problem and the Euler-Poisson-Darboux equation /
Alexander Weinstein, University of Maryland.

Description

Main Author

Weinstein, Alexander

Related Names

United States. Air Force.
University of Maryland, College Park. Institute for Fluid Dynamics and Applied Mathematics.

Language(s)

English

Published

College Park, Maryland : University of Maryland, Institute for Fluid Dynamics and Applied Mathematics, 1954.

Subjects

Differential equations, Partial.
Wave equation.

Summary

A reformulation of the classical radiation problem for the wave equation leads to a problem for the Euler-Poisson-Darboux equation which includes as a special case the problem of Tricomi, Germain, and Bader. In this last problem which deals with transonic flow arbitrary data are given on the sonic line and prescribed to be zero on a Mach line. The new theory gives the precise conditions under which the radiation problem can be solved and yields new formulas for the solution of the problem for the Tricomi equation.

Note

University of Maryland report number BN-36.
Prepared for Project Code(s): and/or No.(s): R 354-10-27.
"June 1954."

Physical Description

26 leaves ; 28 cm.

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