Do you know the reference for this law? [closed]

Question

I am graduate student.

As you know, the convolution operation satisfy the below equation due to commutative law. a(n)*b(n)*c(n) = a(n)*c(n)*b(n)

In addition, the muliplication operation also satisfy the below equation due to commutative law. a(n)b(n)c(n) = a(n)c(n)b(n)

however, to my knowledge, the below equation was not satisfied; a(n)b(n)*c(n) = a(n)*c(n)b(n)

Can I say that "the commutative law between multiplication operation and convolution operation does not satisfied" ?

Furthermore, do you know any reference for this phenomenon?

Answer 1

Maybe the simplest counterexample?

Let $\newcommand{\1}{\mathbf 1}\1=1_{[0,1]}$. Then any $f\cdot\1$ is zero outside of $[0,1]$, but $$\1*\1(x)=\int \1(t)\1(x-t)\,dt = \begin{cases}x& 0\le x\le 1\\ 2-x & 1\le x\le 2\end{cases}$$ is not. So $$\begin{eqnarray*}(\1\cdot \1)*\1&\ne&(\1*\1)\cdot \1\quad\text{and}\\ \1\cdot (\1*\1)&\ne&\1*(\1\cdot \1).\end{eqnarray*}$$ However, $$\begin{eqnarray*}\1\cdot (\1*\1)&=&(\1*\1)\cdot \1\quad\text{and}\\ (\1\cdot \1)*\1&=&\1*(\1\cdot \1).\end{eqnarray*}$$