Higher order constraints for the (β-deformed) Hermitian matrix models

Abstract

We construct the (β-deformed) higher order total derivative operators and analyze their remarkable properties. In terms of these operators, we derive the higher order constraints for the (β-deformed) Hermitian matrix models. We prove that these (β-deformed) higher order constraints are reducible to the Virasoro constraints. Meanwhile, the Itoyama-Matsuo conjecture for the constraints of the Hermitian matrix model is proved. We also find that through rescaling variable transformations, two sets of the constraint operators become the W-operators of W-representations for the (β-deformed) partition function hierarchies in the literature.