The fermionic diagonal coinvariant ring was introduced by Rhoades and Jongwon Kim and is a quotient of a polynomial ring in two sets of $n$ anticommuting variables modulo $\mathfrak{S}_n$ invariant polynomials with no constant term, where the action of $\mathfrak{S}_n$ permutes both sets of variables simultaneously. In this talk, we will introduce a basis of this ring for which the action of $\mathfrak{S}_{n-1} \subset \mathfrak{S}_n$ can be interpreted combinatorially and use this basis to determine the isomorphism type of the ring. We will also relate our basis to a cyclic sieving result by Thiel.