

ANDERSON, E.J. And A.B. PHILPOTT, Eds. Lecture Notes In Economics And Mathematical Systems, 259 PHILPOTT, A.B., Ed. ListingsIf you cannot find what you want on this page, then please use our search feature to search all our listings. Click on Title to view full description


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ANDERSON, E.J. and A.B. PHILPOTT, eds. Lecture Notes in Economics and Mathematical Systems, 259 PHILPOTT, A.B., ed. Infinite Programming : Proceedings of an International Symposium on Infinite Dimensional Linear Programming, Churchill College, Cambridge, United Kingdom, September 710, 1984 SpringerVerlag, Berlin, 1985, ISBN:3540159967 ANDERSON, E.J. and A.B. PHILPOTT, (eds.). Infinite Programming : Proceedings of an International Symposium on Infinite Dimensional Linear Programming,Churchill College, Cambridge, United Kingdom, September 710, 1984. Edited by E.J. Anderson and A.B. Philpott. Berlin: SpringerVerlag, (1985). Pp. ( 2),[iii]xiv,[1]244,(2). 8vo, printed grey card covers. Lecture Notes in Economics and Mathematical Systems, number 259. Managing Editors: M. Beckmann and W. Krelle. Contents: 1. J.Ch. Pomerol's "Openness, closedness and duality in Banach spaces with applications to continuous linear programming"; 2. M.A. Goberna and M.A. Lopez's "Conditions for the closedness of the characteristic cone associated with an infinite linear system"; 3. D.F. Karney's "Symmetric duality: a prelude"; 4. P. Nash's "Algebraic fundamentals of linear programming"; 5. H.Th. Jongen and G. Zwier's "On regular semiinfinite optimization"; 6. K.O. Kortanek's "Semiinfinite programming and continuum physics"; 7. R. Hettich's "On the computation of membraneeigenvalues by semiinfinite programming methods"; 8. G.A. Watson's "Lagrangian methods for semiinfinite programming problems"; 9. E.J. Anderson's "A new primal algorithm for semiinfinite linear programming"; 10. A.S. Lewis's "Extreme points and purification algorithms in general linear programming"; 11.A.P. Philpott's "Network programming in continuous time with node storage"; 12. M.M. Neumann's "The theorem of Gale for infinite networks and applications"; 13. J.E. Rubio's "Nonlinear optimal control problems as infinitedimensionallinear programming problems"; 14. A.L. Dontchev's "Continuity and asymptot ic behaviour of the marginal function in optimal control"; 15. J.M. Borwein's "Alternative theorems for general complementarity problems"; 16. T.W. Reiland and J.H. Chou's "Nonsmooth analysis and optimization for a class of nonconvex mappings"; 17. H. Komiya's "Minimum norm problems in normed vectorlattices"; 18. N.S. Papageorgiou's "Stochastic nonsmooth analysis and opti mization in Banach spaces". Very good. 35.00 Price:
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