Supersymmetric quantum mechanics of scattering

@article{Shimbori2000SupersymmetricQM,
  title={Supersymmetric quantum mechanics of scattering},
  author={Toshiki Shimbori and Tsunehiro Kobayashi},
  journal={Physics Letters B},
  year={2000},
  volume={501},
  pages={245-248}
}

Supersymmetry in quantum mechanics: an extended view

The concept of supersymmetry in a quantum-mechanical system is extended, permitting the recognition of more supersymmetric systems, including very familiar ones such as the free particle. Its

Non-Hermitian inverted harmonic oscillator-type Hamiltonians generated from supersymmetry with reflections

By modifying and generalizing known supersymmetric models, we are able to find four different sets of one-dimensional Hamiltonians for the inverted harmonic oscillator. The first set of Hamiltonians

Ladder operators in repulsive harmonic oscillator with application to the Schwinger effect

The ladder operators in harmonic oscillator are a well-known strong tool for various problems in physics. In the same sense, it is sometimes expected to handle the problems of repulsive harmonic

Observation of the Higgs Boson of strong interaction via Compton scattering by the nucleon

It is shown that the Quark-Level Linear σ Model (QLLσM) leads to a prediction for the diamagnetic term of the polarizabilities of the nucleon which is in excellent agreement with experimental data.

References

SHOWING 1-10 OF 26 REFERENCES

Modern Quantum Mechanics

1. Fundamental Concepts. 2. Quantum Dynamics. 3. Theory of Angular Momentum. 4. Symmetry in Quantum Mechanics. 5. Approximation Methods. 6. Identical Particles. 7. Scattering Theory. Appendices.

Introduction To Supersymmetry And Supergravity

The publication of the first edition of “Introduction to Supersymmetry and Supergravity” was a remarkable success. This second edition contains a substantial amount of new material especially on

Stationary flows of the parabolic potential barrier in two dimensions

In the two-dimensional isotropic parabolic potential barrier V(x,y) = V0-mγ2(x2 + y2)/2, though it is a model of an unstable system in quantum mechanics, we can obtain the stationary states

Supersymmetry and Supergravity

The first edition of this book appeared in 1983 and was based on a series of lectures given at Princeton in 1983 by Julius Wess. Since the appearance of the first edition much work has been done on