|
NATO Advanced Study Institute (1981 : Banff, Alta.)
Ordered sets : proceedings of the NATO Advanced Study Institute held at Banff, Canada, August 28 to September 12, 1981 / edited by Ivan Rival.
— Dordrecht, Holland : D. Reidel, c1982. xviii, 966 p. : il. ; 25 cm. — (NATO advanced study institutes series. Series C, Mathematical and physical sciences ; v. 83)
Bibliografía: p. 865-966.
Contenido: Bjarni Jónsson, "Arithmetic of ordered sets", pp. 3–41. — B. A. Davey and D. Duffus, "Exponentiation and duality", pp. 43–95. — Ivan Rival, "The retract construction", pp. 97–122. — R. Bonnet and M. Pouzet, "Linear extensions of ordered sets", pp. 125–170. — David Kelly and William T. Trotter, "Jr., Dimension theory for ordered sets", pp. 171–211. — R. L. Graham, "Linear extensions of partial orders and the FKG inequality", pp. 213–236. — James E. Baumgartner, "Order types of real numbers and other uncountable orderings", pp. 239–277. — E. C. Milner and M. Pouzet, "On the cofinality of partially ordered sets", pp. 279–298. — George F. McNulty, "Infinite ordered sets, a recursive perspective", pp. 299–330. — R. P. Dilworth, "The role of order in lattice theory", pp. 333–353. — Ralph Freese, "Some order-theoretic questions about free modular lattices", pp. 355–377. — Michael W. Mislove, "An introduction to the theory of continuous lattices", pp. 379–406. — Garrett Birkhoff, "Ordered sets in geometry", pp. 407–443. — Rudolf Wille, "Restructuring lattice theory: an approach based on hierarchies of concepts", pp. 445–470. — Douglas B. West, "Extremal problems in partially ordered sets", pp. 473–521. — Robert W. Quackenbush, "Enumeration in classes of ordered structures", pp. 523–554. — Curtis Greene, "The Möbius function of a partially ordered set", pp. 555–581. — A. Björner, A. M. Garsia and R. P. Stanley, "An introduction to Cohen-Macaulay partially ordered sets", pp. 583–615. — A. J. Hoffman, "Ordered sets and linear programming", pp. 619–654. — E. L. Lawler and J. K. Lenstra, "Machine scheduling with precedence constraints", pp. 655–675. — Dana S. Scott, "Some ordered sets in computer science", pp. 677–718. — J.-P. Barthélemy, Cl. Flament and B. Monjardet, "Ordered sets and social sciences", pp. 721–758. — K. P. Bogart, "Some social science applications of ordered sets", pp. 759–787. — "Problem sessions", pp. 789–861.
ISBN 9027713960
|