Testing fractal and Markov models of ion channel kinetics.
作者信息
Liebovitch L S
机构信息
Department of Ophthalmology, College of Physicians and Surgeons, Columbia University, New York 10032.
出版信息
Biophys J. 1989 Feb;55(2):373-7. doi: 10.1016/S0006-3495(89)82815-2.
Abstract
摘要
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本文引用的文献
1
Complexity and the relaxation of hierarchical structures.
Phys Rev Lett. 1986 Oct 20;57(16):1965-1969. doi: 10.1103/PhysRevLett.57.1965.
2
Dynamical singularities in ultradiffusion.
Phys Rev A Gen Phys. 1987 Dec 1;36(11):5392-5400. doi: 10.1103/physreva.36.5392.
3
Fractal dimension function for energy levels.
Phys Rev A Gen Phys. 1985 Mar;31(3):1869-1871. doi: 10.1103/physreva.31.1869.
4
Solvent viscosity and protein dynamics.溶剂粘度与蛋白质动力学。
Biochemistry. 1980 Nov 11;19(23):5147-57. doi: 10.1021/bi00564a001.
5
The internal dynamics of globular proteins.球状蛋白质的内部动力学。
CRC Crit Rev Biochem. 1981;9(4):293-349. doi: 10.3109/10409238109105437.
6
Dynamics of proteins: elements and function.蛋白质动力学:要素与功能
Annu Rev Biochem. 1983;52:263-300. doi: 10.1146/annurev.bi.52.070183.001403.
7
Multiple conformational states of proteins: a molecular dynamics analysis of myoglobin.蛋白质的多种构象状态:肌红蛋白的分子动力学分析
Science. 1987 Jan 16;235(4786):318-21. doi: 10.1126/science.3798113.
8
Interpretation of fluorescence decays in proteins using continuous lifetime distributions.使用连续寿命分布解释蛋白质中的荧光衰减。
Biophys J. 1987 Jun;51(6):925-36. doi: 10.1016/S0006-3495(87)83420-3.
9
Statistical discrimination of fractal and Markov models of single-channel gating.单通道门控的分形和马尔可夫模型的统计判别
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10
Fractal models are inadequate for the kinetics of four different ion channels.分形模型不适用于四种不同离子通道的动力学。
Biophys J. 1988 Nov;54(5):859-70. doi: 10.1016/S0006-3495(88)83022-4.
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