Mathematical Methods For Physicists International Student EditionElsevier, 2005年7月5日 - 1200 頁 This best-selling title provides in one handy volume the essential mathematical tools and techniques used to solve problems in physics. It is a vital addition to the bookshelf of any serious student of physics or research professional in the field. The authors have put considerable effort into revamping this new edition.
New in the Sixth Edition:
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內容
1 | |
103 | |
Chapter 3 Determinants and Matrices | 165 |
Chapter 4 Group Theory | 241 |
Chapter 5 Infinite Series | 321 |
Chapter 6 Functions of a Complex Variable I Analytic Properties Mapping | 403 |
Chapter 7 Functions of a Complex Variable II | 455 |
Chapter 8 The Gamma Function Factorial Function | 499 |
Chapter 12 Legendre Functions | 741 |
Chapter 13 More Special Functions | 817 |
Chapter 14 Fourier Series | 881 |
Chapter 15 Integral Transforms | 931 |
Chapter 16 Integral Equations | 1005 |
Chapter 17 Calculus of Variations | 1037 |
Chapter 18 Nonlinear Methods and Chaos | 1079 |
Chapter 19 Probability | 1109 |
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常見字詞
analytic angle angular momentum apply asymptotic Bessel functions boundary conditions Calculate Cartesian Chapter Chebyshev coefficients complex components constant contour convergence coordinate system corresponding cosine defined delta function derivative determinant developed differential equation Dirac Dirac delta function divergence eigenfunctions eigenvalues eigenvectors elements Evaluate Example Exercise exponential finite Fourier series Fourier transform Gauss given Green’s function Hermite polynomials Hermitian Hint hypergeometric independent integral representation inverse Laguerre Laplace Legendre polynomials linear Lorentz magnetic mathematical Mathieu functions matrix multiplying Note obtain operator orthogonal partial physical potential power series quantum mechanics recurrence relation result rotation satisfy Section Show singular solution space spherical harmonics spherical polar coordinates substitution surface symmetry tensor theorem theory tion unit vectors values vanish variable velocity Verify wave function Wronskian yields zero