Three aspects of bosonized supersymmetry and linear differential field equation with reflection

TL;DR

This paper explores bosonized supersymmetry, showing how a nonlocal transformation relates SUSYQM to Dirac theory, leading to linear differential equations with reflection and potential for higher-dimensional generalizations.

Contribution

It introduces a novel nonlocal unitary transformation connecting SUSYQM, Dirac theory, and linear differential equations with reflection, expanding the understanding of bosonized supersymmetry.

Findings

Minimally bosonized SUSYQM derived from Witten's SUSYQM via a nonlocal transformation.

The linear differential equation with reflection generalizes to higher dimensions and gauge couplings.

The approach links SUSYQM, Dirac theory, and paraboson/parafermion algebra.

Abstract

Recently it was observed by one of the authors that supersymmetric quantum mechanics (SUSYQM) admits a formulation in terms of only one bosonic degree of freedom. Such a construction, called the minimally bosonized SUSYQM, appeared in the context of integrable systems and dynamical symmetries. We show that the minimally bosonized SUSYQM can be obtained from Witten's SUSYQM by applying to it a nonlocal unitary transformation with a subsequent reduction to one of the eigenspaces of the total reflection operator. The transformation depends on the parity operator, and the deformed Heisenberg algebra with reflection, intimately related to parabosons and parafermions, emerges here in a natural way. It is shown that the minimally bosonized SUSYQM can also be understood as supersymmetric two-fermion system. With this interpretation, the bosonization construction is generalized to the case of N=1 supersymmetry in 2 dimensions. The same special unitary transformation diagonalises the Hamiltonian operator of the 2D massive free Dirac theory. The resulting Hamiltonian is not a square root like in the Foldy-Wouthuysen case, but is linear in spatial derivative. Subsequent reduction to `up' or `down' field component gives rise to a linear differential equation with reflection whose `square' is the massive Klein-Gordon equation. In the massless limit this becomes the self-dual Weyl equation. The linear differential equation with reflection admits generalizations to higher dimensions and can be consistently coupled to gauge fields. The bosonized SUSYQM can also be generated applying the nonlocal unitary transformation to the Dirac field in the background of a nonlinear scalar field in a kink configuration.