Containing an extensive illustration of the use of finite difference method in solving boundary value problems numerically, a wide class of differential equations have been numerically solved in this book. Starting with differential equations of elementary functions like hyperbolic, sine and cosine, special functions such as Hermite, Laguerre and Legendre are solved. Airy function, stationary localised wavepacket, the quantum mechanical problem of the particle in a 1D box and polar equation of motion under gravitational interaction are also explored.
Aimed at ensuring readers become adept in using the method, Mathematica 6.0 is used to solve systems of linear equations, and to plot the numerical data, and comparison with known analytic solutions showed nearly perfect agreement in every case.
Mục lục
Chapter I Numerical Solution of Boundary Value Problem Using Finite Difference Method 1.1 Statement of the problem 1.2 Approximation to derivatives 1.3 The finite difference method
Chapter II Differential Equations of Some Elementary Functions: Boundary Value Problems Numerically Solved Using Finite Difference Method 2.1 The differential equation for hyperbolic function 2.2 The differential equation for Cosine function 2.3 The differential equation for Sine function
Chapter III Differential Equations of Special Functions: Boundary Value Problems Numerically Solved Using Finite Difference Method 3.1 The Hermite differential equation 3.1.1 Hermite polynomial H3(x) 3.2 The Laguerre differential equation 3.2.1 Laguerre polynomial L3(x) 3.3 The Legendre differential equation 3.3.1 Legendre polynomial P3(x)
Chapter IV Differential Equation of Airy Function: Boundary Value Problem Numerically Solved Using Finite Difference Method 4.1 The differential equation for Airy function
Chapter V Differential Equation of Stationary Localised Wavepacket: Boundary Value Problem Numerically Solved Using Finite Difference Method 5.1 Differential equation for stationary localised wavepacket
Chapter VI Particle in a Box: Boundary Value Problem Numerically Solved Using Finite Difference Method 6.1 The Quantum Mechanical problem of particle in a onedimensional Box
Chapter VII Motion under gravitational interaction: Boundary Value Problem Numerically Solved Using Finite Difference Method 7.1 Motion under gravitational interaction Concluding remarks References
Giới thiệu về tác giả
Sujaul Chowdhury is a Professor in Department of Physics at Shahjalal University of Science and Technology (SUST), Bangladesh. He obtained a BSc in physics in 1994 and a MSc in physics in 1996 from SUST. He obtained a Ph D in physics from University of Glasgow, UK, in 2001. He was a Humboldt Research Fellow for one year at The Max Planck Institute, Stuttgart, Germany. He is the author of Numerical Solutions of Initial Value Problems Using Mathematica. Ponkog Kumar Das is an Assistant Professor in Department of Physics at SUST. He obtained a BSc and MSc in physics from SUST. He is a co-author of Numerical Solutions of Initial Value Problems Using Mathematica. Syed Badiuzzaman Faruque is a Professor in the Department of Physics at SUST. He is a researcher with interest in quantum theory, gravitational physics and material science. He has been teaching physics at university level for about 26 years. He studied physics at the University of Dhaka, Bangladesh, and the University of Massachusetts Dartmouth, USA, and obtained his Ph D from SUST.Thêm sách điện tử từ cùng một tác giả / Biên tập viên
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