A resolution of the residue field over arbitrary monomial rings (Q1913944)

Let \(S=k[x_1, \dots, x_n]\) be the ring of polynomials of \(n\) variables over a field \(k\), \(I\) be an ideal of \(S\) generated by monomials. A resolution of \(k\) over the ring \(R= S/I\) is presented, using D. Taylor's resolution for \(R\) over \(S\) and the construction of \textit{D. Gokhale} [Commun. Algebra 22, No. 3, 989-1030 (1994; Zbl 0796.13010)].