Description
The Laplace transform is a wonderful tool for solving ordinary and partial differential equations and has enjoyed much success in this realm. With its success, however, a certain casualness has been bred concerning its application, without much regard for hypotheses and when they are valid. Even proofs of theorems often lack rigor, and dubious mathematical practices are not uncommon in the literature for students. In the present text, I have tried to bring to the subject a certain amount of mathematical correctness and make it accessible to un- dergraduates. Th this end, this text addresses a number of issues that are rarely considered. For instance, when we apply the Laplace trans- form method to a linear ordinary differential equation with constant coefficients, any(n) + an-lY(n-l) + - - - + aoy = f(t), why is it justified to take the Laplace transform of both sides of the equation (Theorem A. 6)? Or, in many proofs it is required to take the limit inside an integral. This is always fraught with danger, especially with an improper integral, and not always justified. I have given complete details (sometimes in the Appendix) whenever this procedure is required. IX X Preface Furthermore, it is sometimes desirable to take the Laplace trans- form of an infinite series term by term. Again it is shown that this cannot always be done, and specific sufficient conditions are established to justify this operation.
Author: Joel L. Schiff
Publisher: Springer
Published: 10/14/1999
Pages: 236
Binding Type: Hardcover
Weight: 1.17lbs
Size: 9.48h x 6.40w x 0.69d
ISBN13: 9780387986982
ISBN10: 0387986987
BISAC Categories:
- Mathematics | Functional Analysis
- Mathematics | Mathematical Analysis
Author: Joel L. Schiff
Publisher: Springer
Published: 10/14/1999
Pages: 236
Binding Type: Hardcover
Weight: 1.17lbs
Size: 9.48h x 6.40w x 0.69d
ISBN13: 9780387986982
ISBN10: 0387986987
BISAC Categories:
- Mathematics | Functional Analysis
- Mathematics | Mathematical Analysis
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