Formal language theory/Homomorphisms: Difference between revisions

Monoid homomorphisms, ${\displaystyle h:(S^{*},\cdot )\to (T^{*},\cdot )}$, ${\displaystyle h(\lambda )=\lambda }$ and ${\displaystyle h(a\cdot b)=h(a)\cdot h(b)}$, can be extended to languages ${\displaystyle L\subseteq S^{*}}$ in one way that is compatible with set union, ${\displaystyle h(L):=\bigcup _{w\in L}h(w)}$, to make a basic tool in formal language theory, allowing for renaming and simple replacements of letters.

Special homomorphisms include the non-deleting ones (${\displaystyle h(a)}$ is never ${\displaystyle \lambda }$) and the letter-to-letter ones (the image of each letter is a single letter).

A generalisation of this, the replacement of each letter by a whole language is not in general a homomorphism, it is a substitution.