Stanley's proof of the Upper Bound Conjecture relied on a connection with free resolutions of graded algebras.  This has led to the very active area of Stanley--Reisner theory, where   combinatorial properties of simplicial complexes are related to algebraic properties of certain graded algebras.  

For references, there's a wikipedia page on Stanley--Reisner theory if you're interested:

http://en.wikipedia.org/wiki/Stanley%E2%80%93Reisner_ring

Also, Bruns and Herzog's book "Cohen--Macaulay Rings" has nice a chapter on Stanley--Reisner rings.  I'm sure there are other good references as well.