6533b821fe1ef96bd127b9a7

RESEARCH PRODUCT

A common extension of Arhangel'skii's Theorem and the Hajnal-Juhasz inequality

Santi SpadaroAngelo Bella

subject

Inequalitycardinal invariantsLindelofGeneral Mathematicsmedia_common.quotation_subject010102 general mathematicsGeneral Topology (math.GN)Hausdorff spaceContrast (statistics)Mathematics::General TopologyExtension (predicate logic)01 natural sciencesSeparation axiom010101 applied mathematicsCombinatoricsMathematics::LogiccellularityCardinality boundsFOS: MathematicsSettore MAT/03 - Geometria0101 mathematicsTopology (chemistry)media_commonMathematicsMathematics - General Topology

description

AbstractWe present a result about $G_{\unicode[STIX]{x1D6FF}}$ covers of a Hausdorff space that implies various known cardinal inequalities, including the following two fundamental results in the theory of cardinal invariants in topology: $|X|\leqslant 2^{L(X)\unicode[STIX]{x1D712}(X)}$ (Arhangel’skiĭ) and $|X|\leqslant 2^{c(X)\unicode[STIX]{x1D712}(X)}$ (Hajnal–Juhász). This solves a question that goes back to Bell, Ginsburg and Woods’s 1978 paper (M. Bell, J.N. Ginsburg and R.G. Woods, Cardinal inequalities for topological spaces involving the weak Lindelöf number, Pacific J. Math. 79(1978), 37–45) and is mentioned in Hodel’s survey on Arhangel’skiĭ’s Theorem (R. Hodel, Arhangel’skii’s solution to Alexandroff’s problem: A survey, Topology Appl. 153(2006), 2199–2217).In contrast to previous attempts, we do not need any separation axiom beyond $T_{2}$.

yearjournalcountryeditionlanguage
2019-07-09
http://arxiv.org/abs/1907.04344