A characterization of the quaternions using commutators

Let $R$ be an associative ring with ${\bf 1}$ which is not commutative. Assume that any non-zero commutators $v\in R$ satisfies: $v^2$ is in the center of $R$ and $v$ is not a zero-divisor. (Note that our assumptions do not include finite dimensionality.) We prove that $R$ has no zero divisors, and that if ${\rm char(R)}\ne 2,$ then the localization of $R$ at its center is a quaternion division algebra.