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Type: Article
Cardinal invariants of monotone and porous sets
Abstract:
A metric space (X, d) is monotone if there is a linear order < on X and a constant c such that d(x, y) <= d(x, z) for all x < y < z in X. We investigate cardinal invariants of the sigma-ideal Mon generated by monotone subsets of the plane. Since there is a strong connection between monotone sets in the plane and porous subsets of the line, plane and the Cantor set, cardinal invariants of these ideals are also investigated. In particular, we show that non(Mon) >= m(sigma-linked),d, but non(Mon) < m(sigma-centered) is consistent. Also cov(Mon) < c and cof(X) < cov(Mon) are consistent.
A metric space (X, d) is monotone if there is a linear order < on X and a constant c such that d(x, y) <= d(x, z) for all x < y < z in X. We investigate cardinal invariants of the sigma-ideal Mon generated by monotone subsets of the plane. Since there is a strong connection between monotone sets in the plane and porous subsets of the line, plane and the Cantor set, cardinal invariants of these ideals are also investigated. In particular, we show that non(Mon) >= m(sigma-linked),d, but non(Mon) < m(sigma-centered) is consistent. Also cov(Mon) < c and cof(X) < cov(Mon) are consistent.
Keywords: Sigma-monotone; sigma-porous; cardinal invariants
MSC: 03E17 (03E15 03E35 28A75 54H05)
Journal: Journal of Symbolic Logic
ISSN: 0022-4812
Year: 2012
Volume: 77
Number: 1
Pages: 159--173
Created: 2012-12-11 13:10:18
Modified: 2014-02-13 11:18:44
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