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Mathematical Economics

ISBN-10: 0521314984

ISBN-13: 9780521314985

Edition: 2nd

Authors: Akira Takayama

List price: $117.00
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Description:

This book provides a systematic exposition of mathematical economics, presenting and surveying existing theories and showing ways in which they can be extended. One of its strongest features is that it emphasises the unifying structure of economic theory in such a way as to provide the reader with the technical tools and methodological approaches necessary for undertaking original research. The author offers explanations and discussion at an accessible and intuitive level providing illustrative examples. He begins the work at an elementary level and progessively takes the reader to the frontier of current research. This second edition brings the reader fully up to date with recent research in the field.
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Book details

List price: $117.00
Edition: 2nd
Publisher: Cambridge University Press
Publication date: 8/30/1985
Binding: Paperback
Pages: 764
Size: 6.14" wide x 9.21" long x 1.54" tall
Weight: 2.442
Language: English

Stanley J. Feldman is Associate Professor of Finance at Bentley College, where he currently teaches graduate and undergraduate courses in corporate finance with a focus on business valuation and business strategy. He is a member of the FASB Valuation Resource Group and is Chairman and cofounder of Axiom Valuation Solutions. Dr. Feldman has written extensively on issues related to business valuation and small business financing for the Boston Herald and the Boston Business Journal, and lectures at both academic and professional conferences. He received his PhD from New York University.

Preface to second edition
Preface to first edition
Introduction
Preliminaries
Developments of nonlinear programming
The theory of competitive markets
The stability of competitive equilibrium
Frobenius theorems, dominant diagonal matrices and applications
The calculus of variations and the optimal growth of an aggregate economy
Multisector models of economic growth
Multisector optimal growth models
Developments of optimal control theory and its applications
Indexes