How to prove that if a continuous function satisfies $f(a b)=f(a) + f(b)$, this function must be a log function?

Saturday, March 25, 2017

How to prove that if a continuous function satisfies $f(a b)=f(a) + f(b)$, this function must be a log function?

How to prove that if a continuous function satisfies $f(ab)=f(a)+f(b)$ and both $a$ and $b$ are positive real numbers, this function must be a log function? i.e., proof of uniqueness. Thanks

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Saturday, March 25, 2017

How to prove that if a continuous function satisfies $f(a b)=f(a) + f(b)$, this function must be a log function?

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analysis - Injection, making bijection