Mathematical Methods of Physics |
Contents
Preface | 1 |
Infinite Series | 15 |
Evaluation of Integrals | 56 |
Copyright | |
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A₁ analytic approximation arbitrary Bessel functions boundary conditions c₁ Chapter coefficients complex components consider constant contour converges coordinate system covariant derivative curve d³x defined diagonal differential equation dimensionality discussed distribution eigenfunctions eigenvalue eigenvectors Euler-Lagrange equation evaluate example Find finite formula Fourier series Fourier transform function f(x Gaussian given gives Green's function group element Hermitian homogeneous hypergeometric infinite inhomogeneous integral equation integrand irreducible representations Laplace transform Legendre linear matrix method normal obeys obtain orthogonal parameters physical plane pole polynomial probability real axis recursion relation region result rotation scalar Schrödinger equation Section shown in Figure singularities solution solve Suppose symmetry group Table temperature tensor theorem theory unitary values vanish variable vector x₁ y₁ z-plane zero ду дх