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pro vyhledávání: '"Donald H. Pelletier"'
Autor:
Donald H. Pelletier
Publikováno v:
International Journal of Mathematics and Mathematical Sciences, Vol 5, Iss 4, Pp 817-821 (1982)
The partition property for measures on Pℋλ was formulated by analogy with a property which Rowbottom [1] proved was possessed by every normal measure on a measurable cardinal. This property has been studied in [2], [3], and [4]. This note summariz
Externí odkaz:
https://doaj.org/article/cbc17d8c865940318f5f226baa7f3e45
Publikováno v:
Archive for Mathematical Logic. 30:59-72
For every uncountable regular cardinalκ and any cardinalλ≧κ,P κ λ denotes the set $$\left\{ {x \subseteqq \lambda :\left| x \right|< \kappa } \right\}$$ . Furthermore, < denotes the binary operation defined inP κ λ byx
Autor:
Donald H. Pelletier, Carlos Augusto Di Prisco, Julius B. Barbanel, Kenneth Kunen, Telis K. Menas
Publikováno v:
The Journal of Symbolic Logic. 56:1098-1100
Autor:
Alan D. Taylor, Donna M. Carr, S. Watson, J. Steprans, William S. Zwicker, Donald H. Pelletier
Publikováno v:
The Journal of Symbolic Logic. 56:1100-1101
Autor:
Donald H. Pelletier
Publikováno v:
Mathematical Logic Quarterly. 21:361-364
Autor:
Kenneth Kunen, Donald H. Pelletier
Publikováno v:
Journal of Symbolic Logic. 48:475-481
T.K. Menas [4, pp. 225-234] introduced a combinatorial property X(,u) of a measure u1 on a supercompact cardinal /c and proved that measures with this property also have the partition property. We prove here that Menas' property is not equivalent to
Autor:
Donald H. Pelletier
Publikováno v:
Canadian Journal of Mathematics. 26:820-828
The purpose of this article is to show how the main result of Easton [1] can be obtained as a special case of a general theory, which was developed in [6], of Boolean-valued models of ZF when the Boolean algebra is a proper class in the ground model.
Publikováno v:
Proceedings of the American Mathematical Society. 83:764-768
Let κ \kappa be an infinite cardinal, let I I be a nonprincipal ideal on κ \kappa and let I + = { X ⊆ κ : X ∉ I } {I^ + } = \{ X \subseteq \kappa :X \notin I\} . S ( I ) S(I) is the following property of ideals: for every A ∈ I + A \in {I^ +
Autor:
Donald H. Pelletier
Publikováno v:
Bulletin of the London Mathematical Society. 9:168-170
Autor:
Donald H. Pelletier
Publikováno v:
Notre Dame J. Formal Logic 17, no. 2 (1976), 284-286