Advances in Mathematical Economics [electronic resource] | Kusuoka, Shigeo, Maruyama, Toru
Advances in Mathematical Economics [electronic resource]
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Author: Kusuoka, Shigeo, Maruyama, Toru
Added by: sketch
Added Date: 2015-12-30
Publication Date: 2003
Language: eng
Subjects: Economics, Finance, Economics, Finance
Publishers: Tokyo : Springer Japan
Collections: journals contributions, journals
ISBN Number: 9784431539797, 4431539794
Pages Count: 600
PPI Count: 600
PDF Count: 1
Total Size: 264.16 MB
PDF Size: 14.64 MB
Extensions: djvu, epub, gif, pdf, gz, zip, torrent, log, mrc
Downloads: 471
Views: 521
Total Files: 20
Media Type: texts
Description
Advances in Mathematical Economics
Author: Shigeo Kusuoka, Toru Maruyama
Published by Springer Japan
ISBN: 978-4-431-00003-7
DOI: 10.1007/978-4-431-53979-7
Table of Contents:
Research Articles: G. Carlier, Duality and existence for a class of mass transportation problems and economic applications; Charles Castaing and Ahmed Gamal Ibrahim: Functional evolution equations governed by m-accretive operators; Leonid Hurwcz and Marcel K. Richter, Implicit functions and diffeomorphisms without C; Leonid Hurwicz and Marcel K. Richter, Optimization and Lagrange multipliers: Non-C1 Constraints and minimal constraint qualifications; Takao Fujimoto, Jose A. Silva and Antonio Villar, Nonlinear generalizations of theorems on inverse-positive matrices; Shigeo Kusuoka, Monte Carlo method for pricing of Bermuda type derivatives -- Historical Perspectives: Isao Mutoh, Mathematical economics in Vienna between the wars -- Subject index
Author: Shigeo Kusuoka, Toru Maruyama
Published by Springer Japan
ISBN: 978-4-431-00003-7
DOI: 10.1007/978-4-431-53979-7
Table of Contents:
- Duality and existence for a class of mass transportation problems and economic applications
- Functional evolution equations governed by m-accretive operators
- Nonlinear generalizations of theorems on inverse-positive matrices
- Implicit functions and diffeomorphisms without C
- Optimization and Lagrange multipliers: non-C
- Monte Carlo method for pricing of Bermuda type derivatives
- Mathematical economics in Vienna between the Wars
Research Articles: G. Carlier, Duality and existence for a class of mass transportation problems and economic applications; Charles Castaing and Ahmed Gamal Ibrahim: Functional evolution equations governed by m-accretive operators; Leonid Hurwcz and Marcel K. Richter, Implicit functions and diffeomorphisms without C; Leonid Hurwicz and Marcel K. Richter, Optimization and Lagrange multipliers: Non-C1 Constraints and minimal constraint qualifications; Takao Fujimoto, Jose A. Silva and Antonio Villar, Nonlinear generalizations of theorems on inverse-positive matrices; Shigeo Kusuoka, Monte Carlo method for pricing of Bermuda type derivatives -- Historical Perspectives: Isao Mutoh, Mathematical economics in Vienna between the wars -- Subject index