Citation: | ZHU Jinjie, CHEN Zhen, KONG Chen, LIU Xianbin. The researches on the stochastic dynamics based on the large deviation theory[J]. Advances in Mechanics, 2020, 50(1): 202010. doi: 10.6052/1000-0992-18-021 |
[1] |
陈朕 . 2018. 基于大偏差理论的几类非线性随机系统动力学行为研究. [博士论文]. 南京: 南京航空航天大学
(Chen Z . 2018. Dynamical behaviors of several nonlinear stochastic systems based on the large deviation theory. [PhD Thesis]. Nanjing: Nanjing University of Aeronautics and Astronautics).
|
[2] |
孔琛 . 2018. 噪声扰动下非线性动力系统离出行为研究. [博士论文]. 南京: 南京航空航天大学
(Kong C . 2018. On the exit problems in nonlinear dynamical systems driven by random perturbations. [PhD Thesis]. Nanjing: Nanjing University of Aeronautics and Astronautics).
|
[3] |
孔琛, 刘先斌 . 2014. 受周期和白噪声激励的分段线性系统的吸引域与离出问题研究. 力学学报, 46:447-456
(Kong C, Liu X B . 2014. Research for attracting region and exit problem of a piecewise linear system under periodic and white noise excitations. Chinese Journal of Theoretical and Applied Mechanics, 46: 447-456).
|
[4] |
刘先斌, 陈虬, 陈大鹏 . 1996. 非线性随机动力系统的稳定性和分岔研究. 力学进展, 26:437-452
(Liu X B, Chen Q, Chen D P . 1996. The researches on the stability and bifurcation of nonlinear stochastic dynamical systems. Advances in Mechanics, 26: 437-452).
|
[5] |
孙建桥, 熊夫睿 . 2017. 非线性动力学系统全局分析之外的胞映射方法新发展. 力学进展, 47:150-177
(Sun J Q, Xiong F R . 2017. Cell mapping methods-beyond global analysis of nonlinear dynamic systems. Advances in Mechanics, 47: 150-177).
|
[6] |
徐伟, 孙春艳, 孙建桥, 贺群 . 2013. 胞映射方法的研究和进展. 力学进展, 43:91-100
(Xu W, Sun C Y, Sun J Q, He Q . 2013. Development and study on cell mapping methods. Advances in Mechanics, 43: 91-100).
|
[7] |
徐伟, 岳晓乐, 韩群 . 2017. 胞映射方法及其在非线性随机动力学中的应用. 动力学与控制学报, 15:200-208
(Xu W, Yue X L, Han Q . 2017. Cell mapping method and its applications in nonlinear stochastic dynamical systems. Journal of Dynamics and Control, 15: 200-208).
|
[8] |
许勇, 裴斌, 徐伟 . 2017. 随机平均原理研究若干进展. 动力学与控制学报, 15:193-199
(Xu Y, Pei B, Xu W . 2017. Some recent developments of stochastic averaging principle. Journal of Dynamics and Control, 15: 193-199).
|
[9] |
朱位秋 . 1987. 随机平均法及其应用. 力学进展, 17:342-352
(Zhu W Q . 1987. Stochastic averaging methods and their applications. Advances in Mechanics, 17: 342-352).
|
[10] |
朱位秋 . 1992. 随机振动. 北京: 科学出版社
(Zhu W Q. 1992. Stochastic Vibration. Beijing: Science Press).
|
[11] |
朱位秋 . 2003. 非线性随机动力学与控制——Hamilton理论体系框架. 北京: 科学出版社
(Zhu W Q. 2003. Nonlinear Stochastic Dynamics and Control—the Framework of Hamilton Theory. Beijing: Science Press).
|
[12] |
朱位秋, 蔡国强 . 2017. 随机动力学引论. 北京: 科学出版社
(Zhu W Q, Cai G Q. 2017. Introduction to Stochastic Dynamics. Beijing: Science Press).
|
[13] |
朱金杰 . 2018. 神经元同步、共振及离出问题研究. [博士论文]. 南京: 南京航空航天大学
(Zhu J J . 2018. Synchronization, resonance and exit problem for neuronal dynamical systems. [PhD Thesis]. Nanjing: Nanjing University of Aeronautics and Astronautics).
|
[14] |
Adams D A, Sander L M, Ziff R M. 2010. The barrier method: A technique for calculating very long transition times. Journal of Chemical Physics, 133:124103.
|
[15] |
Agazzi A, Dembo A, Eckmann J P. 2017. Large deviations theory for Markov jump models of chemical reaction networks. Annals of Applied Probability, 28:1821-1855.
|
[16] |
Agranov T, Meerson B. 2018. Narrow Escape of Interacting Diffusing Particles. Physical Review Letters, 120:120601.
|
[17] |
Allen R J, Warren P B, Ten Wolde P R. 2005. Sampling rare switching events in biochemical networks. Physical Review Letters, 94:018104.
|
[18] |
Arnold V I. 1984. Catastrophe Theory. Berlin: Heidelberg: Springer-Verlag.
|
[19] |
Bandrivskyy A, Beri S, Luchinsky D G. 2003 a. Noise-induced shift of singularities in the pattern of optimal paths. Physics Letters A, 314:386-391.
|
[20] |
Bandrivskyy A, Beri S, Luchinsky D G, Mannella R, McClintock P V E. 2003 b. Fast Monte Carlo simulations and singularities in the probability distributions of nonequilibrium systems. Physical Review Letters, 90:210201.
|
[21] |
Ben-Jacob E, Bergman D J, Matkowsky B J, Schuss Z. 1982. Lifetime of oscillatory steady-states. Physical Review A, 26:2805-2816.
|
[22] |
Benzi R, Parisi G, Sutera A, Vulpiani A. 1982. Stochastic resonance in climatic change. Tellus, 34:10-16.
|
[23] |
Benzi R, Sutera A, Vulpiani A. 1981. The mechanism of stochastic resonance. Journal of Physics A: Mathematical and General, 14:L453.
|
[24] |
Beri S, Mannella R, Luchinsky D G, Silchenko A N, McClintock P V E. 2005. Solution of the boundary value problem for optimal escape in continuous stochastic systems and maps. Physical Review E, 72:036131.
|
[25] |
Beri S, Mannella R, McClintock P V E. 2004. Dynamic importance sampling for the escape problem in nonequilibrium systems: Observation of shifts in optimal paths. Physical Review Letters, 92:020601.
|
[26] |
Bernt ?ksendal. 2010. Stochastic Differential Equations. Berlin, Heidelberg: Springer-Verlag.
|
[27] |
Bobrovsky B Z, Schluss Z. 1982. A singular perturbation method for computation of the mean first passage time in a nonlinear filter. SIAM J. Appl. Math., 42:174-187.
|
[28] |
Bouchet F, Laurie J, Zaboronski O. 2014. Langevin dynamics, large deviations and instantons for the quasi-geostrophic model and two-dimensional Euler equations. Journal of Statistical Physics, 156:1066-1092.
|
[29] |
Bray A J, McKane A J. 1989. Instanton calculation of the escape rate for activation over a potential barrier driven by colored noise. Physical Review Letters, 62:493-496.
|
[30] |
Bressloff P, Newby J. 2013. Stochastic models of intracellular transport. Reviews of Modern Physics, 85:135-196.
|
[31] |
Cai R, Chen X, Duan J, Kurths J, Li X. 2017. Lévy noise-induced escape in an excitable system. Journal of Statistical Mechanics: Theory and Experiment, 2017: 063503.
|
[32] |
Cameron M K. 2012. Finding the quasipotential for nongradient SDEs. Physica D: Nonlinear Phenomena, 241:1532-1550.
|
[33] |
Chan H B, Dykman M I, Stambaugh C. 2008. Paths of fluctuation induced switching. Physical Review Letters, 100:130602.
|
[34] |
Chatterjee M, Robert M E. 2001. Noise enhances modulation sensitivity in cochlear implant listeners: Stochastic resonance in a prosthetic sensory system? JARO - Journal of the Association for Research in Otolaryngology, 2:159-171.
|
[35] |
Chen L C, Deng M L, Zhu W Q. 2009. First passage failure of quasi integrable-Hamiltonian systems under combined harmonic and white noise excitations. Acta Mechanica, 206:133-148.
|
[36] |
Chen Z, Li Y, Liu X. 2016. Noise induced escape from a nonhyperbolic chaotic attractor of a periodically driven nonlinear oscillator. Chaos, 26:935-992.
|
[37] |
Chen L, Li Z, Zhuang Q, Zhu W. 2013. First-passage failure of single-degree-of-freedom nonlinear oscillators with fractional derivative. Journal of Vibration and Control, 19:2154-2163.
|
[38] |
Chen Z, Liu X. 2016. Patterns and singular features of extreme fluctuational paths of a periodically driven system. Physics Letters A, 380:1953-1958.
|
[39] |
Chen Z, Liu X. 2017 a. Noise induced transitions and topological study of a periodically driven system. Communications in Nonlinear Science and Numerical Simulation, 48:454-461.
|
[40] |
Chen Z, Liu X. 2017 b. Subtle escaping modes and subset of patterns from a nonhyperbolic chaotic attractor. Physical Review E, 95:012208.
|
[41] |
Chen L, Zhu W Q. 2010 a. First passage failure of quasi non-integrable generalized Hamiltonian systems. Archive of Applied Mechanics, 80:883-893.
|
[42] |
Chen L C, Zhu W Q. 2010 b. Reliability of quasi integrable generalized Hamiltonian systems. Probabilistic Engineering Mechanics, 25:61-66.
|
[43] |
Chen L, Zhu W. 2010 c. First passage failure of dynamical power systems under random perturbations. Science China Technological Sciences, 53:2495-2500.
|
[44] |
Chen Z, Zhu J, Liu X. 2017. Crossing the quasi-threshold manifold of a noise-driven excitable system. Proceedings of the Royal Society A, 473:20170058.
|
[45] |
Cohen J, Lewis R. 1967. A ray method for the asymptotic solution of the diffusion equation. IMA J Appl Math, 3:266-290.
|
[46] |
Crandall M G, Evans L C, Lions P L. 1984. Some properties of viscosity solutions of Hamilton-Jacobi equations. Transactions of the American Mathematical Society, 282:487-502.
|
[47] |
Crandall M G, Lions P L. 1983. Viscosity solutions of Hamilton-Jacobi equations. Transactions of the American Mathematical Society, 277:1-42.
|
[48] |
Crooks G E, Chandler D. 2001. Efficient transition path sampling for nonequilibrium stochastic dynamics. Physical Review E, 64:026109.
|
[49] |
Dahiya D, Cameron M K. 2018. An ordered line integral method for computing the quasi-potential in the case of variable anisotropic diffusion. Physica D: Nonlinear Phenomena, 382-383:33-45.
|
[50] |
Deng M, Zhu W. 2009. Some applications of stochastic averaging method for quasi Hamiltonian systems in physics. Science in China, Series G: Physics, Mechanics and Astronomy, 52:1213-1222.
|
[51] |
Dykman M I. 2010. Poisson-noise-induced escape from a metastable state. Physical Review E, 81:051124.
|
[52] |
Dykman M I, Luchinsky D G, McClintock P V E, Smelyanskiy V N. 1996. Corrals and critical behavior of the distribution of fluctuational paths. Physical Review Letters, 77:5229-5232.
|
[53] |
Dykman M I, McClintock P V E, Smelyanski V N, Stein N D, Stocks N G. 1992. Optimal paths and the prehistory problem for large fluctuations in noise-driven systems. Physical Review Letters, 68:2718-2721.
|
[54] |
Dykman M I, Millonas M M, Smelyanskiy V N. 1994. Observable and hidden singular features of large fluctuations in nonequilibrium systems. Physics Letters A, 195:53-58.
|
[55] |
Einstein A. 1905. On the motion of small particles suspended in liquids at rest required by the molecular-kinetic theory of heat. Annalen der Physik, 322:549-560.
|
[56] |
Ermentrout B. 1996. Type I membranes, phase resetting curves, and synchrony. Neural Computation, 8:979-1001.
|
[57] |
Faradjian A K, Elber R. 2004. Computing time scales from reaction coordinates by milestoning. Journal of Chemical Physics, 120:10880-10889.
|
[58] |
Fenichel N. 1979. Geometric singular perturbation theory for ordinary differential equations. Journal of Differential Equations, 31:53-98.
|
[59] |
Freidlin M I, Wentzell A D. 2012. Random Perturbations of Dynamical Systems. Berlin Heidelberg: Springer.
|
[60] |
Gammaitoni L, H?nggi P, Jung P, Marchesoni F. 1998. Stochastic resonance. Reviews of Modern Physics, 70:223-287.
|
[61] |
Glowacki D R, Paci E, Shalashilin D V. 2009. Boxed molecular dynamics: A simple and general technique for accelerating rare event kinetics and mapping free energy in large molecular systems. Journal of Physical Chemistry B, 113:16603-16611.
|
[62] |
Grafke T, Grauer R, Sch?fer T. 2015. The instanton method and its numerical implementation in fluid mechanics. Journal of Physics A: Mathematical and Theoretical, 48:333001.
|
[63] |
Gu X, Zhu W. 2014. A stochastic averaging method for analyzing vibro-impact systems under Gaussian white noise excitations. Journal of Sound and Vibration, 333:2632-2642.
|
[64] |
Guardia M, Seara T M, Teixeira M A. 2011. Generic bifurcations of low codimension of planar Filippov systems. Journal of Differential Equations, 250:1967-2023.
|
[65] |
Gutkin B S, Jost J, Tuckwell H C. 2009. Inhibition of rhythmic neural spiking by noise: The occurrence of a minimum in activity with increasing noise. Naturwissenschaften, 96:1091-1097.
|
[66] |
Han Q, Xu W, Yue X. 2016. Exit location distribution in the stochastic exit problem by the generalized cell mapping method. Chaos, Solitons and Fractals, 87:302-306.
|
[67] |
Han Q, Xu W, Yue X, Zhang Y. 2015. First-passage time statistics in a bistable system subject to Poisson white noise by the generalized cell mapping method. Communications in Nonlinear Science and Numerical Simulation, 23:220-228.
|
[68] |
Heymann M, Vanden-Eijnden E. 2008. The geometric minimum action method: A least action principle on the space of curves. Communications on Pure and Applied Mathematics, 61:1052-1117.
|
[69] |
Higham D J. 2001. An algorithmic introduction to numerical simulation of stochastic differential equations. SIAM Review, 43:525-546.
|
[70] |
Holcman D, Schuss Z. 2004. Escape through a small opening: Receptor trafficking in a synaptic membrane. Journal of Statistical Physics, 117:975-1014.
|
[71] |
Horsthemke W, Lefever R. 1984. Noise-induced Transitions: Theory and Applications in Physics, Chemistry, and Biology. Berlin: Springer Verlag.
|
[72] |
Huang Y, Liu X. 2012. Stochastic stability of viscoelastic system under non-Gaussian colored noise excitation. Science China: Physics, Mechanics and Astronomy, 55:483-492.
|
[73] |
Huang D, Yang J, Zhang J, Liu H. 2018. An improved adaptive stochastic resonance method for improving the efficiency of bearing faults diagnosis. Journal of Mechanical Engineering Science, 232:2352-2368.
|
[74] |
Ji P, Lu W, Kurths J. 2018. Stochastic basin stability in complex networks. EPL, 122:1-6.
|
[75] |
Khovanov I A, Khovanova N A, McClintock P V E. 2003. Noise-induced failures of chaos stabilization: Large fluctuations and their control. Physical Review E, 67:051102.
|
[76] |
Klosek-Dygas M M, Matkowsky B J, Schuss Z. 2006. Stochastic stability of nonlinear oscillators. SIAM Journal on Applied Mathematics, 48:1115-1127.
|
[77] |
Knessl C, Matkowsky B, Schuss Z, Tier C. 1985. An asymptotic theory of large deviations for Markov jump processes. SIAM Journal on Applied Mathematics, 45:1006-1028.
|
[78] |
Kong C, Gao X, Liu X. 2016. On the global analysis of a piecewise linear system that is excited by a Gaussian white noise. Journal of Computational and Nonlinear Dynamics, 11:051029.
|
[79] |
Kong C, Liu X. 2017. Noise-induced chaos in a piecewise linear system. International Journal of Bifurcation and Chaos, 27:1750137.
|
[80] |
Kougioumtzoglou I A, Spanos P D. 2013. Response and first-passage statistics of nonlinear oscillators via a numerical path integral approach. Journal of Engineering Mechanics, 139:1207-1217.
|
[81] |
Kramers H A. 1940. Brownian motion in a field of force and the diffusion model of chemical reactions. Physica, 7:284-304.
|
[82] |
Kraut S, Feudel U. 2003 a. Enhancement of noise-induced escape through the existence of a chaotic saddle. Physical Review E, 67:015204.
|
[83] |
Kraut S, Feudel U. 2003 b. Noise-induced escape through a chaotic saddle: lowering of the activation energy. Physica D: Nonlinear Phenomena, 181:222-234.
|
[84] |
Kubo R. 1966. The fluctuation-dissipation theorem. Reports on Progress in Physics, 29:255-284.
|
[85] |
Kuznetsov Y A, Rinaldi S, Gragnani A. 2003. One-parameter bifurcations in planar Filippov systems. International Journal of Bifurcation and Chaos, 13:2157-2188.
|
[86] |
Lee DeVille R E, Vanden-Eijnden E, Muratov C B. 2005. Two distinct mechanisms of coherence in randomly perturbed dynamical systems. Physical Review E, 72:31105.
|
[87] |
Li W, Chen L, Trisovic N, Cvekovic A, Zhao J. 2015. First passage of stochastic fractional derivative systems with power-form restoring force. International Journal of Non-Linear Mechanics, 71:83-88.
|
[88] |
Lin Y K, Cai G Q. 1995. Probabilistic Structural Dynamics: Advanced Theory and Applications. Boston: McGraw-Hill.
|
[89] |
Longtin A. 1997. Autonomous stochastic resonance in bursting neurons. Physical Review E, 55:868-876.
|
[90] |
Lu S, He Q, Zhang H, Kong F. 2017. Rotating machine fault diagnosis through enhanced stochastic resonance by full-wave signal construction. Mechanical Systems and Signal Processing, 85:82-97.
|
[91] |
Luchinsky D G, Beri S, Mannella R, McClintock P V E, Khovanov I A. 2002. Optimal fluctuations and the control of chaos. International Journal of Bifurcation and Chaos, 12:583-604.
|
[92] |
Luchinsky D G, Maier R S, Mannella R, McClintock P V E, Stein D L. 1997. Experiments on critical phenomena in a noisy exit problem. Physical Review Letters, 79:3109-3112.
|
[93] |
Luchinsky D G, Maier R S, Mannella R, McClintock P V E, Stein D L. 1999. Observation of saddle-point avoidance in noise-induced escape. Physical Review Letters, 82:1806.
|
[94] |
Luchinsky D G, McClintock P V E. 1997. Irreversibility of classical fluctuations studied in analogue electrical circuits. Nature, 389:463-466.
|
[95] |
Luchinsky D G, McClintock P V E, Dykman M I. 1998. Analogue studies of nonlinear systems. Reports on Progress in Physics, 61:889-997.
|
[96] |
Lücken L, Yanchuk S, Popovych O V, Tass P A. 2013. Desynchronization boost by non-uniform coordinated reset stimulation in ensembles of pulse-coupled neurons. Frontiers in Computational Neuroscience, 7:63.
|
[97] |
Ludwig D. 1975. Persistence of dynamical systems under random perturbations. SIAM Review, 17:605-640.
|
[98] |
Maier R S, Stein D L. 1993 a. Effect of focusing and caustics on exit phenomena in systems lacking detailed balance. Physical Review Letters, 71:1783-1786.
|
[99] |
Maier R S, Stein D L. 1993 b. Escape problem for irreversible systems. Physical Review E, 48:931-938.
|
[100] |
Maier R S, Stein D L. 1996. A scaling theory of bifurcations in the symmetric weak-noise escape problem. Journal of Statistical Physics, 83:291-357.
|
[101] |
Maier R S, Stein D L. 1997. Limiting exit location distributions in the stochastic exit problem. SIAM Journal on Applied Mathematics, 57:752-790.
|
[102] |
Marshall J S. 2016. Analytical solutions for an escape problem in a disc with an arbitrary distribution of exit holes along its boundary. Journal of Statistical Physics, 165:920-952.
|
[103] |
Matkowsky B J, Schuss Z. 1977. The exit problem for randomly perturbed dynamical systems. SIAM Journal on Applied Mathematics, 33:365-382.
|
[104] |
Matkowsky B, Schuss Z. 1982. Diffusion across characteristic boundaries. SIAM Journal on Applied Mathematics, 42:822-834.
|
[105] |
Matkowsky B J, Schuss Z, Ben-Jacob E. 1982. A singular perturbation approach to Kramers' duffusion problem. SIAM Journal on Applied Mathematics, 42:835-849.
|
[106] |
Matkowsky B J, Schuss Z, Tier C. 1984. Uniform expansion of the transition rate in Kramers' problem. Journal of Statistical Physics, 35:443-456.
|
[107] |
Menck P J, Heitzig J, Kurths J, Schellnhuber H J. 2014. How dead ends undermine power grid stability. Nature Communications, 5:3969.
|
[108] |
Menck P J, Heitzig J, Marwan N, Kurths J. 2013. How basin stability complements the linear-stability paradigm. Nature Physics, 9:89-92.
|
[109] |
Muratov C B, Vanden-Eijnden E, E W. 2005. Self-induced stochastic resonance in excitable systems. Physica D: Nonlinear Phenomena, 210:227-240.
|
[110] |
Naeh T, Klosek M M, Matkowsky B J, Schuss Z. 1990. A direct approach to the exit problem. SIAM Journal on Applied Mathematics, 50:595-627.
|
[111] |
Newby J M, Bressloff P C, Keener J P. 2013. Breakdown of fast-slow analysis in an excitable system with channel noise. Physical Review Letters, 111:128101.
|
[112] |
Nolting B C, Abbott K C. 2016. Balls, cups, and quasi-potentials: Quantifying stability in stochastic systems. Ecology, 97:850-864.
|
[113] |
Pei B, Xu Y, Yin G. 2017. Stochastic averaging for a class of two-time-scale systems of stochastic partial differential equations. Nonlinear Analysis, Theory, Methods and Applications, 160:159-176.
|
[114] |
Pikovsky A S, Kurths J. 1997. Coherence resonance in a noise-driven excitable system. Physical Review Letters, 78:775-778.
|
[115] |
Qiao Z, Lei Y, Lin J, Jia F. 2017. An adaptive unsaturated bistable stochastic resonance method and its application in mechanical fault diagnosis. Mechanical Systems and Signal Processing, 84:731-746.
|
[116] |
Reimann P, Schmid G J, H鋘ggi P. 1999. Universal equivalence of mean first-passage time and Kramers rate. Physical Review E, 60:R1-R4.
|
[117] |
Rodrigo G, Stocks N G. 2018. Suprathreshold stochastic resonance behind cancer. Trends in Biochemical Sciences, 43:483-485.
|
[118] |
Roy R V. 1993. Noise perturbations of nonlinear dynamical systems. Computational Stochastic Mechanics, 79:125-148.
|
[119] |
Roy R V. 1994 a. Asymptotic analysis of first-passage problems. International Journal of Non-Linear Mechanics, 32:173-186.
|
[120] |
Roy R V. 1994 b. Noise perturbations of a non-linear system with multiple steady states. International Journal of Non-Linear Mechanics, 29:755-773.
|
[121] |
Roy R V. 1995. Noise-induced transitions in weakly nonlinear oscillators near resonance. Journal of Applied Mechanics, 62:496-504.
|
[122] |
Schuecker J, Diesmann M, Helias M. 2015. Modulated escape from a metastable state driven by colored noise. Physical Review E, 92:052119.
|
[123] |
Schultz P, Menck P J, Heitzig J, Kurths J. 2017. Potentials and limits to basin stability estimation. New Journal of Physics, 19:023005.
|
[124] |
Schuss Z, Matkowsky B. 1979. The exit problem: A new approach to diffusion across potential barriers. SIAM Journal on Applied Mathematics, 36:604-623.
|
[125] |
Schuss Z, Singer A, Holcman D. 2007. The narrow escape problem for diffusion in cellular microdomains. Proceedings of the National Academy of Sciences, 104:16098-16103.
|
[126] |
Schuss Z, Spivak A. 1998. Where is the exit point? Chemical Physics, 235:227-242.
|
[127] |
Sethian J A, Vladimirsky A. 2001. Ordered upwind methods for static Hamilton-Jacobi equations. Proceedings of the National Academy of Sciences, 98:11069-11074.
|
[128] |
Sethian J A, Vladimirsky A. 2003. Ordered upwind methods for static Hamilton-Jacobi equations: Theory and algorithms. SIAM Journal on Numerical Analysis, 41:325-363.
|
[129] |
Sidney Redner. 2001. A Guide to First-Passage Processes. Cambridge: Cambridge University Press.
|
[130] |
Smelyanskiy V N, Dykman M I. 1997. Optimal control of large fluctuations. Physical Review E, 55:2516-2521.
|
[131] |
Smelyanskiy V N, Dykman M I, Maier R S. 1997. Topological features of large fluctuations to the interior of a limit cycle. Physical Review E, 55:2369-2391.
|
[132] |
Spivak A, Schuss Z. 2002 a. Analytical and numerical study of Kramers' exit problem I. Applied Mathematics E-Notes, 2:132-140.
|
[133] |
Spivak A, Schuss Z. 2002 b. The exit distribution on the stochastic separatrix in Kramers' exit problem. SIAM Journal on Applied Mathematics, 62:1698-1711.
|
[134] |
Spivak A, Schuss Z. 2003. Analytical and numerical study of Kramers' exit problem II. Applied Mathematics E-Notes, 3:147-155.
|
[135] |
Stocks N G, Allingham D, Morse R P. 2002. The application of suprathreshold stochastic resonance to cochlear implant coding. Fluctuation and Noise Letters, 02:L169-L181.
|
[136] |
Sun J Q, Hsu C S. 1988. First-passage time probability of non-linear stochastic systems by generalized cell mapping method. Journal of Sound and Vibration, 124:233-248.
|
[137] |
Tél T, Lai Y C. 2010. Quasipotential approach to critical scaling in noise-induced chaos. Physical Review E, 81:56208.
|
[138] |
Tél T, Lai Y C, Gruiz M. 2008. Noise-induced chaos: A consequence of long deterministic transients. International Journal of Bifurcation and Chaos, 18:509-520.
|
[139] |
Touchette H. 2009. The large deviation approach to statistical mechanics. Physics Reports, 478:1-69.
|
[140] |
Tuckwell H C, Jost J. 2012. Analysis of inverse stochastic resonance and the long-term firing of Hodgkin-Huxley neurons with Gaussian white noise. Physica A: Statistical Mechanics and Its Applications, 391:5311-5325.
|
[141] |
Wang J. 2015. Landscape and flux theory of non-equilibrium dynamical systems with application to biology. Advances in Physics, 64:1-137.
|
[142] |
Wang W, Yan Z, Liu X. 2017. The escape problem and stochastic resonance in a bistable system driven by fractional Gaussian noise. Physics Letters A, 381:2324-2336.
|
[143] |
Weber J. 1956. Fluctuation dissipation theorem. Physical Review, 101:1620-1626.
|
[144] |
Wechselberger M, Mitry J, Rinzel J. 2013. Canard theory and excitability. Lecture Notes in Mathematics, 2102: 89-132.
|
[145] |
Wentzell A D, Freidlin M I. 1970. On small random perturbations of dynamical systems. Russian Mathematical Surveys, 25:1-55.
|
[146] |
Whitney H. 1955. On singularities of mappings of Euclidean spaces. I. Mappings of the plane into the plane. Annals of Mathematics, 62:374-410.
|
[147] |
Wuehr M, Boerner J C, Pradhan C , et al. 2017. Stochastic resonance in the human vestibular system - Noise-induced facilitation of vestibulospinal reflexes. Brain Stimulation, 11:261-263.
|
[148] |
Xu M. 2018. First-passage failure of linear oscillator with non-classical inelastic impact. Applied Mathematical Modelling, 54:284-297.
|
[149] |
Xu Y, Guo R, Liu D, Zhang H, Duan J. 2013. Stochastic averaging principle for dynamical systems with fractional brownian motion. Discrete and Continuous Dynamical Systems - Series B (DCDS-B), 19:1197-1212.
|
[150] |
Yang S, Potter S F, Cameron M K. 2019. Computing the quasipotential for nongradient SDEs in 3D. Journal of Computational Physics, 379:325-350.
|
[151] |
Young H P. 2015. The evolution of social norms. Annual Review of Economics, 7:359-387.
|
[152] |
Zhu J, Chen Z, Liu X. 2018. Probability evolution method for exit location distribution. Physics Letters A, 382:771-775.
|
[153] |
Zhu W Q, Huang Z L, Deng M L. 2002. Feedback minimization of first-passage failure of quasi non-integrable Hamiltonian systems. International Journal of Non-Linear Mechanics, 37:1057-1071.
|
[154] |
Zhu W Q, Wu Y J. 2003. First-passage time of Duffing oscillator under combined harmonic and white-noise excitations. Nonlinear Dynamics, 32:291-305.
|