Shadow Prices in Infinite-Dimensional Linear Programming

H. Edwin Romeijn
H. Edwin Romeijn
Department of Decision and Information Sciences, Rotterdam School of Management, Erasmus University Rotterdam, P.O. Box 1738, 3000 DR Rotterdam, The Netherlands
Search for more papers by this author
,
Robert L. Smith
Robert L. Smith
Department of Industrial and Operations Engineering, The University of Michigan, Ann Arbor, Michigan 48109-2117
Search for more papers by this author

Department of Decision and Information Sciences, Rotterdam School of Management, Erasmus University Rotterdam, P.O. Box 1738, 3000 DR Rotterdam, The Netherlands

Search for more papers by this author

Robert L. Smith

Department of Industrial and Operations Engineering, The University of Michigan, Ann Arbor, Michigan 48109-2117

Search for more papers by this author

Published Online:1 Feb 1998https://doi.org/10.1287/moor.23.1.239

References

Borwein J. M. Direct theorems in semi-infinite convex programming. Math. Programming (1981) 21:301–318Crossref, Google Scholar
Borwein J. M., Fiacco A. V., Kortanek K. O. Semi-infinite programming: How special is it? Semi-Infinite Programming and Applications (1983) (Springer-Verlag, Berlin, Germany) Crossref, Google Scholar
Charnes A., Cooper W. W., Kortanek K. O. Duality in semi-infinite programming and some works of Haar and Caratheodory. Management Sci. (1963) 9:209–228Link, Google Scholar
Denardo E. V.Dynamic Programming: Models and Applications (1982) (Prentice-Hall, Englewood Cliffs, New Jersey) Google Scholar
Duffin R. J., Jeroslow R. G., Karlovitz L. A., Fiacco A. V., Kortanek K. O. Duality in semi-infinite programming. Semi-Infinite Programming and Applications (1983) (Springer-Verlag, Berlin, Germany) Crossref, Google Scholar
Dugundji J.Topology (1966) (Allyn and Bacon, Boston, Massachusetts) Google Scholar
Grinold R. Infinite horizon programs. Management Sci. (1971) 18:157–170Link, Google Scholar
Grinold R. Finite horizon approximations of infinite horizon linear programs. Math. Programming (1977) 12:1–17Crossref, Google Scholar
Grinold R. Convex infinite horizon programs. Math. Programming (1983) 25:64–82Crossref, Google Scholar
Grinold R., Hopkins D. S. P. Computing optimal solutions for infinite horizon mathematical programs with a transient stage. Oper. Res. (1972) 21:179–187Link, Google Scholar
Grinold R., Hopkins D. S. P. Duality overlap in infinite linear programs. J. Math. Anal. Appl. (1973) 41:333–335Crossref, Google Scholar
Jones P., Zydiak J., Hopp W. Stationary dual prices and depreciation. Math. Programming (1988) 41:357–366Crossref, Google Scholar
Romeijn H. E., Smith R. L., Bean J. C. Duality in infinite dimensional linear programming. Math. Programming (1992) 53:79–97Crossref, Google Scholar
Schochetman I. E., Smith R. L. Infinite horizon optimization. Math. Oper. Res. (1989) 14:559–574Link, Google Scholar
Schochetman I. E., Smith R. L. Convergence of best approximations from unbounded sets. J. Math. Anal. Appl. (1992) 166:112–128Crossref, Google Scholar

cover image Mathematics of Operations Research

Volume 23, Issue 1

February 1998

Pages 1-256

Article Information

Metrics

Information

Published Online:February 01, 1998

Cite as

H. Edwin Romeijn, Robert L. Smith, (1998) Shadow Prices in Infinite-Dimensional Linear Programming. Mathematics of Operations Research 23(1):239-256.

https://doi.org/10.1287/moor.23.1.239

Keywords

PDF download

Available Issues

Available Issues

Available Issues

Available Issues

Available Issues

Available Issues

Available Issues

Shadow Prices in Infinite-Dimensional Linear Programming

References

Volume 23, Issue 1

Article Information

Metrics

Information

Cite as

Keywords

Sign Up for INFORMS Publications Updates and News