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  1.  11
    Steven J. Brams & Alan D. Taylor (1994). Divide the Dollar: Three Solutions and Extensions. [REVIEW] Theory and Decision 37 (2):211-231.
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  2.  10
    James E. Baumgartner, Alan D. Taylor & Stanley Wagon (1977). On Splitting Stationary Subsets of Large Cardinals. Journal of Symbolic Logic 42 (2):203-214.
    Let κ denote a regular uncountable cardinal and NS the normal ideal of nonstationary subsets of κ. Our results concern the well-known open question whether NS fails to be κ + -saturated, i.e., are there κ + stationary subsets of κ with pairwise intersections nonstationary? Our first observation is: Theorem. NS is κ + -saturated iff for every normal ideal J on κ there is a stationary set $A \subseteq \kappa$ such that $J = NS \mid A = \{X \subseteq (...)
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  3.  1
    Alan D. Taylor (1979). Regularity Properties of Ideals and Ultrafilters. Annals of Mathematical Logic 16 (1):33-55.
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  4.  6
    Alan D. Taylor (1991). Review: Donna M. Carr, Donald H. Pelletier, J. Steprans, S. Watson, Towards a Structure Theory for Ideals on $P\Kappa\Lambda$ ; William S. Zwicker, A Beginning for Structural Properties of Ideals on $P\Kappa\Lambda$. [REVIEW] Journal of Symbolic Logic 56 (3):1100-1101.
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  5.  5
    Alan D. Taylor (1991). Carr Donna M. And Pelletier Donald H.. Towards a Structure Theory for Ideals on Pkλ. Set Theory and its Applications, Proceedings of a Conference Held at York University, Ontario, Canada, Aug. 10–21, 1987, Edited by Steprāns J. And Watson S., Lecture Notes in Mathematics, Vol. 1401, Springer-Verlag, Berlin Etc. 1989, Pp. 41–54. Zwicker William S.. A Beginning for Structural Properties of Ideals on Pkλ. Set Theory and its Applications, Proceedings of a Conference Held at York University, Ontario, Canada ... [REVIEW] Journal of Symbolic Logic 56 (3):1100-1101.
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  6.  1
    Alan D. Taylor (2006). Borel Separability of the Coanalytic Ramsey Sets. Annals of Pure and Applied Logic 144 (1):130-132.
    Let AC and AI denote the collections of graphs with vertex set ω and which have, respectively, no infinite independent subgraph, and no infinite complete subgraph. Both AC and AI are coanalytic sets of reals that are not analytic, and they are disjoint by Ramsey’s theorem. We prove that there exists a Borel set separating AC and AI, and we discuss the sense in which this is an infinite analogue of a weak version of.
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  7. Steven J. Brams & Alan D. Taylor (1996). Fair Division: From Cake-Cutting to Dispute Resolution. Cambridge University Press.
    Cutting a cake, dividing up the property in an estate, determining the borders in an international dispute - such problems of fair division are ubiquitous. Fair Division treats all these problems and many more through a rigorous analysis of a variety of procedures for allocating goods, or deciding who wins on what issues, when there are disputes. Starting with an analysis of the well-known cake-cutting procedure, 'I cut, you choose', the authors show how it has been adapted in a number (...)
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  8. Alan D. Taylor, Donna M. Carr, Donald H. Pelletier, J. Steprans, S. Watson & William S. Zwicker (1991). Towards a Structure Theory for Ideals on P Κ Λ.A Beginning for Structural Properties of Ideals on P Κ Λ. Journal of Symbolic Logic 56 (3):1100.
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