Titlebook: Computation, Physics and Beyond; International Worksh Michael J. Dinneen,Bakhadyr Khoussainov,André Nies Book 2012 Springer-Verlag GmbH Ber

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978-3-642-27653-8Springer-Verlag GmbH Berlin Heidelberg 2012

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https://doi.org/10.1007/978-3-319-58826-1 and Slaman?[5]. This joint effort led to a full characterization of lower semicomputable random reals, both as those that can be expressed as a “Chaitin Omega” and those that are maximal for the Solovay reducibility. The original proofs were somewhat involved; in this paper, we present these result

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https://doi.org/10.1007/978-3-319-58826-1n a constructive convergence proof for the algorithm, one must add some hypotheses such as Markov’s principle or the locatedness of a certain range; and that in the finite-dimensional case, the existence of both the infimum and the supremum of the two projections suffices for the convergence of the

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Springer Monographs in Mathematicsexity measure is a generalization of Kolmogorov/Chaitin complexity, also known as algorithmic or static complexity. In this paper we continue this effort by extending some of the well known results for plain and prefix-free complexities to the general case of Blum universal static complexity. We als

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