The set consists of T(V)=⊕k=0∞(⊗kV)T(V) = \oplus_{k=0}^\infty (\otimes^k V)T(V)=⊕k=0∞(⊗kV), that is a Direct sum of Tensor products of VVV.
See here for the definition of the product.
The Exterior algebra is a quotient of this algebra.
It is associative and not commutative
Can also extend tensor product to Vector bundles