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Multiplicative functions commutable with binary quadratic forms $x^2 \pm xy + y^2$

Published 22 Feb 2022 in math.NT | (2202.10653v1)

Abstract: If a multiplicative function $f$ is commutable with a quadratic form $x2+xy+y2$, i.e., [ f(x2+xy+y2) = f(x)2 + f(x)\,f(y) + f(y)2, ] then $f$ is the identity function. In other hand, if $f$ is commutable with a quadratic form $x2-xy+y2$, then $f$ is one of three kinds of functions: the identity function, the constant function, and an indicator function for $\mathbb{N}\setminus p\mathbb{N}$ with a prime $p$.

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