Cohomology rings of the plactic monoid algebra via a Gröbner-Shirshov basis (Q2801828)

Let \(Pl_{n}=sgp\langle A | R \rangle\) be a monoid generated by \(A\) with relations \(R\), where \( A = \{1, 2,\dots, n\}\) and \(R=\{ikj = kij\;(i \leq j<k), jki= jik \;(i<j \leq k)\mid i,j,k \in A\}\). Then \(Pl_{n}\) is called a plactic monoid generated by \(A\). Let \(\mathbb{K}Pl_{n}\) be the plactic monoid algebra over a field \(\mathbb{K}\). In this paper, by using Anick resolution and Gröbner-Shirshov bases method, the author calculates the cohomology ring \(\mathrm{Ext}_{\mathbb{K}Pl_n}(\mathbb{K},\mathbb{K})\) and the Hochschild cohomology ring of the plactic monoid algebra \(\mathbb{K}Pl_{n}\).