Super Landau Model and Howe Duality: From Supermonopole Harmonics to Quantum Matrix Geometry

TL;DR

This paper explores how Howe duality underpins super Landau models, revealing dual fuzzy geometries and providing explicit constructions of supermonopole harmonics, advancing the understanding of quantum matrix geometries.

Contribution

It demonstrates that Howe duality structures super Landau models, relates different Landau levels, and derives fuzzy supersphere geometries with a clear non-commutative scale.

Findings

Supermonopole harmonics explicitly constructed for all Landau levels.

Fuzzy supersphere geometries derived for arbitrary levels.

Howe duality induces geometric transformations between fuzzy objects.

Abstract

Landau models serve as quantum mechanical systems for generating quantum matrix geometries. In this paper, we demonstrate that Howe duality provides the underlying structure of the super Landau model, reflecting a general feature of coset-type Landau models. The (super) Howe duality relates different Landau levels and accounts for the emergence of a dual fuzzy geometry. By employing super-spinor derivative operators, the supermonopole harmonics in both integer and half-integer Landau levels are explicitly constructed and the algebraic structure of the super-Hilbert space is revealed. We propose a consistent probabilistic interpretation for these wavefunctions defined on a supermanifold. Through a level projection method, we derive the matrix coordinates of fuzzy supersphere geometries for arbitrary Landau levels, along with a precise determination of the non-commutative scale factor. It is shown that the theta correspondence of Howe duality induces a geometric transformation between fuzzy objects. Finally, we point out that Howe duality realizes an internal-external space duality and underlies quantum matrix geometries, suggesting that it may play a fundamental role in understanding Matrix model geometries.