Games and general distributive laws in Boolean algebras

被引:8
|
作者
Dobrinen, N [1 ]
机构
[1] Penn State Univ, Dept Math, University Pk, PA 16802 USA
来源
PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY | 2003年 / 131卷 / 01期
关键词
Boolean algebra; distributivity; games;
D O I
10.1090/S0002-9939-02-06501-2
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
The games G(1)(eta)(kappa) and G(<lambda)(eta) (kappa) are played by two players in eta(+)-complete and max(eta(+), lambda)-complete Boolean algebras, respectively. For cardinals eta,kappa such that kappa(<eta)=eta or kappa(<eta)=kappa, the (eta,kappa)-distributive law holds in a Boolean algebra B iff Player 1 does not have a winning strategy in G(1)(eta)(kappa). Furthermore, for all cardinals kappa, the (eta,infinity)-distributive law holds in B iff Player 1 does not have a winning strategy in G(1)(eta)(infinity). More generally, for cardinals eta,lambda,kappa such that (kappa(<lambda))(<eta)=eta, the (eta,< lambda,kappa)-distributive law holds in B iff Player 1 does not have a winning strategy in G(<lambda)(eta) (kappa). For eta regular and lambda less than or equal to min(eta,kappa), lozenge(eta)+ implies the existence of a Suslin algebra in which G(<lambda)(eta) (kappa) is undetermined.
引用
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页码:309 / 318
页数:10
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