Fractional quantum mechanics
In physics, fractional quantum mechanics is a generalization of standard quantum mechanics, which naturally comes out when the Brownian-like quantum paths substitute with the Lévy-like ones in the Feynman path integral. This concept was discovered by Nick Laskin who coined the term fractional quantum mechanics.[1]
Fundamentals
Standard quantum mechanics can be approached in three different ways: the matrix mechanics, the Schrödinger equation and the Feynman path integral.
The Feynman path integral[2] is the path integral over Brownian-like quantum-mechanical paths. Fractional quantum mechanics has been discovered by Nick Laskin (1999) as a result of expanding the Feynman path integral, from the Brownian-like to the Lévy-like quantum mechanical paths. A path integral over the Lévy-like quantum-mechanical paths results in a generalization of quantum mechanics.[3] If the Feynman path integral leads to the well known Schrödinger equation, then the path integral over Lévy trajectories leads to the fractional Schrödinger equation.[4] The Lévy process is characterized by the Lévy index α, 0 < α ≤ 2. At the special case when α = 2 the Lévy process becomes the process of Brownian motion. The fractional Schrödinger equation includes a space derivative of fractional order α instead of the second order (α = 2) space derivative in the standard Schrödinger equation. Thus, the fractional Schrödinger equation is a fractional differential equation in accordance with modern terminology.[5] This is the key point to launch the term fractional Schrödinger equation and more general term fractional quantum mechanics. As mentioned above, at α = 2 the Lévy motion becomes Brownian motion. Thus, fractional quantum mechanics includes standard quantum mechanics as a particular case at α = 2. The quantum-mechanical path integral over the Lévy paths at α = 2 becomes the well-known Feynman path integral and the fractional Schrödinger equation becomes the well-known Schrödinger equation.
Fractional Schrödinger equation
The fractional Schrödinger equation discovered by Nick Laskin has the following form (see, Refs.[1,3,4])
using the standard definitions:
- r is the 3-dimensional position vector,
- ħ is the reduced Planck constant,
- ψ(r, t) is the wavefunction, which is the quantum mechanical function that determines the probability amplitude for the particle to have a given position r at any given time t,
- V(r, t) is a potential energy,
- Δ = ∂2/∂r2 is the Laplace operator.
Further,
- Dα is a scale constant with physical dimension [Dα] = [energy]1 − α·[length]α[time]−α, at α = 2, D2 =1/2m, where m is a particle mass,
- the operator (−ħ2Δ)α/2 is the 3-dimensional fractional quantum Riesz derivative defined by (see, Refs.[3, 4]);
Here, the wave functions in the position and momentum spaces; and are related each other by the 3-dimensional Fourier transforms:
The index α in the fractional Schrödinger equation is the Lévy index, 1 < α ≤ 2.
Fractional quantum mechanics in solid state systems
The effective mass of states in solid state systems can depend on the wave vector k, i.e. formally one considers m=m(k). Polariton Bose-Einstein condensate modes are examples of states in solid state systems with mass sensitive to variations and locally in k fractional quantum mechanics is experimentally feasible.
See also
- Quantum mechanics
- Matrix mechanics
- Fractional calculus
- Fractional dynamics
- Fractional Schrödinger equation
- Non-linear Schrödinger equation
- Path integral formulation
- Relation between Schrödinger's equation and the path integral formulation of quantum mechanics
- Lévy process
References
- Laskin, Nikolai (2000). "Fractional quantum mechanics and Lévy path integrals". Physics Letters A. 268 (4–6): 298–305. arXiv:hep-ph/9910419. doi:10.1016/S0375-9601(00)00201-2.
- R. P. Feynman and A. R. Hibbs, Quantum Mechanics and Path Integrals ~McGraw-Hill, New York, 1965
- Laskin, Nick (1 August 2000). "Fractional quantum mechanics". Physical Review E. American Physical Society (APS). 62 (3): 3135–3145. arXiv:0811.1769. Bibcode:2000PhRvE..62.3135L. doi:10.1103/physreve.62.3135. ISSN 1063-651X.
- Laskin, Nick (18 November 2002). "Fractional Schrödinger equation". Physical Review E. American Physical Society (APS). 66 (5): 056108. arXiv:quant-ph/0206098. Bibcode:2002PhRvE..66e6108L. doi:10.1103/physreve.66.056108. ISSN 1063-651X. PMID 12513557.
- S. G. Samko, A. A. Kilbas, and O. I. Marichev, Fractional Integrals and Derivatives, Theory and Applications ~Gordon and Breach, Amsterdam, 1993
- Samko, S.; Kilbas, A.A.; Marichev, O. (1993). Fractional Integrals and Derivatives: Theory and Applications. Taylor & Francis Books. ISBN 978-2-88124-864-1.
- Kilbas, A. A.; Srivastava, H. M.; Trujillo, J. J. (2006). Theory and Applications of Fractional Differential Equations. Amsterdam, Netherlands: Elsevier. ISBN 978-0-444-51832-3.
- Herrmann, R. (2014). Fractional Calculus - An Introduction for Physicists. Singapore: World Scientific. doi:10.1142/8934. ISBN 978-981-4551-07-6.
- Laskin, N. (2018). Fractional Quantum Mechanics. World Scientific. CiteSeerX 10.1.1.247.5449. doi:10.1142/10541. ISBN 978-981-322-379-0.
- Pinsker, F.; Bao, W.; Zhang, Y.; Ohadi, H.; Dreismann, A.; Baumberg, J. J. (25 November 2015). "Fractional quantum mechanics in polariton condensates with velocity-dependent mass". Physical Review B. American Physical Society (APS). 92 (19): 195310. arXiv:1508.03621. doi:10.1103/physrevb.92.195310. ISSN 1098-0121.
Further reading
- Amaral, R L P G do; Marino, E C (7 October 1992). "Canonical quantization of theories containing fractional powers of the d'Alembertian operator". Journal of Physics A: Mathematical and General. IOP Publishing. 25 (19): 5183–5200. doi:10.1088/0305-4470/25/19/026. ISSN 0305-4470.
- He, Xing-Fei (15 December 1990). "Fractional dimensionality and fractional derivative spectra of interband optical transitions". Physical Review B. American Physical Society (APS). 42 (18): 11751–11756. doi:10.1103/physrevb.42.11751. ISSN 0163-1829.
- Iomin, Alexander (28 August 2009). "Fractional-time quantum dynamics". Physical Review E. American Physical Society (APS). 80 (2): 022103. arXiv:0909.1183. doi:10.1103/physreve.80.022103. ISSN 1539-3755.
- Matos-Abiague, A (5 December 2001). "Deformation of quantum mechanics in fractional-dimensional space". Journal of Physics A: Mathematical and General. IOP Publishing. 34 (49): 11059–11068. arXiv:quant-ph/0107062. doi:10.1088/0305-4470/34/49/321. ISSN 0305-4470.
- Laskin, Nick (2000). "Fractals and quantum mechanics". Chaos: An Interdisciplinary Journal of Nonlinear Science. AIP Publishing. 10 (4): 780. doi:10.1063/1.1050284. ISSN 1054-1500.
- Naber, Mark (2004). "Time fractional Schrödinger equation". Journal of Mathematical Physics. AIP Publishing. 45 (8): 3339–3352. arXiv:math-ph/0410028. doi:10.1063/1.1769611. ISSN 0022-2488.
- Tarasov, Vasily E. (2008). "Fractional Heisenberg equation". Physics Letters A. Elsevier BV. 372 (17): 2984–2988. arXiv:0804.0586v1. doi:10.1016/j.physleta.2008.01.037. ISSN 0375-9601.
- Tarasov, Vasily E. (2008). "Weyl quantization of fractional derivatives". Journal of Mathematical Physics. AIP Publishing. 49 (10): 102112. arXiv:0907.2699. doi:10.1063/1.3009533. ISSN 0022-2488.
- Wang, Shaowei; Xu, Mingyu (2007). "Generalized fractional Schrödinger equation with space-time fractional derivatives". Journal of Mathematical Physics. AIP Publishing. 48 (4): 043502. doi:10.1063/1.2716203. ISSN 0022-2488.
- de Oliveira, E Capelas; Vaz, Jayme (5 April 2011). "Tunneling in fractional quantum mechanics". Journal of Physics A: Mathematical and Theoretical. IOP Publishing. 44 (18): 185303. arXiv:1011.1948. doi:10.1088/1751-8113/44/18/185303. ISSN 1751-8113.
- Tarasov, Vasily E. (2010). "Fractional Dynamics of Open Quantum Systems". Nonlinear Physical Science. Berlin, Heidelberg: Springer Berlin Heidelberg. pp. 467–490. doi:10.1007/978-3-642-14003-7_20. ISBN 978-3-642-14002-0. ISSN 1867-8440.
- Tarasov, Vasily E. (2010). "Fractional Dynamics of Hamiltonian Quantum Systems". Nonlinear Physical Science. Berlin, Heidelberg: Springer Berlin Heidelberg. pp. 457–466. doi:10.1007/978-3-642-14003-7_19. ISBN 978-3-642-14002-0. ISSN 1867-8440.