Multiplicatively separable function

Definition

For a function of two variables

Suppose $G$ is a function of two variables $x$ and $y$ . We say that $G$ is multiplicatively separable if there exist functions $f,g$ of one variable such that:

$G(x,y)=f(x)g(y)$

on the entire domain of $G$ .

Note that the concept of multiplicatively separable is sensitive to the coordinate system, i.e., if we change the coordinate system, a function that was originally multiplicatively separable need not remain multiplicatively separable.

For a function of many variables

Suppose $G$ is a function of $n$ variables $x_{1},x_{2},\dots ,x_{n}$ . We say that $G$ is completely multiplicatively separable if there exist functions $g_{1},g_{2},\dots ,g_{n}$ , each a function of one variable, such that:

$G(x_{1},x_{2},\dots ,x_{n})=g_{1}(x_{1})g_{2}(x_{2})\dots g_{n}(x_{n})$

(note that the subscripts here are not to be confused with subscripts used for partial derivatives).

There is a weaker notion of partially multiplicatively separable: if we express the set $\{1,2,\dots ,n\}$ as a union of two disjoint subsets $A,B$ , $G$ is multiplicatively separable with respect to the partition if there exist functions $g_{A},g_{B}$ such that:

$G(x_{1},x_{2},\dots ,x_{n})=g_{A}({\mbox{only the variables }}x_{i},i\in A)g_{B}({\mbox{only the variables }}x_{i},i\in B)$

Partial derivatives

For a function of two variables

Consider the case $\!G(x,y)=f(x)g(y)$ .

Then, if $f$ is $m$ times differentiable and $g$ is $n$ times differentiable, then $G_{xx\dots xyy\dots y}$ makes sense where $x$ occurs $m$ times and $y$ occurs $n$ times, and:

$\!G_{xx\dots xyy\dots y}=f^{(m)}(x)g^{(n)}(y)$

Further, any partial derivative of $G$ that uses $m$ occurrences of $x$ and $n$ occurrences of $y$ will have the same derivative as the above.

In particular, we have that:

$G_{x}(x,y)=f'(x)g(y)$
$G_{y}(x,y)=f(x)g'(y)$
$G_{xy}(x,y)=G_{yx}(x,y)=f'(x)g'(y)$