On decompositions of trigonometric polynomials
classification
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mathbbthetacompositiondecomposeddecompositionsdescribeelementequation
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Let $\mathbb R_t[\theta]$ be the ring generated over $\mathbb R$ by $\cos\theta$ and $\sin\theta$, and $\mathbb R_t(\theta)$ be its quotient field. In this paper we study the ways in which an element p of $\mathbb R_t[\theta]$ can be decomposed into a composition of functions of the form $p=R(q),$ where $\mathbb R\in \mathbb R(x)$ and $q\in \mathbb R_t(\theta)$. In particular, we describe all possible solutions of the functional equation $R_1(q_1)=R_2(q_2)$, where $R_1, R_2 \in \mathbb R[x]$ and $q_1,q_2\in \mathbb R_t[\theta].$
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