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  1. Alan D. Taylor (2006). Borel Separability of the Coanalytic Ramsey Sets. Annals of Pure and Applied Logic 144 (1):130-132.
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  2. 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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  3. 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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  4. 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. Alan D. Taylor (1979). Regularity Properties of Ideals and Ultrafilters. Annals of Mathematical Logic 16 (1):33-55.
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  6. 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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