Papers
Topics
Authors
Recent
2000 character limit reached

Coupled Supersymmetry and Ladder Structures Beyond the Harmonic Oscillator (1701.02767v2)

Published 10 Jan 2017 in math-ph, math.FA, and math.MP

Abstract: The development of supersymmetric (SUSY) quantum mechanics has shown that some of the insights based on the algebraic properties of ladder operators related to the quantum mechanical harmonic oscillator carry over to the study of more general systems. At this level of generality, pairs of eigenfunctions of so-called partner Hamiltonians are transformed into each other, but the entire spectrum of any one of them cannot be deduced from this intertwining relationship in general -- except in special cases. In this paper, we present a more general structure that provides all eigenvalues for a class of Hamiltonians that do not factor into a pair of operators satisfying canonical commutation relations. Instead of a pair of partner Hamiltonians, we consider two pairs that differ by an overall shift in their spectrum. This is called coupled supersymmetry. In that case, we also develop coherent states and present some uncertainty principles which generalize the Heisenberg uncertainty principle. Coupled SUSY is explicitly realized by an infinite family of differential operators which admit orthonormal bases of eigenfunctions of generalized harmonic oscillators.

Definition Search Book Streamline Icon: https://streamlinehq.com
References (35)
  1. F. Bagarello. Extended SUSY quantum mechanics, intertwining operators and coherent states. Physics Letters A, 372(41):6226–6231, 2008.
  2. On supersymmetries in nonrelativistic quantum mechanics. J. Math. Phys., 33(1):152–160, 1992.
  3. Generalized deformed oscillators and algebras. In 5th Hellenic School and Workshops on Elementary Particle Physics (CORFU 1995) Corfu, Greece, September 3-24, 1995, 1995.
  4. C. Brif. SU(2) and SU(1,1) algebra eigenstates: A unified analytic approach to coherent and intelligent states. International Journal of Theoretical Physics, 36(7):1651–1682, 1997.
  5. Generalized harmonic oscillator systems and their Fock space description. Phys. Lett., B311:202–206, 1993.
  6. On generalized oscillator algebras and their associated coherent states. ArXiv e-prints, November 2012.
  7. New system-specific coherent states for bound state calculations. Journal of Physics A: Mathematical and Theoretical, 45(50):505302, 2012.
  8. Multidimensional supersymmetric quantum mechanics: A scalar hamiltonian approach to excited states by the imaginary time propagation method. The Journal of Physical Chemistry A, 117(16):3449–3457, 2013. PMID: 23531036.
  9. Multidimensional supersymmetric quantum mechanics: Spurious states for the tensor sector two hamiltonian. The Journal of Physical Chemistry A, 117(16):3442–3448, 2013. PMID: 23531015.
  10. Adiabatic switching approach to multidimensional supersymmetric quantum mechanics for several excited states. Molecular Physics, 110(23):2977–2986, 2012.
  11. Supersymmetry and quantum mechanics. Physics Reports, 251(5):267 – 385, 1995.
  12. J. David and C. Fernandez. Supersymmetric quantum mechanics. AIP Conference Proceedings, 1287(1):3–36, 2010.
  13. A. Galindo and P. Pascual. Quantum Mechanics I. Springer, 1990.
  14. C. C. Gerry. Dynamics of SU(1,1) coherent states. Phys. Rev. A, 31(4):2721–2723, 1985.
  15. K. Gröchenig. Foundations of Time-Frequency Analysis. Birkhäuser, 2000.
  16. H. Haken. Quantum Field Theory of Solids: An Introduction. North-Holland Publishing Company, 1976.
  17. Brian C. Hall. Quantum Theory for Mathematicians. Springer New York Heidelberg Dordrecht London, 2013.
  18. M. R. Kibler and M. Daoud. Generalized coherent states for polynomial Weyl-Heisenberg algebras. In M. Bunoiu, N. Avram, and C. G. Biris, editors, American Institute of Physics Conference Series, volume 1472 of American Institute of Physics Conference Series, pages 60–69, August 2012.
  19. Representations of generalized oscillator algebra. Czechoslovak Journal of Physics, 47(1):41–46, Jan 1997.
  20. Point transformations and relationships among anomalous diffusion, normal diffusion and the central limit theorem. Applied Mathematics, 9:178–197, 2017.
  21. New generalization of supersymmetric quantum mechanics to arbitrary dimensionality or number of distinguishable particles. The Journal of Physical Chemistry A, 114(32):8202–8216, 2010.
  22. Reply to ”comment on ’new generalization of supersymmetric quantum mechanics to arbitrary dimensionality or number of distinguishable particles’”. The Journal of Physical Chemistry A, 115(5):950, 2011.
  23. Supersymmetric quantum mechanics, excited state energies and wave functions, and the rayleigh-ritz variational principle: A proof of principle study. The Journal of Physical Chemistry A, 113(52):15257–15264, 2009.
  24. A General qđť‘žqitalic_q-Oscillator Algebra. ArXiv Mathematics e-prints, January 1998.
  25. V. A. Mandelshtam. Comment on ”new generalization of supersymmetric quantum mechanics to arbitrary dimensionality or number of distinguishable particles”. The Journal of Physical Chemistry A, 115(5):948–949, 2011.
  26. A. Perelomov. Generalized Coherent States and Their Applications. Springer-Verlag Berlin Heidelberg, 1986.
  27. Sumiran Pujari. Quantum oscillator energy spectra for the generalized heisenberg algebra.
  28. M. Reed and B. Simon. Fourier Analysis, Self-Adjointness, volume 2 of Methods of Modern Mathematical Physics. Academic Press, New York, 1975.
  29. M. Reed and B. Simon. Fourier Analysis, Self-Adjointness, volume 1 of Methods of Modern Mathematical Physics. Academic Press, New York, 1980.
  30. N. Sadeghnezhad. A note on coherent states with quantum gravity effects. Chinese Journal of Physics, 54(4):555 – 562, 2016.
  31. J. Schwinger. On angular momentum. In L. C. Biedenharn and H. van Dam, editors, Quantum Theory of Angular Momentum, pages 229–279. Academic Press, New York, 1965.
  32. Fourier and beyond: Invariance properties of a family of fourier-like integral transforms. Journal of Fourier Analysis and Applications, page to appear.
  33. Edward Witten. Supersymmetry and Morse theory. J. Differential Geom., 17(4):661–692 (1983), 1982.
  34. T. Yanagisawa. Supersymmetry and the conductor-insulator transition. Progress of Theoretical Physics, 118(2):229–243, 2007.
  35. Completeness and nonclassicality of coherent states for generalized oscillator algebras. Advances in Mathematical Physics, 2017, 2017.
Citations (11)
View on Semantic Scholar

Summary

We haven't generated a summary for this paper yet.

Ai Sparkles Streamline Icon: https://streamlinehq.com Summarize Now

Whiteboard

Open Problems

We haven't generated a list of open problems mentioned in this paper yet.

Ai Sparkles Streamline Icon: https://streamlinehq.com Generate Now

Continue Learning

We haven't generated follow-up questions for this paper yet.

Ai Sparkles Streamline Icon: https://streamlinehq.com Generate Now

Collections

Sign up for free to add this paper to one or more collections.

User Circle Single Streamline Icon: https://streamlinehq.com Sign Up

Tweets

Sign up for free to view the 1 tweet with 0 likes about this paper.

User Circle Single Streamline Icon: https://streamlinehq.com Sign Up for Free