Shuffle theorem for torus link homology

Abstract

We prove that the symmetric function e(1k)[-MXm,n] · 1, arising from the elliptic Hall algebra, equals the generating function for k-tuples of cyclic (m,n)-parking functions. This result resolves a conjecture of Gorsky--Mazin--Vazirani and Wilson, establishing that the elliptic Hall algebra governs the Khovanov--Rozansky homology of torus links T(km,kn). Consequently, this provides an affirmative answer to a question of Galashin and Lam in the torus link case. As a key step in the proof, we develop a rational analogue of the Shareshian--Wachs involution originally introduced to prove the symmetry property of the chromatic quasisymmetric functions.