# Taking 3 or more combinations using `combinations`

The following is a bit of code I wrote in Sage to compute the dimensions of certain Lie algebras that are equal to \$p^2\$ for some \$p\$.

def A_comb2rep(p):
bound = p*p
name_fund = []
name_comb = []
A = lambda i: WeylCharacterRing("A{0}".format(i))
for i in range(bound):
for k in range(1,bound+1):
fw = A(i+1).fundamental_weights()
if A(i+1)(k * fw[1]).degree() > bound:
break
else:
for v in fw:
if A(i+1)(k * v).degree() == bound:
name_fund.append([])
name_fund[len(name_fund)-1].append('A'+str(i+1)+'('+str(k)+'*'+str(v)+')')
for i in range(1,bound): # now onto combinations of two of the fws   #####
fw = A(i+1).fundamental_weights()
for k in fw:
if A(i+1)(fw[1] + fw[2]).degree() > bound:
break
else:
for j in fw:
rep = A(i+1)(j+k)
deg = rep.degree()
if deg == bound:
name_comb.append([])
name_comb[len(name_comb)-1].append('A'+str(i+1)+'['+str(j)+'+'+str(k)+']')
return name_comb, name_fund

The second half of the code is where I consider combinations of two fundamental weights. I am now wondering how to extend this for combinations of 3 or more fundamental weights using the combination function in the iterables module.

More specifically, how would I code in a sum of 3 of the elements of fw? I know that v = combinations(fw, 3) would then put into v all \${n \choose 3}\$ triple combinations, but the elements of fw are tuples, like (1,1,1,0,0,0). How would I then sum each of the triples I get in v? I apologize if this question is inappropriate for this site.

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