两区间片断仿射映射的旋转数

Pub Date : 2024-04-22 DOI:10.1007/s00010-024-01064-2

José Pedro Gaivão, Michel Laurent, Arnaldo Nogueira

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引用次数: 0

摘要

我们研究单位区间的映射，这些映射的图是由两个递增段组成的，并且在扩展意义上是注入的。这种映射的参数是满足不等式的实数五元组 \(\varvec{p}}\)。把 \(f_{varvec{p}} 看作一个圆图，我们证明它有一个旋转数 \(\rho (f_{varvec{p}}) \)，我们用赫克-马勒数列计算 \(\rho (f_{varvec{p}}) \)作为 \(\varvec{p}}) 的函数。作为推论，我们证明当 \(\varvec{p}) 的分量是代数数时，\(\rho (f_{\varvec{p}}) 是有理数。

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Rotation number of 2-interval piecewise affine maps

We study maps of the unit interval whose graph is made up of two increasing segments and which are injective in an extended sense. Such maps \(f_{\varvec{p}}\) are parametrized by a quintuple \(\varvec{p}\) of real numbers satisfying inequations. Viewing \(f_{\varvec{p}}\) as a circle map, we show that it has a rotation number \(\rho (f_{\varvec{p}})\) and we compute \(\rho (f_{\varvec{p}})\) as a function of \(\varvec{p}\) in terms of Hecke–Mahler series. As a corollary, we prove that \(\rho (f_{\varvec{p}})\) is a rational number when the components of \(\varvec{p}\) are algebraic numbers.

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