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April 10, 2013 - May 8, 2026

Available Issues

April 10, 2013 - May 8, 2026

Approximating Extreme Points of Infinite Dimensional Convex Sets

Published Online:1 May 1998https://doi.org/10.1287/moor.23.2.433

References

  • Anderson E. J., Nash P.Linear Programming in Infinite Dimensional Spaces (1987) (Wiley, New York) Google Scholar
  • Bean J. C., Lohmann J. R., Smith R. L. A dynamic infinite horizon replacement economy decision model. The Engrg. Economist (1985) 30:99–120CrossrefGoogle Scholar
  • Bean J. C., Smith R. L. Optimal capacity expansion over an infinite horizon. Management Sci. (1985) 31:1523–1532LinkGoogle Scholar
  • Berge C.Topological Spaces (1963) (Oliver and Boyd, London, United Kingdom) Google Scholar
  • Bès C., Sethi S. P. Concepts of forecast and decision horizons: Application to dynamic stochastic optimization problems. Math. Oper. Res. (1988) 13:295–310LinkGoogle Scholar
  • Hopp W. J., Bean J. C., Smith R. L. A new optimality criterion for nonhomogeneous Markov decision processes. Oper. Res. (1987) 35:875–883LinkGoogle Scholar
  • Jones P., Zydiak J., Hopp W. Stationary dual prices and depreciation. Math. Programming (1988) 41:357–366CrossrefGoogle Scholar
  • Klee V. Convex sets in linear spaces. Duke Math. J. (1951) 18:443–466CrossrefGoogle Scholar
  • Klee V. Extremal structure of convex sets. Arch. Math. (Basel) (1957) 8:234–240CrossrefGoogle Scholar
  • Klee V. Extremal structure of convex sets. Math. Z. (1958) 69:90–104IICrossrefGoogle Scholar
  • Krein M., Milman D. On the extreme points of regularly convex sets. Studia Mathematica (1940) 9:133–138Google Scholar
  • Kuratowski K.Topology (1966) I(Academic Press, New York) Google Scholar
  • Luenberger D. G.Optimization by Vector Space Methods (1969) (John Wiley and Sons, New York) Google Scholar
  • Minkowski H.Gesammelte Abhandlungen (1911) (Teubner, Leipzig, Germany) Google Scholar
  • Romeijn H. E., Smith R. L., Bean J. C. Duality in infinite dimensional linear programming. Math. Programming (1992) 53:79–97CrossrefGoogle Scholar
  • Romeijn H. E., Smith R. L. Shadow prices in infinite dimensional linear programming. Math. Oper. Res. (1998) . In pressGoogle Scholar
  • Roy N. M. Extreme points of convex sets in infinite dimensional spaces. Amer. Math. Monthly (1987) 94:409–422CrossrefGoogle Scholar
  • Schochetman I. E., Smith R. L. Infinite horizon optimization. Math. Oper. Res. (1989) 14:559–574LinkGoogle Scholar
  • Schrijver A.Theory of Linear and Integer Programming (1986) (Wiley, Chichester) Google Scholar
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