Journal of High Energy Physics (Nov 2023)
3-Schurs from explicit representation of Yangian Y gl ̂ 1 $$ \textrm{Y}\left({\hat{\mathfrak{gl}}}_1\right) $$ . Levels 1–5
Abstract
Abstract We suggest an ansatz for representation of affine Yangian Y gl ̂ 1 $$ Y\left({\hat{\mathfrak{gl}}}_1\right) $$ by differential operators in the triangular set of time-variables P a,i with 1 ⩽ i ⩽ a, which saturates the MacMahon formula for the number of 3d Young diagrams/plane partitions. In this approach the 3-Schur polynomials are defined as the common eigenfunctions of an infinite set of commuting “cut-and-join” generators ψ n of the Yangian. We manage to push this tedious program through to the 3-Schur polynomials of level 5, and this provides a rather big sample set, which can be now investigated by other methods.
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