Unique solutions

Mathematical Logic Quarterly 52 (6):534-539 (2006)
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Abstract

It is folklore that if a continuous function on a complete metric space has approximate roots and in a uniform manner at most one root, then it actually has a root, which of course is uniquely determined. Also in Bishop's constructive mathematics with countable choice, the general setting of the present note, there is a simple method to validate this heuristic principle. The unique solution even becomes a continuous function in the parameters by a mild modification of the uniqueness hypothesis. Moreover, Brouwer's fan theorem for decidable bars turns out to be equivalent to the statement that, for uniformly continuous functions on a compact metric space, the crucial uniform “at most one” condition follows from its non-uniform counterpart. This classification in the spirit of the constructive reverse mathematics, as propagated by Ishihara and others, sharpens an earlier result obtained jointly with Berger and Bridges

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10.1002/malq.200610012

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Peter Schuster
University of Leeds

Citations of this work

Corrigendum to “Unique solutions”.Peter Schuster - 2007 - Mathematical Logic Quarterly 53 (2):214-214.

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References found in this work

Intuitionism As Generalization.Fred Richman - 1990 - Philosophia Mathematica (1-2):124-128.

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