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Gauld, David - Department of Mathematics, University of Auckland (New Zealand)
DIFFERENTIABILITY AS CONTINUITY DAVID GAULD AND FREDERIC MYNARD
Metrisability of Manifolds in Terms of Function Spaces David Gauld and Frederic Mynard
PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY
Metrisability of Manifolds David Gauld
IRREGULARITY SZYMON DOLECKI AND DAVID GAULD
Addendum to "The torsion of the group of homeomorphisms of powers of the long line"
GAMES AND METRISABILITY OF MANIFOLDS JILING CAO1
1 BASIC NOTIONS Definition 1.1 A topological space is a pair (X, T ) (usually abbreviated to X) where X is a
2 SEPARATION AXIOMS Definition 2.1 A space X is a T0 space iff it satisfies the T0 axiom, i.e. for each x, y X
3 COUNTABILITY AND CONNECTEDNESS AXIOMS Definition 3.1 Let X be a topological space. A subset D of X is dense in X iff D = X.
4 COMPACTNESS AXIOMS Definition 4.1 Let X be a set and A X. A cover of A is a family of subsets of X whose union
Algebraic Topology; MATHS 750 lecture notes
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