Webification of symmetry classes of plane partitions

Abstract

Webs are graphical objects that give a tangible, combinatorial way to compute and classify tensor invariants. Recently, [Gaetz, Pechenik, Pfannerer, Striker, Swanson 2023+] found a rotation-invariant web basis for SL4, as well as its quantum deformation Uq(sl4), and a bijection between move equivalence classes of Uq(sl4)-webs and fluctuating tableaux such that web rotation corresponds to tableau promotion. They also found a bijection between the set of plane partitions in an a× b× c box and a benzene move equivalence class of Uq(sl4)-webs by determining the corresponding oscillating tableau. In this paper, we similarly find the oscillating tableaux corresponding to plane partitions in certain symmetry classes. We furthermore show that there is a projection from Uq(sl4) invariants to Uq(slr) for r=2,3 for webs arising from certain symmetry classes.