The Existence of the Exponential Function: Difference between revisions

The purpose of this paperlet is to use some homological algebra in order to prove the existence of a power series ${\displaystyle e(x)}$ (with coefficients in ${\displaystyle {\mathbb {Q} }}$) which satisfies the non-linear equation

${\displaystyle e(x+y)=e(x)e(y)}$

as well as the initial condition

${\displaystyle e(x)=1+x+}$(higher order terms).

Alternative proofs of the existence of ${\displaystyle e(x)}$ are of course available, including the explicit formula ${\displaystyle e(x)=\sum _{k=0}^{\infty }{\frac {x^{k}}{k!}}}$. Thus the value of this paperlet is not in the result it proves but rather in the story it tells: that there is a technique to solve functional equations such as [Main] using homology. There are plenty of other examples for the use of that technique, in which the equation replacing [Main] isn't as easy. Thus the exponential function seems to be the easiest illustration of a general principle and as such it is worthy of documenting.