您好,欢迎来到读书世界   登录  免费注册
书名 作者 ISBN
 

 读书世界首页 > 数理科学和化学 > 力学
分数维动力学 国内英文版  现货图书,当天发货,推荐购买  可选购买高质量WORD格式
电子书价格:14元 如何计算价格
作  者:(俄罗斯)塔拉索夫著
出 版 社:高等教育出版社 出版年份:2010 年
ISBN:9787040294736 页数:505 页
支持介质:
图书格式说明及阅读软件下载
分享到:
图书封面及目录

Part Ⅰ Fraction?l Continuous Models of Fractal Distributions1 Fractional Integration and Fractals
1.1 Riemann-Liouville fractional integrals
1.2 Liouville fractional integrals
1.3 Riesz fractional integrals
1.4 Metric and measure spaces
1.5 Hausdorff measure
1.6 Hausdorff dimension and fractals
1.7 Box-counting dimension
1.8 Mass dimension of fractal systems
1.9 Elementary models of fractal distributions
1.10 Functions and integrals on fractals
1.11 Properties of integrals on fractals
1.12 Integration over non-integer-dimensional space
1.13 Multi-variable integration on fractals
1.14 Mass distribution on fractals
1.15 Density of states in Euclidean space
1.16 Fractional integral and measure on the real axis
1.17 Fractional integral and mass on the real axis
1.18 Mass of fractal media
1.19 Electric charge of fractal distribution
1.20 Probability on fractals
1.21 Fractal distribution of particles
References
2 Hydrodynamics of Fractal Media
2.1 Introduction
2.2 Equation of balance of mass
2.3 Total time derivative of fractional integral
2.4 Equation of continuity for fractal media
2.5 Fractional integral equation of balance of momentum
2.6 Differential equations of balance of momentum
2.7 Fractional integral equation of balance of energy
2.8 Differential equation of balance of energy
2.9 Euler's equations for fractal media
2.10 Navier-Stokes equations for fractal media
2.11 Equilibrium equation for fractal media
2.12 Bernoulli integral for fractal media
2.13 Sound waves in fractal media
2.14 One-dimensional wave equation in fractal media
2.15 Conclusion
References
3 Fractal Rigid Body Dynamics
3.1 Introduction
3.2 Fractional equation for moment of inertia
3.3 Moment of inertia of fractal rigid body ball
3.4 Moment of inertia for fractal rigid body cylinder
3.5 Equations of motion for fractal rigid body
3.6 Pendulum with fractal rigid body
3.7 Fractal rigid body rolling down an inclined plane
3.8 Conclusion
References
4 Electrodynamics of Fractal Distributions of Charges and Fields
4.1 Introduction
4.2 Electric charge of fractal distribution
4.3 Electric current for fractal distribution
4.4 Gauss'theorem for fractal distribution
4.5 Stokes'theorem for fractal distribution
4.6 Charge conservation for fractal distribution
4.7 Coulomb's and Biot-Savart laws for fractal distribution
4.8 Gauss'law for fractal distribution
4.9 Ampere's law for fractal distribution
4.10 Integral Maxwell equations for fractal distribution
4.11 Fractal distribution as an effective medium
4.12 Electric multipole expansion for fractal distribution
4.13 Electric dipole moment of fractal distribution
4.14 Electric quadrupole moment of fractal distribution
4.15 Magnetohydrodynamics of fractal distribution
4.16 Stationary states in magnetohydrodynamics of fractal distributions
4.17 Conclusion
References
5 Ginzburg-Landau Equation for Fractal Media
5.1 Introduction
5.2 Fractional generalization of free energy functional
5.3 Ginzburg-Landau equation from free energy functional
5.4 Fractional equations from variational equation
5.5 Conclusion
References
6 Fokker-Planck Equation for Fractal Distributions of Probability
6.1 Introduction
6.2 Fractional equation for average values
6.3 Fractional Chapman-Kolmogorov equation
6.4 Fokker-Planck equation for fractal distribution
6.5 Stationary solutions of generalized Fokker-Planck equation
6.6 Conclusion
References
7 Statistical Mechanics of Fractal Phase Space Distributions
7.1 Introduction
7.2 Fractal distribution in phase space
7.3 Fractional phase volume for configuration space
7.4 Fractional phase volume for phase space
7.5 Fractional generalization of normalization condition
7.6 Continuity equation for fractal distribution in configuration space
7.7 Continuity equation for fractal distribution in phase space
7.8 Fractional average values for configuration space
7.9 Fractional average values for phase space
7.10 Generalized Liouville equation
7.11 Reduced distribution functions
7.12 Conclusion
References
Part Ⅱ Fractional Dynamics and Long-Range Interactions
8 Fractional Dynamics of Media with Long-Range Interaction
8.1 Introduction
8.2 Equations of lattice vibrations and dispersion law
8.3 Equations of motion for interacting particles
8.4 Transform operation for discrete models
8.5 Fourier series transform of equations of motion
8.6 Alpha-interaction of particles
8.7 Fractional spatial derivatives
8.8 Riesz fractional derivatives and integrals
8.9 Continuous limits of discrete equations
8.10 Linear nearest-neighbor interaction
8.11 Linear integer long-range alpha-interaction
8.12 Linear fractional long-range alpha-interaction
8.13 Fractional reaction-diffusion equation
8.14 Nonlinear long-range alpha-interaction
8.15 Fractional 3-dimensional lattice equation
8.16 Fractional derivatives from dispersion law
8.17 Fractal long-range interaction
8.18 Fractal dispersion law
8.19 Grünwald-Letnikov-Riesz long-range interaction
8.20 Conclusion
References
9 Fractional Ginzburg-Landau Equation
9.1 Introduction
9.2 Particular solution of fractional Ginzburg-Landau equation
9.3 Stability of plane-wave solution
9.4 Forced fractional equation
9.5 Conclusion
References
10 Psi-Series Approach to Fractional Equations
10.1 Introduction
10.2 Singular behavior of fractional equation
10.3 Resonance terms of fractional equation
10.4 Psi-series for fractional equation of rational order
10.5 Next to singular behavior
10.6 Conclusion
References
Part Ⅲ Fractional Spatial Dynamics
11 Fractional Vector Calculus
11.1 Introduction
11.2 Generalization of vector calculus
11.3 Fundamental theorem of fractional calculus
11.4 Fractional differential vector operators
11.5 Fractional integral vector operations
11.6 Fractional Green's formula
11.7 Fractional Stokes'formula
11.8 Fractional Gauss'formula
11.9 Conclusion
References
12 Fractional Exterior Calculus and Fractional Differential Forms
12.1 Introduction
12.2 Differential forms of integer order
12.3 Fractional exterior derivative
12.4 Fractional differential forms
12.5 Hodge star operator
12.6 Vector operations by differential forms
12.7 Fractional Maxwell's equations in terms of fractional forms
12.8 Caputo derivative in electrodynamics
12.9 Fractional nonlocal Maxwell's equations
12.10 Fractional waves
12.11 Conclusion
References
13 Fractional Dynamical Systems
13.1 Introduction
13.2 Fractional generalization of gradient systems
13.3 Examples of fractional gradient systems
13.4 Hamiltonian dynamical systems
13.5 Fractional generalization of Hamiltonian systems
13.6 Conclusion
References
14 Fractional Calculus of Variations in Dynamics
14.1 Introduction
14.2 Hamilton's equations and variations of integer order
14.3 Fractional variations and Hamilton's equations
14.4 Lagrange's equations and variations of integer order
14.5 Fractional variations and Lagrange's equations
14.6 Helmholtz conditions and non-Lagrangian equations
14.7 Fractional variations and non-Hamiltonian systems
14.8 Fractional stability
14.9 Conclusion
References
15 Fractional Statistical Mechanics
15.1 Introduction
15.2 Liouville equation with fractional derivatives
15.3 Bogolyubov equation with fractional derivatives
15.4 Vlasov equation with fractional derivatives
15.5 Fokker-Planck equation with fractional derivatives
15.6 Conclusion
References
Part Ⅳ Fractional Temporal Dynamics
16 Fractional Temporal Electrodynamics
16.1 Introduction
16.2 Universal response laws
16.3 Linear electrodynamics of medium
16.4 Fractional equations for laws of universal response
16.5 Fractional equations of the Curie-von Schweidler law
16.6 Fractional Gauss'laws for electric field
16.7 Universal fractional equation for electric field
16.8 Universal fractional equation for magnetic field
16.9 Fractional damping of magnetic field
16.10 Conclusion
References
17 Fractional Nonholonomic Dynamics
17.1 Introduction
17.2 Nonholonomic dynamics
17.3 Fractional temporal derivatives
17.4 Fractional dynamics with nonholonomic constraints
17.5 Constraints with fractional derivatives
17.6 Equations of motion with fractional nonholonomic constraints
17.7 Example of fractional nonholonomic constraints
17.8 Fractional conditional extremum
17.9 Hamilton's approach to fractional nonholonomic constraints
17.10 Conclusion
References
18 Fractional Dynamics and Discrete Maps with Memory
18.1 Introduction
18.2 Discrete maps without memory
18.3 Caputo and Riemann-Liouville fractional derivatives
18.4 Fractional derivative in the kicked term and discrete maps
18.5 Fractional derivative in the kicked term and dissipative discrete maps
18.6 Fractional equation with higher order derivatives and discrete map
18.7 Fractional generalization of universal map for 1<α≤2
18.8 Fractional universal map for α>2
18.9 Riemann-Liouville derivative and universal map with memory
18.10 Caputo fractional derivative and universal map with memory
18.11 Fractional kicked damped rotator map
18.12 Fractional dissipative standard map
18.13 Fractional Hénon map
18.14 Conclusion
References
Part Ⅴ Fractional Quantum Dynamics
19 Fractional Dynamics of Hamiltonian Quantum Systems
19.1 Introduction
19.2 Fractional power of derivative and Heisenberg equation
19.3 Properties of fractional dynamics
19.4 Fractional quantum dynamics of free particle
19.5 Fractional quantum dynamics of harmonic oscillator
19.6 Conclusion
References
20 Fractional Dynamics of Open Quantum Systems
20.1 Introduction
20.2 Fractional power of superoperator
20.3 Fractional equation for quantum observables
20.4 Fractional dynamical semigroup
20.5 Fractional equation for quantum states
20.6 Fractional non-Markovian quantum dynamics
20.7 Fractional equations for quantum oscillator with friction
20.8 Quantum self-reproducing and self-cloning
20.9 Conclusion
References
21 Quantum Analogs of Fractional Derivatives
21.1 Introduction
21.2 Weyl quantization of differential operators
21.3 Quantization of Riemann-Liouville fractional derivatives
21.4 Quantization of Liouville fractional derivative
21.5 Quantization of nondifferentiable functions
21.6 Conclusion
References
Index
   
帮助中心   联系我们    意见反馈    在线客服
     携手著名高校图书馆之海量藏书资源,专业提供图书试读及电子书服务。
copyright 2011-2012 www.readbooks.cc 读书世界 版权所有