Free finitely generated module has finite rank?

  • Context: Graduate 
  • Thread starter Thread starter quasar987
  • Start date Start date
  • Tags Tags
    Finite module rank
Join the discussion
Ask a follow-up here, or get your own question answered by working scientists, mathematicians and engineers — people, not an autocomplete.
Real named experts · corrections over time · the nuance an AI answer skips
1 reply · 4K views
Messages
4,796
Reaction score
32
How does one prove that for R commutative, a free finitely generated R-module has finite rank?

If R is a field (i.e. in the case of vector space), then we can argue that given a finite generating set S={s1,...,sn}, if S is not linearly independent, then, WLOG, it is that
(*) s1=r2s2+...+rnsn
so we just remove s1 from S and repeat until we are down to a basis of M. But in the general case, equation (*) fails. We can only say that for some non all zero elements r1,...,rn of R,
r1s1=r2s2+...+rnsn.
So we don't know if S-{s1} still generates.
 
Physics news on Phys.org
Ah.. take S a finite generating set and B={xi} a basis. Every element of S can be written as a finite linear combination of the xi's, so in particular, finitely many xi's are required to generate S, which itself generate the whole module. Thus those xi's are a finite basis.