David Gauld scite author profile

David Gauld

5Publications

100Citation Statements Received

62Citation Statements Given

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University of Auckland

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Foliations on non-metrisable manifolds: Absorption by a Cantor black hole

Baillif

Gabard

Gauld

2013

Proc. Amer. Math. Soc.

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We investigate contrasting behaviours emerging when studying foliations on non-metrisable manifolds. It is shown that Kneser's pathology of a manifold foliated by a single leaf cannot occur with foliations of dimension-one. On the other hand, there are open surfaces admitting no foliations. This is derived from a qualitative study of foliations defined on the long tube S 1 × L + (product of the circle with the long ray), which is reminiscent of a 'black hole', in as much as the leaves of such a foliation are strongly inclined to fall into the hole in a purely vertical way. More generally the same qualitative behaviour occurs for dimension-one foliations on M × L + , provided that the manifold M is "sufficiently small", a technical condition satisfied by all metrisable manifolds. We also analyse the structure of foliations on the other of the two simplest long pipes of Nyikos, the punctured long plane. We are able to conclude that the long plane L 2 has only two foliations up to homeomorphism and six up to isotopy.

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On Volterra Spaces II

Gauld

Greenwood

Piotrowski

1996

Annals of the New York Academy of Sciences

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We say that a topological space X is Volterra if for each pair f, g: X→ℝ for which the sets of points at which f, respectively g, are continuous are dense, there is a common point of continuity; and X is strongly Volterra if in the same circumstances the set of common points of continuity is dense in X. For both of these concepts equivalent conditions are given and the situation involving more than two functions is explored.

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Volterra spaces revisited

Cao

Gauld

2005

J. Aust. Math. Soc.

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In this paper, we investigate Volterra spaces and relevant topological properties. New characterizations of weakly Volterra spaces are provided. An analogy of the Banach category theorem in terms of Volterra properties is obtained. It is shown that every weakly Volterra homogeneous space is Volterra, and there are metrizable Baire spaces whose hyperspaces of nonempty compact subsets endowed with the Vietoris topology are not weakly Volterra.2000 Mathematics subject classification: primary 26A15, 54C05, 54E52.

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Foliations on Non-metrisable Manifolds

Gauld

2014

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Topological Properties of Manifolds

Gauld¹

1974

The American Mathematical Monthly

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David Gauld

Foliations on non-metrisable manifolds: Absorption by a Cantor black hole

On Volterra Spaces II

Volterra spaces revisited

Foliations on Non-metrisable Manifolds

Topological Properties of Manifolds

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