Murnaghan-Type Representations for the Positive Elliptic Hall Algebra

We construct a new family of graded representations W_ for the positive elliptic Hall algebra E^+ indexed by Young diagrams which generalize the standard E^+ action on symmetric functions. These representations have homogeneous bases of eigenvectors for the action of the Macdonald element P₀, ₁ E^+ with distinct Q (q, t) -rational spectrum generalizing the symmetric Macdonald functions. The analysis of the structure of these representations exhibits interesting combinatorics arising from the stable limits of periodic standard Young tableaux. We find an explicit combinatorial rule for the action of the multiplication operators eᵣX^ generalizing the Pieri rule for symmetric Macdonald functions. We will also naturally obtain a family of interesting (q, t) product-series identities which come from keeping track of certain combinatorial statistics associated to periodic standard Young tableaux.