scientific edition of Bauman MSTU
SCIENCE & EDUCATION
Bauman Moscow State Technical University. El № FS 77 - 48211. ISSN 1994-0408
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References
1. Albeverio S., Guatteri G., Mazzucchi S. Phase space Feynman path integrals // J. Math. Phys. 2002. V.43, No.6, P.2847-2857.
2. Albeverio S., Hoegh-Krohn R., Mazzucchi S. Mathematical theory of Feynman path integrals: an introduction // Lect. Not. Math. V.523. Berlin, Heidelberg, New York: Springer Verlag, 2008.
3. Albeverio S., Hoegh-Krohn R. Mathematical theory of Feynman path integrals // Lect. Not. Math, V.523. Berlin: Springer, 1976.
4. Berezin F.A. Feynman path integrals in a phase space// Sov.Phys.Usp. 1980. V. 23, No 11, P. 763–788.
5. Berg C., Forst G. Potential Theory on Locally Compact Abelian Groups // Ergeb. Math. Grenzgeb. V.87. Berlin: Springer, 1975.
6. Bock W., Grothaus M. A white noise approach to phase space Feynman path integrals // Theory of Probability and Mathematical Statistics in honor of Anatolij Skorokhod, Volodymyr Korolyuk and Igor Kovalenko, 2012, 27 p. (to appear).
7. Boettcher B., Schilling R.L. Approximation of Feller processes by Markov chains with Levy increments // Stochastics and Dynamics. 2009. V.9. P.71-80.
8. Boettcher B., Butko Ya.A., Schilling R.L., Smolyanov O.G. Feynman formulae and path integrals for some evolutionary semigroups related to tau-quantization // Rus. J. Math. Phys. 2011. V.18, No 4. P. 387-399.
9. Butko Ya.A. Feynman formulas and functional integrals for diffusion with drift in a domain on a manifold // Mat. Notes. 2008. V.83, No 3., P. 301-316.
10. Butko Ya.A. Function integrals corresponding to a solution of the Cauchy-Dirichlet problem for the heat equation in a domain of a Riemannian manifold // J. Math. Sci. 2008. V.151, No1. P. 2629-2638.
11. Butko Ya.A. Formula Feynmana- Katsa- Ito dlya beskonechnomernogo uravneniya Shredingera so skalyarnym i vektornym potentsialami // Nelineynaya dinamika. 2006. V.2, No 1. P. 75-87.
12. Butko Ya.A. Functional Integrals for the Schroedinger Equation on a Compact Riemannian manifold// Math. Notes. 2006. V. 79, No 2, P. 194-200.
13. Butko Ya.A. Formula Feynmana dlya polugrupp s mul'tiplikativno vozmushchennymi generatorami// Nauka i obrazovanie: elektronnoe nauchno-tekhnicheskoe izdanie. 2011. 77-30569/239563.
14. Butko Ya.A., Grothaus M., Smolyanov O.G. Lagrangian Feynman formulae for second order parabolic equations in bounded and unbounded domains // Inf. Dim. Anal. Quant. Probab. Rel. Top. 2010. V.13, No 3. P. 377-392.
15. Butko Ya.A., Grothaus M., Smolyanov O.G. Feynman formula for a class of second order parabolic equations in a bounded domain// Dokl. Math. 2008. V. 78, No 1. P. 590-595.
16. Butko Ya.A., Duryagin A.V. Formuly Feynmana dlya semeystva parabolicheskikh uravneniy, sootvetstvuyushchikh tau-kvantovaniyu kvadratichnoy funktsii Gamil'tona // Nauka i obrazovanie: elektronnoe nauchno-tekhnicheskoe izdanie. 2011. 77-30569/251251.
17. Butko Ya.A., Morozov A.V. Predstavlenie resheniya zadachi Koshi- Neymana dlya parabolicheskogo uravneniya na polupryamoy s pomoshch'yu lagranzhevoy formuly Feynmana // Nauka i obrazovanie: elektronnoe nauchno-tekhnicheskoe izdanie. 2011. 77-30569/246219.
18. Butko Ya.A., Schilling R.L., Smolyanov O.G. Lagrangian and Hamiltonian Feynman formulae for some Feller semigroups and their perturbations // Inf. Dim. Anal. Quant. Probab. Rel. Top. 2012 (to appear).
19. Butko Ya.A., Schilling R.L., Smolyanov O.G. Hamiltonian Feynman- Kac and Feynman formulae for dynamics of particles with position-dependent mass // Int. J. Theor. Phys. 2011. V.50, P.2009-2018.
20. Butko Ya.A., Smolyanov O.G. Formuly Feynmana v stokhasticheskoy i kvantovoy dinamike // Sovremennye problemy matematiki i mekhaniki. 2011. V. 6, No 1. P.61-75.
21. Butko Ya.A., Smolyanov O.G., Shilling R.L. Feynman formulae for Feller semigroups// Dokl. Math. 2010. V. 82, No 2. P. 697-683.
22. Carmona R., Masters W.Ch., Simon B. Relativistic Schroedinger Operators: Asymptotic Behavior of the Eigenfunctions // J. Func. Anal. 1990. V. 91. P. 117-142.
23. Cartier P. De Witt-Morette C. Functional integration: action and symmetries. Cambridge Uni. Press, 2006.
24. Chernoff P. Product formulas, nonlinear semigroups and addition of unbounded operators // Mem. Am. Math. Soc. 1974. V.140.
25. Courrege Ph. Sur la forme integro-differentielle des operateurs de C¥K dans C satisfaisant au principe du maximum // Seminaire de Theorie du Potentiel. 1965/66. V.2, 38 p.
26. Daubechies I., Klauder J.R. Quantum-mechanical path integrals with Wiener measure for all polynomial Hamiltonians. II // J. Math. Phys. 1985. V.26, No 9. P. 2239-2256.
27. De Witt-Morette C., Maheshwari A., Nelson B. Path integration in non-relativistic quantum mechanics // Phys. Rep. 1979. V. 50, No 5. P. 255-372.
28. De Witt-Morette C. Feynman path integrals // Commun. Math. Phys. 1974. V. 37. P. 63-81.
29. Dorroh J.R. Contraction semi-groups in a function space // Pacific J.Math. 1966. V. 19, No 1. P. 35-38.
30. Duryagin A.V. Formuly Feynmana dlya parabolicheskogo uravneniya vtorogo poryadka i ikh primenenie / Kvalifikatsionnaya rabota bakalavra. MGTU im. N.E. Baumana. 2010 g. 49 P.
31. Elworthy D., Truman A. Feynman maps, Cameron-Martin formulae and anharmonic oscillators// Ann. Inst. Henri Poincare, Physique theorique. 1984. V.41, No 2. P. 115-142.
32. Ethier S.E., Kurtz T.G. Markov Processes: Characterization and Convergence. Ser. Probab. Math. Stat. New York: Wiley, 1986.
33. Feynman R.P. Space-time approach to nonrelativistic quantum mechanics // Rev. Mod. Phys. 1948. V. 20. P. 367-387.
34. Feynman R.P. An Operator Calculus Having Applications in Quantum Electrodynamics // Phys. Rev. 1951. V. 84. P. 108-128.
35. Gadella M., Smolyanov O.G. Feynman Formulas for Particles with Position-Dependent Mass // Dokl. Math. 2007. V. 77, No 1. P. 120-123.
36. Garrod C. Hamiltonian path integral methods // Rev. Mod. Phys. 1966. V. 38, No 3. P. 483-494.
37. Gel'fand I.M., Yaglom A.M. Integrirovanie v funktsional'nykh prostranstvakh i ego primeneniya v kvantovoy fizike // Uspekhi matematicheskikh nauk. 1956. V. 11, No 1. P. 77-114.
38. Hida T., Streit L. Generalized Brownian functionals and the Feynman integral // Stochastic Processes and Their Appl. 1983. V. 16. P. 55-69.
39. Hiroshima F., Ichinose T., Lorinczi J. Path integral representation for Schroedinger operators with Bernstein functions of the Laplacian // arXiv:0906.0103v4.
40. Hwang I.L. The L2-boundness of pseudodifferential operators // Trans. A.M.S. 1987. V. 302, No 1. P. 55-76.
41. Ichinose T., Tamura H. Imaginary-time integral for a relativistic spinless particle in an electromagnetic field // Commun. Math. Phys. 1986. V. 105. P. 239-257.
42. Ichinose W. The phase space Feynman path integral with gauge invariance and its convergence // Rev. Math. Phys. 2000. V. 12. P. 1451-1463.
43. Jacob N. Characteristic functions and symbols in the theory of Feller processes // Potential Anal. 1998. V. 8. P. 61-68.
44. Jacob N. Pseudo-differential operators and Markov processes. V.1-3. Imperial College Press, 2001.
45. Jacob N., Potrykus A. Roth's Method Applied to Some Pseudo-Differential Operators with Bounded Symbols. A Case Study // Rendiconti del Circ. Mat. di Palermo. 2005. Ser. II, No 76. P. 45-57.
46. Jacob N., Schilling R.L. Levy-type processes and pseudo differential operators // O. Barndorff-Nielsen, T. Mikosch, S. Resnick (eds.): Levy processes: theory and applications. Boston: Birkhäuser, 2001. P. 139-167.
47. Karatzas I., Shreve S. Brownian Motion and Stochastic Calculus. Springer. 1991.
48. Kitada H., Kumano-go H. A family of Fourier integral operators and the fundamental solution for a Schroedinger equation // Osaka J. Math. 1981. V. 18. P. 291-360.
49. Kumano-go N. A Hamiltonian path integral for a degenerate parabolic pseudo-differential operators// J. Math. Sci. Univ. Tokyo. 1996. V. 3. P. 57-72.
50. Kumano-go N., Fujiwara D. Phase space Feynman path integrals via piecewise bicharacteristic paths and their semiclassical approximations // Bull. Sci. math. 2008. V. 132. P. 313-357.
51. Maslov V.P. Kompleksnye markovskie tsepi i kontinual'nyy integral Feynmana. Moskva: Nauka, 1976.
52. Morozov A.V. Lagranzhevy formuly Feynmana dlya zadach Koshi- Dirikhle i Koshi- Neymana dlya parabolicheskogo uravneniya na polupryamoy / Kvalifikatsionnaya rabota bakalavra. MGTU im. N.E. Baumana. 2011. 42 p.
53. Nelson E. Feynman integrals and the Schrödinger equation // J. Math. Phys. 1964. V. 3. P. 332-343.
54. Obrezkov O.O. The Proof of the Feynman-Kac Formula for Heat Equation on a Compact Riemannian Manifold // IDAQP. 2003. V. 6, No 2. P. 311-320.
55. Obrezkov O.O., Smolyanov O.G., Truman A. The Generalized Chernoff Theorem and Randomized Feynman Formula // Dokl. Math. 2005. V.71, No 1. P. 105-110.
56. Reed M., Simon B. Methods of Modern Mathematical Physics. V. I. Academic Press, 1980.
57. Sakbaev V.G., Smolyanov O.G. Dynamics of a Quantum Particle with Discontinuous Position-Dependent Mass // Dokl. Math. 2010. V. 82, No 1. P. 630-634.
58. Sato K. Levy Processes and Infinitely Divisible Distributions // Cambridge Univ. Press, 1999.
59. Schilling R.L. Conservativeness of semigroups generated by pseudo differential operators // Potential Anal. 1998. V. 9. P. 91-104.
60. Schilling R.L., Schnurr A. The symbol associated with the solution of a stochastic differential equation // El. J. Probab. 2010. V. 15. P. 1369-1393.
61. Smolyanov O.G. Feynman type formulae for quantum evolution and diffusion on manifolds and graphs // Quant. Bio-Informatics, World Sc. 2010. V. 3. P. 337-347.
62. Smolyanov O.G., Shamarov N.N. Hamiltonian Feynman Integrals for Equations with the Vladimirov Operator // Dokl. Math. 2010. V. 81, No 2. P. 209-214.
63. Smolyanov O.G., Shavgulidze E.T. Kontinual'nye integraly. M.: Izd-vo MGU, 1990.
64. Smolyanov O.G., Shavgulidze E.T. The support of symplectic Feynman measure and uncertainty principle (in Russian)// Dokl. Acad. Nauk USSR. 1992. V. 323, No 6. P. 1038-1042.
65. Smolyanov O.G., Tokarev A.G., Truman A. Hamiltonian Feynman path integrals via the Chernoff formula // J. Math. Phys. 2002. V. 43, No 10. P. 5161-5171.
66. Smolyanov O.G., Truman A. Change of variable formulas for Feynman pseudomeasures // Theor. Math. Phys. 1999. V. 119, No 3. P. 677-686.
67. Smolyanov O.G., von Weizsaecker H., Wittich O. Smooth probability measures and associated differential operators // Inf. Dim. Anal. Quant. Probab. 1999. V. 2, No 1. P. 51-78.
68. Smolyanov O.G., Weizsäcker H.V., Wittich O. Diffusion on compact Riemannian manifolds, and surface measures // Dokl. Math. 2000. V. 61. P. 230-234.
69. Smolyanov O.G., Weizsäcker H.V., Wittich O. Brownian Motion on a Manifold as Limit of Stepwise Conditioned Standard Brownian Motions // Stochastic Proceses, Physics and Geometry: New Interplays. II: A Volume in Honor of Sergio Albeverio. Ser. Conference Proceedings. Canadian Math. Society. Providence: AMS. 2000. V. 29. P. 589-602.
70. Smolyanov O.G., von Weizsäcker H., Wittich O. Chernoff's theorem and the construction of semigroups // Evolution Equations: Applications to Physics, Industry, Life Sciences and Economics. Proc. 7th Intnl. Conf. Evolution Eqs and Appl., Levico Terme, Italy, Oct./Nov. 2000. Birkhäuser, Prog. Nonlinear Differ. Eq. Appl. 2003. V. 55. P.349-358.
71. Smolyanov O.G., Weizsäcker H.V., Wittich H.V. Surface Measures and Initial Boundary Value Problems Generated by Diffusions with Drift // Dokl. Math. 2007. V.76, No 1. P. 606-610.
72. Smolyanov O.G., Weizsäcker H.V., Wittich O. Chernoff's Theorem and Discrete Time Approximations of Brownian Motion on Manifolds // Potent. Anal. 2007. V. 26, No 1. P. 1-29.
73. Smolyanov O.G., Khrennikov A.Yu. Central limit theorem for generalized measures on rigged Hilbert spaces // Soviet Math. Dokl. 1985. V. 31. P.301-304.
Publications with keywords: Feynman formula, approximation of transitional probabilities, equation of evolution, evolution semigroups, Feynman-Kac formulae, phase space Feynman path integrals, Hamiltonian Feynman pseudomeasure, Feller semigroups, Weyl quantization
Publications with words: Feynman formula, approximation of transitional probabilities, equation of evolution, evolution semigroups, Feynman-Kac formulae, phase space Feynman path integrals, Hamiltonian Feynman pseudomeasure, Feller semigroups, Weyl quantization
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