On linear equivalence of piecewise-linear permutations of the field đť”˝2n
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Andrey V. Menyachikhin
Abstract
We study conditions for linear equivalence of piecewise-linear and partially defined piecewise-linear permutations of the field đť”˝2n.
Originally published in Diskretnaya Matematika (2023) 35, №3, 37–44 (in Russian).
Acknowledgment
The author is grateful to D. A. Burov for useful comments and for his interest in this study.
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© 2024 Walter de Gruyter GmbH, Berlin/Boston
Artikel in diesem Heft
- Frontmatter
- On continuants of continued fractions with rational partial quotients
- On linear equivalence of piecewise-linear permutations of the field đť”˝2n
- On the prospective minimum of the random walk conditioned to stay nonnegative
- Limiting behavior of percolation cluster in a multilayered random environment with breakdown
Artikel in diesem Heft
- Frontmatter
- On continuants of continued fractions with rational partial quotients
- On linear equivalence of piecewise-linear permutations of the field đť”˝2n
- On the prospective minimum of the random walk conditioned to stay nonnegative
- Limiting behavior of percolation cluster in a multilayered random environment with breakdown
