J. M. Worrell scite author profile

J. M. Worrell

5Publications

90Citation Statements Received

33Citation Statements Given

How they've been cited

225

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Affiliations

Ohio University, Sandia National Laboratories California

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Characterizations of Developable Topological Spaces

Worrell

Wicke²

1965

Can. j. math.

149

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The class of developable topological spaces, which includes the metrizable spaces, has been fundamentally involved in investigations in point set topology. One example is the remarkable edifice of theorems relating to these spaces constructed by R. L. Moore (13). Another is the role played by the developable property in several metrization theorems, including Alexandroff and Urysohn's original solution of the general metrization problem (1).This paper presents an anslysis of the concept of developable space in terms of certain more extensive classes of spaces satisfying the first axiom of countability : spaces with a base of countable order and those having what is here called a θ-base. The analysis is given in the characterizations of Theorems 3 and 4 below.

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Open continuous mappings of spaces having bases of countable order

Wicke¹,

Worrell²

1967

Duke Math. J.

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A Characterization of Spaces Having Bases of Countable Order in Terms of Primitive Bases

Wicke

Worrell

1975

Can. j. math.

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The main theorem of this paper characterizes the class of essentially T1 spaces having bases of countable order as those spaces of the class of essentially T1 spaces having primitive bases in which closed sets are sets of interior condensation. In addition we deduce some corollaries of this theorem, derive some other characterizations, and prove a lemma concerning primitive sequences which is a key to the proof of the main theorem and has other applications.

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On continuous mappings of metacompact Čech complete spaces

Worrell¹

1969

Pacific J. Math.

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On the open continuous images of paracompact Čech complete spaces

Wicke¹,

Worrell²

1971

Pacific J. Math.

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J. M. Worrell

Characterizations of Developable Topological Spaces

Open continuous mappings of spaces having bases of countable order

A Characterization of Spaces Having Bases of Countable Order in Terms of Primitive Bases

On continuous mappings of metacompact Čech complete spaces

On the open continuous images of paracompact Čech complete spaces

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