THE CAUCHY PROBLEM FOR PARTIAL DIFFERENTIAL EQUATIONS OF THE SECOND ORDER AND THE METHOD OF ASCENT

Bureau, F. J.

THE CAUCHY PROBLEM FOR PARTIAL DIFFERENTIAL EQUATIONS OF THE SECOND ORDER AND THE METHOD OF ASCENT

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Abstract:

A method of ascent is used to solve the Cauchy problem for linear partial differential equations of the second order in p space variables with constant coefficients i.e., the pure wave equation, the damped wave equation, and the heat equation. This method consists of inferring the solution of the problem referred to from the well known solution of the same problem for one space variable. The commutability of repeated pf integral, the solution deduced by the method of singularities for the Cauchy problem for the damped wave equation, and the solution of singular integral equations of the Volterra type are also considered. Author

Author(s):

Bureau, F. J.

Author Organization(s):

LIEGE UNIV (BELGIUM)

Pagination:

0001

Security Markings

DOCUMENT & CONTEXTUAL SUMMARY

Distribution:

Approved For Public Release

RECORD

Collection: TR

Identifying Numbers

Report Number(s):

TSN6, AFOSR-756

Contract/Grant Number(s):

AF61 052 86

Monitor Series:

756

Subject Terms

Communities of Interest:

No COI(s) Identified

Descriptor(s):

*PARTIAL DIFFERENTIAL EQUATIONS, DIFFERENTIAL EQUATIONS, FUNCTIONAL ANALYSIS, INTEGRAL EQUATIONS, POLYNOMIALS, SERIES(MATHEMATICS), THEORY

Report Date:

1961 May 01