6533b82bfe1ef96bd128cda7

RESEARCH PRODUCT

Infinite games and chain conditions

Santi Spadaro

subject

Discrete mathematicsAlgebra and Number TheoryProperty (philosophy)010102 general mathematicsGeneral Topology (math.GN)Mathematics::General Topology010103 numerical & computational mathematicsTopological space01 natural sciencesSeparable spaceCompact spaceChain (algebraic topology)Cover (topology)Countable chain conditionFOS: Mathematicstopological gamesselection principles0101 mathematicscardinal inequalitiesChain conditionsTopology (chemistry)MathematicsMathematics - General Topology

description

We apply the theory of infinite two-person games to two well-known problems in topology: Suslin's Problem and Arhangel'skii's problem on $G_\delta$ covers of compact spaces. More specifically, we prove results of which the following two are special cases: 1) every linearly ordered topological space satisfying the game-theoretic version of the countable chain condition is separable and 2) in every compact space satisfying the game-theoretic version of the weak Lindel\"of property, every cover by $G_\delta$ sets has a continuum-sized subcollection whose union is $G_\delta$-dense.

yearjournalcountryeditionlanguage
2015-07-08
10.4064/fm232-3-2016http://hdl.handle.net/20.500.11769/252410