On the “tree” structure of natural numbers
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Vitalii V. Iudelevich
Abstract
With each positive integer one can naturally associate a graph in the form of a tree. This paper is concerned with the average values of the number of edges, the number of leaves and the height of trees corresponding to positive integers not greater than a given boundary.
Note
Originally published in Diskretnaya Matematika (2021) 33,№3, 121–141 (in Russian).
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© 2022 Walter de Gruyter GmbH, Berlin/Boston
Artikel in diesem Heft
- Contents
- Classification of Hadamard products of one-codimensional subcodes of Reed–Muller codes
- Asymptotical local probabilities of lower deviations for branching process in random environment with geometric distributions of descendants
- On the “tree” structure of natural numbers
- Estimates of lengths of shortest nonzero vectors in some lattices, II
- Curvature of the Boolean majority function
- Properties of proper families of Boolean functions
Artikel in diesem Heft
- Contents
- Classification of Hadamard products of one-codimensional subcodes of Reed–Muller codes
- Asymptotical local probabilities of lower deviations for branching process in random environment with geometric distributions of descendants
- On the “tree” structure of natural numbers
- Estimates of lengths of shortest nonzero vectors in some lattices, II
- Curvature of the Boolean majority function
- Properties of proper families of Boolean functions
