Fractional Langevin type equations for white noise distributions
-
Un Cig Ji
,
Mi Ra Lee
Abstract
In this paper, by applying the intertwining properties, we introduce the fractional powers of the number operator perturbed by generalized Gross Laplacians (infinite dimensional Laplacians), which are special types of the infinitesimal generators of generalized Mehler semigroups. By applying the intertwining properties and semigroup approach, we study the Langevin type equations associated with the infinite dimensional Laplacians and with white noise distributions as forcing terms. Then we investigate the unique solution of the fractional Langevin type equations associated with the Riemann-Liouville and Caputo time fractional derivatives, and the fractional power of the infinite dimensional Laplacians, for which we apply the intertwining properties again. For our purpose, we discuss the fractional integrals and fractional derivatives of white noise distribution valued functions.
Acknowledgements
This work is supported by Basic Science Research Program through the NSF funded by the MEST (NRF-2016R1D1A1B01008782).
References
[1] V.I. Bogachev, M. Röckner, B. Schmuland, Generalized Mehler semigroups and applications. Probab. Theory Related Fields 105, No 2 (1996), 193–225.10.1007/BF01203835Suche in Google Scholar
[2] D.M. Chung, T.S. Chung, U.C. Ji, A simple proof of analytic characterization theorem for operator symbols. Bull. Korean Math. Soc. 34, No 3 (1997), 421–436.Suche in Google Scholar
[3] D.M. Chung, U.C. Ji, Transforms on white noise functionals with their applications to Cauchy problems. Nagoya Math. J. 147 (1997), 1–23.10.1017/S0027763000006292Suche in Google Scholar
[4] D.M. Chung, U.C. Ji, Transformation groups on white noise functionals and their applications. Appl. Math. Optim. 37, No 2 (1998), 205–223.10.1007/s002459900074Suche in Google Scholar
[5] D.M. Chung, U.C. Ji, Some Cauchy problems in white noise analysis and associated semigroups of operators. Stochastic Anal. Appl. 17, No 1 (1999), 1–22.10.1080/07362999908809585Suche in Google Scholar
[6] W.G. Cochran, H.-H. Kuo, A. Sengupta, A new class of white noise generalized functions. Infin. Dimens. Anal. Quantum Probab. Relat. Top. 1, No 1 (2014), # 9800005.Suche in Google Scholar
[7] J.L. Da Silva, M. Erraoui, H. Ouerdiane, Generalized fractional evolution equation. Fract. Calc. Appl. Anal. 10, No 2 (2007), 375–398.Suche in Google Scholar
[8] M.M. Djrbashian, Harmonic Analysis and Boundary Value Problems in the Complex Domain. Birkhäuser Verlag, Basel (1993).10.1007/978-3-0348-8549-2Suche in Google Scholar
[9] M. Fuhrman, M. Röckner, Generalized Mehler semigroups: the non-Gaussian case. Potential Anal. 12, No 1 (2000), 1–47.10.1023/A:1008644017078Suche in Google Scholar
[10] L. Gross, Potential theory on Hilbert space. J. Funct. Anal. 1 (1967), 123–181.10.1016/0022-1236(67)90030-4Suche in Google Scholar
[11] P. Guo, C.B. Zeng, C.P. Li, Y.Q. Chen, Numerics for the fractional Langevin equation driven by the fractional Brownian motion. Fract. Calc. Appl. Anal. 16, No 1 (2013), 123–141; DOI: 10.2478/s13540-013-0009-8; https://www.degruyter.com/journal/key/FCA/16/1/html.Suche in Google Scholar
[12] T. Hida, Analysis of Brownian Functionals. Carleton Math. Lect. Notes, No. 13, Carleton University, Ottawa (1975).Suche in Google Scholar
[13] T. Hida, Brownian Motion. Springer-Verlag (1980).10.1007/978-1-4612-6030-1Suche in Google Scholar
[14] T. Hida, H.-H. Kuo, J. Potthoff, L. Streit, White Noise: An Infinite Dimensional Calculus. Kluwer Academic Publishers (1993).10.1007/978-94-017-3680-0Suche in Google Scholar
[15] T. Hida, N. Obata, K. Saitô, Infinite dimensional rotations and Laplacians in terms of white noise calculus. Nagoya Math. J. 128, (1992), 65–93.10.1017/S0027763000004220Suche in Google Scholar
[16] R.L. Hudson, K.R. Parthasarathy, Quantum Ito's formula and stochastic evolutions. Commun. Math. Phys. 93, No 3 (1984), 301–323.10.1007/BF01258530Suche in Google Scholar
[17] U.C. Ji, M.R. Lee, P.C. Ma, Generalized Mehler semigroup on white noise functionals and white noise evolution equations. Mathematics 8, No 6 (2020), # 1025.10.3390/math8061025Suche in Google Scholar
[18] U.C. Ji, N. Obata, Initial value problem for white noise operators and quantum stochastic processes. In: Infinite Dimensional Harmonic Analysis, Kyoto (1999) 203–216, Gräbner, Altendorf (2000).Suche in Google Scholar
[19] A.A. Kilbas, H.M. Srivastava, J.J. Trujillo, Theory and Applications of Fractional Differential Equations. North-Holland Math. Studies 204, Elsevier Science B.V., Amsterdam (2006).Suche in Google Scholar
[20] R. Kubo, The fluctuation-dissipation theorem. Rep. Prog. Phys. 29, No 1 (1966), # 255.10.1088/0034-4885/29/1/306Suche in Google Scholar
[21] I. Kubo, S. Takenaka, Calculus on Gaussian white noise I–IV. Proc. Japan Acad. 56, No 9 (1980), 376–380; No 8(1980), 411–416; 57, No 9 (1981), 433–437; 58, No 5 (1982), 186–189.Suche in Google Scholar
[22] H.-H. Kuo, On Laplacian operators of generalized Brownian functionals. In: Stochastic Processes and Applications (K. Ito and T. Hida, Eds.), Lect. Notes in Math. 1203, Springer-Verlag, Berlin (1986), 119–128.10.1007/BFb0076877Suche in Google Scholar
[23] H.-H. Kuo, Stochastic partial differential equations of generalized Brownian functionals. In: Stochastic Partial Differential Equations and Applications, II, Lect. Notes in Math. 1390, Springer-Verlag, Berlin (1989), 138–146.10.1007/BFb0083942Suche in Google Scholar
[24] H.-H. Kuo, White Noise Distribution Theory. CRC Press (1996).Suche in Google Scholar
[25] P. Langevin, Sur la théorie du mouvement brownien. C. R. Acad. Sci. Paris 146 (1908), 530–533.Suche in Google Scholar
[26] S.H. Lim, J. Wehr, M. Lewenstein, Homogenization for generalized Langevin equations with applications to anomalous diffusion. Ann. Henri Poincaré 21, No 6 (2020), 1813–1871.10.1007/s00023-020-00889-2Suche in Google Scholar
[27] X. Meng, E. Nane, Space-time fractional stochastic partial differential equations with Lévy noise. Fract. Calc. Appl. Anal. 23, No 1 (2020), 224–249; DOI: 10.1515/fca-2020-0009; https://www.degruyter.com/journal/key/FCA/23/1/html.Suche in Google Scholar
[28] N. Obata, Rotation-invariant operators on white noise functionals. Math. Z. 210, No 1 (1992), 69–89.10.1007/BF02571783Suche in Google Scholar
[29] N. Obata, An analytic characterization of symbols of operators on white noise functionals. J. Math. Soc. Japan 45, No 3 (1993), 421–445.Suche in Google Scholar
[30] N. Obata, White Noise Calculus and Fock Space. Lect. Notes in Math. 1577, Springer-Verlag (1994).10.1007/BFb0073952Suche in Google Scholar
[31] N. Obata, Constructing one-parameter transformations on white noise functions in terms of equicontinuous generators. Monatsh. Math. 124, No 4 (1997), 317–335.10.1007/BF01319042Suche in Google Scholar
[32] N. Obata, Wick product of white noise operators and quantum stochastic differential equations. J. Math. Soc. Japan 51, No 3 (1999), 613–641.Suche in Google Scholar
[33] M.A. Piech, Parabolic equations associated with the number operator. Trans. Amer. Math. Soc. 194 (1974), 213–222.10.1090/S0002-9947-1974-0350231-3Suche in Google Scholar
[34] I. Podlubny, Fractional Differential Equations. Mathematics in Science and Engineering 198, Academic Press, San Diego, CA (1999).Suche in Google Scholar
[35] J. Potthoff, L. Streit, A characterization of Hida distributions. J. Funct. Anal. 101, No 1 (1991), 212–229.10.1016/0022-1236(91)90156-YSuche in Google Scholar
[36] H. Rguigui, Fractional number operator and associated fractional diffusion equations. Math. Phys. Anal. Geom. 21, No 1 (2018), 1–17.10.1007/s11040-017-9261-1Suche in Google Scholar
[37] M. Sachs, B. Leimkuhler, V. Danos, Langevin dynamics with variable coefficients and nonconservative forces: from stationary states to numerical methods. Entropy 19 (2017), # 647.10.3390/e19120647Suche in Google Scholar
[38] S. Samko, A. Kilbas, O. Marichev, Fractional Integrals and Derivatives: Theory and Applications. Gordon and Breach, Yverdon (1993).Suche in Google Scholar
[39] T. Sandev, R. Metzler, Ž. Tomovski, Velocity and displacement correlation functions for fractional generalized Langevin equations. Fract. Calc. Appl. Anal. 15, No 3 (2012), 426–450; DOI: 10.2478/s13540-012-0031-2; https://www.degruyter.com/journal/key/FCA/15/3/html.Suche in Google Scholar
[40] L. Yan, X. Yin, Large deviation principle for a space-time fractional stochastic heat equation with fractional noise. Fract. Calc. Appl. Anal. 21, No 2 (2018), 462–485; DOI: 10.1515/fca-2018-0026; https://www.degruyter.com/journal/key/FCA/21/2/html.Suche in Google Scholar
[41] K. Yosida, Functional Analysis. Springer-Verlag, Berlin (1965).10.1007/978-3-662-25762-3Suche in Google Scholar
© 2021 Diogenes Co., Sofia
Artikel in diesem Heft
- Frontmatter
- Editorial
- FCAA related news, events and books (FCAA–volume 24–4–2021)
- Research Paper
- Three representations of the fractional p-Laplacian: Semigroup, extension and Balakrishnan formulas
- Tutorial paper
- The bouncing ball and the Grünwald-Letnikov definition of fractional derivative
- Research Paper
- Fractional diffusion-wave equations: Hidden regularity for weak solutions
- Censored stable subordinators and fractional derivatives
- Variational methods to the p-Laplacian type nonlinear fractional order impulsive differential equations with Sturm-Liouville boundary-value problem
- Multivariable fractional-order PID tuning by iterative non-smooth static-dynamic H∞ synthesis
- Filter regularization method for a nonlinear Riesz-Feller space-fractional backward diffusion problem with temporally dependent thermal conductivity
- The rate of convergence on fractional power dissipative operator on compact manifolds
- Fractional Langevin type equations for white noise distributions
- Local existence and non-existence for a fractional reaction–diffusion equation in Lebesgue spaces
- Maximum principles and applications for fractional differential equations with operators involving Mittag-Leffler function
- The Crank-Nicolson type compact difference schemes for a loaded time-fractional Hallaire equation
- Robust fractional-order perfect control for non-full rank plants described in the Grünwald-Letnikov IMC framework
- Properties of the set of admissible “state control” pair for a class of fractional semilinear evolution control systems
Artikel in diesem Heft
- Frontmatter
- Editorial
- FCAA related news, events and books (FCAA–volume 24–4–2021)
- Research Paper
- Three representations of the fractional p-Laplacian: Semigroup, extension and Balakrishnan formulas
- Tutorial paper
- The bouncing ball and the Grünwald-Letnikov definition of fractional derivative
- Research Paper
- Fractional diffusion-wave equations: Hidden regularity for weak solutions
- Censored stable subordinators and fractional derivatives
- Variational methods to the p-Laplacian type nonlinear fractional order impulsive differential equations with Sturm-Liouville boundary-value problem
- Multivariable fractional-order PID tuning by iterative non-smooth static-dynamic H∞ synthesis
- Filter regularization method for a nonlinear Riesz-Feller space-fractional backward diffusion problem with temporally dependent thermal conductivity
- The rate of convergence on fractional power dissipative operator on compact manifolds
- Fractional Langevin type equations for white noise distributions
- Local existence and non-existence for a fractional reaction–diffusion equation in Lebesgue spaces
- Maximum principles and applications for fractional differential equations with operators involving Mittag-Leffler function
- The Crank-Nicolson type compact difference schemes for a loaded time-fractional Hallaire equation
- Robust fractional-order perfect control for non-full rank plants described in the Grünwald-Letnikov IMC framework
- Properties of the set of admissible “state control” pair for a class of fractional semilinear evolution control systems
