Cauchy's functional equation is the functional equation
: f(x+y)=f(x)+f(y). \
Solutions to this are called additive functions.
Over the rational numbers, it can be shown using elementary algebra that there is a single family of solutions, namely f(x) = cx \ for any arbitrary rational number c.
Over the real numbers, this is still a family of solutions; however there can exist other solutions that are extremely complicated. Further constraints on f sometimes preclude other solutions, for example:
* if f is continuous (proven by Cauchy in 1821). This condition was weakened in 1875 by Dar...