Additive map

In mathematics an additive map of ring ${\displaystyle R_{1}}$ into ring ${\displaystyle R_{2}}$ is a homomorphism

${\displaystyle f:R_{1}\to R_{2}\,,}$

of the additive group of ${\displaystyle R_{1}}$ into the additive group of ${\displaystyle R_{2}}$.

According to the definition of a homomorphism of an additive group, an additive map ${\displaystyle f}$ of a ring ${\displaystyle R_{1}}$ into a ring ${\displaystyle R_{2}}$ satisfies

${\displaystyle f(a+b)=f(a)+f(b)\,.}$

We do not expect that an additive map preserves the product operation of the ring.

If ${\displaystyle f}$ and ${\displaystyle g}$ are additive maps, then the map ${\displaystyle f+g}$ is additive. Similarly, the map ${\displaystyle afb}$ is additive, for ${\displaystyle a,b\in R_{2}}$.

Let ${\displaystyle D}$ be a division ring of characteristic ${\displaystyle 0}$. We can represent an additive map ${\displaystyle f:D\to D}$ of the division ring ${\displaystyle D}$ as

${\displaystyle f(x)={}_{(s)0}f\ x\ {}_{(s)1}f\,.}$

We assume a sum over the index ${\displaystyle s}$. The number of items depends on the function ${\displaystyle f}$. The expressions ${\displaystyle {}_{(s)0}f,{}_{(s)1}f\in D}$ are called the components of the additive map.

• Leslie Hogben, Richard A. Brualdi, Anne Greenbaum, Roy Mathias, Handbook of linear algebra, CRC Press, 2007

• Roger C. Lyndon, Paul E. Schupp, Combinatorial Group Theory, Springer, 2001