supercommutative

Let $R$ be a $\\mathbb{Z}_{2}$ -graded ring (or more generally, an associative algebra). We say that $R$ is supercommutative if for any homogeneous elements $a$ and $b\\in R$ :

ab=(-1)^{\\deg a\\deg b}ba.

In other words, even homogeneous elements are in the center of the ring, and odd homogeneous elements anti-commute.

Common examples of supercommutative rings are the exterior algebra of a module over a commutative ring (in particular, a vector space) and the cohomology ring of a topological space (both with the standard grading by degree reduced mod 2).