So, beta-reduction in the (untyped) lambda calculus is what we call a *confluent* rewrite rule. This means if you can rewrite `A`

to `B`

with beta reduction, and also rewrite `A`

to `C`

with beta-reduction, then you can find some `D`

such that `B`

rewrites to `D`

**and** `C`

rewrites to `D`

- there will be, in effect, some common descendent. The theorem that shows this for the lambda calculus is normally called the Church-Rosser theorem. The overall property is sometimes called the diamond property, as the diagram resembles a diamond (two routes branch out, but eventually come back together again). It also means that the final outcome of a "termination" lambda expression will be identical no matter how you choose to apply beta-reduction.

However, not all lambda terms have one final outcome. This means the untyped calculus is not what we call *normalising*. There are plenty of lambda terms that will expand forever under beta-reduction (never reaching an irreducible, or *normal* form). In these situations, having some system for ordering your rewrites is useful, as it ensures that evaluation of programs proceeds identically for two identical programs.

Of course, you need to ensure you are respecting the binding rules of lambda, so you don't try and apply terms to the wrong lambda variables.