非阿贝尔群的余弦加减公式

Pub Date : 2024-04-10 DOI:10.1007/s00010-024-01052-6

Omar Ajebbar, Elhoucien Elqorachi, Henrik Stetkær

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引用次数: 0

摘要

让 G 是一个拓扑群，让 C(G) 表示 G 上连续复值函数的代数。我们确定了 Levi-Civita 方程 $$begin{aligned} g(xy) = g(x)g(y) + f(x)h(y), \ x,y \ in G, \end{aligned}$ 的解（f,g,h \ in C(G)），它扩展了余弦加法法则。作为推论，我们得到了余弦减法法则 $g(xy^*) = g(x)g(y) + f(x)f(y)$, $x,y \in G$ 的解 $f,g \in C(G)$ 其中 $x \mapsto x^*$ 是 G 的连续反卷。(x映射到x^*)是一个内卷，意味着对于所有的$x,y in G$ ，$(xy)^* = y^*x^*$ 和$x^{**} = x$.

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The cosine addition and subtraction formulas on non-abelian groups

Let G be a topological group, and let C(G) denote the algebra of continuous, complex valued functions on G. We determine the solutions $f,g,h \in C(G)$ of the Levi-Civita equation

$$\begin{aligned} g(xy) = g(x)g(y) + f(x)h(y), \ x,y \in G, \end{aligned}$$

that extends the cosine addition law. As a corollary we obtain the solutions $f,g \in C(G)$ of the cosine subtraction law $g(xy^*) = g(x)g(y) + f(x)f(y)$, $x,y \in G$ where $x \mapsto x^*$ is a continuous involution of G. That $x \mapsto x^*$ is an involution, means that $(xy)^* = y^*x^*$ and $x^{**} = x$ for all $x,y \in G$.

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