Chainable and Circularly Chainable Co-r.e. Sets in Computable Metric Spaces (CROSBI ID 151767)
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Iljazović, Zvonko
engleski
Chainable and Circularly Chainable Co-r.e. Sets in Computable Metric Spaces
We investigate under what conditions a co-recursively enumerable set S in a computable metric space (X, d, alpha) is recursive. The topological properties of S play an important role in view of this task. We first study some properties of computable metric spaces such as the effective covering property. Then we examine co-r.e. sets with disconnected complement, and finally we focus on study of chainable and circularly chainable continua which are co-r.e. as subsets of X. We prove that, under some assumptions on X, each co-r.e. circularly chainable continuum which is not chainable must be recursive. This means, for example, that each co-r.e. set in R^n or in the Hilbert cube which has topological type of the Warsaw circle or the dyadic solenoid must be recursive. We also prove that for each chainable continuum S which is decomposable and each epsilon >0 there exists a recursive subcontinuum of S which is epsilon- close to S.
computable metric space; recursive set; co-r.e. set; chainable continuum; circularly chainable continuum; the effective covering property
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