Distributions of random binary sequences

David Culpin

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Displaying similar documents to “Distributions of random binary sequences”

Random $n$ -ary sequence and mapping uniformly distributed

Nguyen Van Ho, Nguyen Thi Hoa (1995)

Applications of Mathematics

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Višek [3] and Culpin [1] investigated infinite binary sequence $X = (X_{1}, X_{2}, \dots)$ with $X_{i}$ taking values $0$ or $1$ at random. They investigated also real mappings $H (X)$ which have the uniform distribution on $[0; 1]$ (notation $𝒰 (0; 1)$ ). The problem for $n$ -ary sequences is dealt with in this paper.

A fixed point theorem for a multivalued non-self mapping

Billy E. Rhoades (1996)

Commentationes Mathematicae Universitatis Carolinae

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We prove a fixed point theorem for a multivalued non-self mapping in a metrically convex complete metric space. This result generalizes Theorem 1 of Itoh [2].

Displaying similar documents to “Distributions of random binary sequences”

Random n -ary sequence and mapping uniformly distributed

A fixed point theorem for a multivalued non-self mapping

Random $n$ -ary sequence and mapping uniformly distributed