Multiplicatively separable function: Difference between revisions

Definition

For a function of two variables

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

${\displaystyle G(x,y)=f(x)g(y)}$

on the entire domain of ${\displaystyle G}$.

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

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

(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 ${\displaystyle \{1,2,\dots ,n\}}$ as a union of two disjoint subsets ${\displaystyle A,B}$, ${\displaystyle G}$ is multiplicatively separable with respect to the partition if there exist functions ${\displaystyle g_{A},g_{B}}$ such that:

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

Partial derivatives

For a function of two variables

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

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

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

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

In particular, we have that:

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

For a function of many variables

Consider the case ${\displaystyle G(x_{1},x_{2},\dots ,x_{n})=g_{1}(x_{1})g_{2}(x_{2})\dots g_{n}(x_{n})}$

Suppose ${\displaystyle m_{1},m_{2},\dots ,m_{n}}$ are (possibly equal, possibly distinct) nonnegative integers such that each ${\displaystyle f_{i}}$ is ${\displaystyle m_{i}}$ times differentiable. Now, consider a partial derivative of ${\displaystyle G}$ that involves ${\displaystyle m_{1}}$ differentiations in ${\displaystyle x_{1}}$, ${\displaystyle m_{2}}$ differentiations in ${\displaystyle x_{2}}$, and so on, with ${\displaystyle m_{i}}$ differentiations in each ${\displaystyle x_{i}}$. The order of the differentiations does not matter. Then, this partial derivative equals:

${\displaystyle \!g_{1}^{(m_{1})}(x_{1})g_{2}^{(m_{2})}(x_{2})\dots g_{n}^{(m_{n})}(x_{n})}$

Integration on rectangular regions

For a function of two variables

Suppose ${\displaystyle G(x,y)=f(x)g(y)}$ is a function of two variables. Consider a rectangular region ${\displaystyle R}$ of the form ${\displaystyle [a,b]\times [p,q]}$ where ${\displaystyle a,b,p,q}$ are numbers. Then:

${\displaystyle \int _{R}G(x,y)\,dA=\left(\int _{a}^{b}f(x)\,dx\right)\left(\int _{p}^{q}g(y)\,dy\right)}$

For a function of many variables

Suppose ${\displaystyle G(x_{1},x_{2},\dots ,x_{n})=g_{1}(x_{1})g_{2}(x_{2})\dots g_{n}(x_{n})}$ is a function of ${\displaystyle n}$ variables. Consider a rectangular region ${\displaystyle R}$ of the form ${\displaystyle [a_{1},b_{1}]\times [a_{2},b_{2}]\times \dots \times [a_{n},b_{n}]}$. Then:

${\displaystyle \int _{R}G(x,y)\,dA=\prod _{i=1}^{n}\left(\int _{a_{i}}^{b_{i}}g_{i}(x_{i})\,dx_{i}\right)}$