Abstract
It is known that a pair (f, g) of functions with f≠ 0 satisfies the sine addition formula f(xy) = f(x) g(y) + g(x) f(y) on a semigroup only if g= (μ1+ μ2) / 2 where μ1 and μ2 are multiplicative functions. Here we solve the variant f(xy) = g1(x) h1(y) + g(x) h2(y) for four unknown functions f, g1, h1, h2 on a monoid, where g is not simply the average of two multiplicative functions but more generally a linear combination of n≥ 2 distinct multiplicative functions.
Original language | English |
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Article number | 119 |
Journal | Results in Mathematics |
Volume | 73 |
Issue | 3 |
ISSN | 1422-6383 |
DOIs | |
Publication status | Published - 1 Sept 2018 |
Keywords
- character
- functional equation
- multiplicative function
- Sine addition formula
- topological semigroup