Index G
-
gamma distribution
- incomplete gamma functions §8.23
-
gamma function Ch.5, see also incomplete gamma functions.
- analytic properties ¶ ‣ §5.2(i)
- applications
-
approximations
- Chebyshev series §5.23(ii)
- complex variables §5.23(iii)
- rational §5.23(i), §5.23(iii)
-
asymptotic expansions §5.11, §5.11(iii)
- error bounds §5.11(ii)
- exponentially-improved §5.11(ii)
- for ratios §5.11(iii)
- Bohr-Mollerup theorem §5.5(iv)
- computation §5.21
- continued fraction §5.10
- definition ¶ ‣ §5.2(i)
- duplication formula ¶ ‣ §5.5(iii)
- Euler’s integral ¶ ‣ §5.2(i)
- extrema
- Gauss’s multiplication formula ¶ ‣ §5.5(iii)
- graphics §5.3, §5.3(ii)
- inequalities §5.6
- infinite products §5.8
- integral representations §5.13, ¶ ‣ §5.14, §5.9, ¶ ‣ §5.9(i), §8.21(iii)
- logarithm
- maxima and minima §5.6
- multiplication formulas §5.5(iii)
- multivariate, see multivariate gamma function.
- notation §5.1
-
reciprocal
- analytic properties ¶ ‣ §5.2(i)
- graphics §5.3(i), §5.3(ii)
- Maclaurin series §5.7(i)
- zeros ¶ ‣ §5.2(i)
- recurrence relation §5.5(i)
- reflection formula §5.5(ii)
- relations to hypergeometric function §15.4(ii), §15.4(iii)
- scaled ¶ ‣ §8.18(ii)
- special values §5.4
- tables §5.22(ii), §5.22(iii)
-
Gaunt coefficient
- symbol §34.3(vii)
-
Gaunt’s integral
- symbol §34.3(vii)
- Gauss–Christoffel quadrature, see Gauss quadrature.
-
Gaussian
- nonperiodic §20.13
-
Gaussian elimination §3.2(i), §3.2(ii)
- back substitution §3.2(i)
- forward elimination §3.2(i)
- iterative refinement ¶ ‣ §3.2(i)
- multipliers ¶ ‣ §3.2(i), §3.2(i)
- partial pivoting ¶ ‣ §3.2(i)
- pivot (or pivot element) ¶ ‣ §3.2(i)
- residual vector ¶ ‣ §3.2(i)
- triangular decomposition §3.2(i)
- tridiagonal systems §3.2(ii)
-
Gaussian hypergeometric function, see also hypergeometric function.
-
of matrix argument §35.7
- applications §35.9
- asymptotic approximations §35.7(iv)
- basic properties §35.7(ii)
- case ¶ ‣ §35.7(ii)
- computation §35.10
- confluent form ¶ ‣ §35.7(ii)
- definition §35.7(i)
- Gauss formula ¶ ‣ §35.7(ii)
- integral representation ¶ ‣ §35.7(ii)
- Jacobi form ¶ ‣ §35.7(i)
- notation §35.1
- partial differential equations §35.7(iii), §35.7(iii)
- reflection formula ¶ ‣ §35.7(ii)
- transformations of parameters ¶ ‣ §35.7(ii)
-
of matrix argument §35.7
-
Gaussian noise
- Lambert -function §4.44
- Gaussian polynomials
- Gaussian probability functions §7.1
-
Gaussian unitary ensemble
- Painlevé transcendents §32.14
-
Gauss quadrature ¶ ‣ §3.5(v), §3.5(v), §3.5(viii)
- Christoffel coefficients (or numbers) §3.5(v)
- comparison with Clenshaw–Curtis formula §3.5(iv)
- eigenvalue/eigenvector characterization §3.5(vi)
- for contour integrals §3.5(viii)
- Gauss–Chebyshev formula ¶ ‣ §3.5(v)
- Gauss–Hermite formula ¶ ‣ §3.5(v)
- Gauss–Jacobi formula ¶ ‣ §3.5(v)
-
Gauss–Laguerre formula ¶ ‣ §3.5(v)
- generalized ¶ ‣ §3.5(v)
- Gauss–Legendre formula ¶ ‣ §3.5(v)
- logarithmic weight function ¶ ‣ §3.5(v)
-
nodes §3.5(v)
- tables ¶ ‣ §3.5(v), §3.5(viii)
- remainder terms §3.5(v)
-
weight functions §3.5(v)
- tables ¶ ‣ §3.5(v), §3.5(viii)
-
Gauss’s sum
- -analog ¶ ‣ §17.7(i)
- Gauss series
- Gauss’s theorem for vector-valued functions ¶ ‣ §1.6(v)
- Gauss sums
-
Gegenbauer function
- definition §15.9(iii)
- relation to associated Legendre functions §14.3(iv)
- relation to hypergeometric function §15.9(iii)
- Gegenbauer polynomials, see ultraspherical polynomials, and also classical orthogonal polynomials.
-
Gegenbauer’s addition theorem
- Bessel functions ¶ ‣ §10.23(ii)
- modified Bessel functions ¶ ‣ §10.44(ii)
-
general elliptic integrals §19.2(i)
- reduction to basic elliptic integrals §19.29(ii)
- reduction to Legendre’s elliptic integrals §19.14, §19.14(ii)
- reduction to symmetric elliptic integrals §19.29(i), §19.29(iii)
- generalizations of elliptic integrals §19.35(i)
- generalized Airy functions
-
generalized exponential integral §8.19
- analytic continuation §8.19(viii)
- applications
- approximations §8.27(ii)
- asymptotic expansions
- Chebyshev-series expansions §8.27(ii)
- computation Ch.8
- continued fraction §8.19(vii)
- definition §8.19(i)
- derivatives §8.19(v)
- further generalizations §8.19(xi)
- graphics §8.19(ii)
- inequalities §8.19(ix)
-
integral representations §8.19(i)
- Mellin–Barnes type ¶ ‣ §8.19(i)
- integrals §8.19(x)
- notation §8.1
- of large argument §2.11(ii)
- principal values §8.19(i)
- recurrence relation §8.19(v)
- relations to other functions
- series expansions §8.19(iv)
- special values §8.19(iii)
- tables §8.26(iv)
- generalized exponentials §4.12
-
generalized functions
- distributions §2.6(iv)
-
generalized hypergeometric differential equation §16.8(ii)
- confluence of singularities §16.8(iii)
- connection formula §16.8(ii)
- fundamental solutions §16.8(ii)
- singularities §16.8(i)
-
generalized hypergeometric function
- definition §16.2(i), §16.5
- of large argument ¶ ‣ §2.10(iii)
-
generalized hypergeometric functions §16.2(i)
- analytic continuation §16.5
- analytic properties §16.2(ii), §16.2(iii), §16.2(iv), §16.2(v), §16.5
- applications
- approximations §16.26
- argument unity §16.4
- as functions of parameters §16.2(v)
-
asymptotic expansions
- formal series §16.11(i)
- large parameters §16.11(iii)
- large variable §16.11(ii)
- small variable §16.5
- balanced §16.4(i)
-
bilateral series §16.4(v)
- Dougall’s bilateral sum §16.4(v)
- computation §16.25
- contiguous balanced series §16.4(iii)
- contiguous functions §16.3(ii)
- contiguous relations §16.4(iii)
- continued fractions §16.4(iv)
- definitions §16.2(i), §16.5
- derivatives §16.3(i)
- differential equation, see generalized hypergeometric differential equation.
- Dixon’s well-poised sum ¶ ‣ §16.4(ii)
- Dougall’s bilateral sum §16.4(v)
- Dougall’s very well-poised sum ¶ ‣ §16.4(ii)
- Džrbasjan’s sum ¶ ‣ §16.4(ii)
- expansions in series of §16.10
- extensions of Kummer’s relations §16.4(iii)
- identities §16.4(iii), §16.4(iii)
- integral representations §16.5
- integrals §16.5
- -balanced §16.4(i)
- Kummer-type transformations §16.4(iii), ¶ ‣ §16.6
- monodromy §16.23(i)
- notation §16.2(i)
-
of matrix argument §35.8
- applications §35.9
- computation §35.10
- confluence ¶ ‣ §35.8(iv)
- convergence properties ¶ ‣ §35.8(i)
- definition §35.8(i)
- Euler integral ¶ ‣ §35.8(iv)
- expansion in zonal polynomials §35.8(i)
- general properties §35.8(iv)
- invariance ¶ ‣ §35.8(iv)
- Kummer transformation ¶ ‣ §35.8(iii)
- Laplace transform ¶ ‣ §35.8(iv)
- Mellin–Barnes integrals §35.8(v)
- notation §35.1
- Pfaff–Saalschutz formula ¶ ‣ §35.8(iii)
- relations to other functions §35.8(ii)
- Thomae transformation ¶ ‣ §35.8(iii)
- case §35.8(iii)
- value at ¶ ‣ §35.8(iv)
- Pfaff–Saalschütz balanced sum ¶ ‣ §16.4(ii)
- polynomial cases ¶ ‣ §16.2(iv)
- principal branch (value) §16.2(iii)
- products §16.12
- recurrence relations §16.4(iii)
-
relations to other functions
- associated Jacobi polynomials ¶ ‣ §18.30
- Bessel functions ¶ ‣ §10.16
- classical orthogonal polynomials §18.5(iii)
- Fresnel integrals ¶ ‣ §7.11
- generalized Bessel polynomials §18.34(i)
- Hahn class orthogonal polynomials §18.20(ii)
- Kummer functions §13.6(vi)
- Meijer -function §16.18
- modified Bessel functions ¶ ‣ §10.39
- orthogonal polynomials and other functions §16.7
- symbols §16.24(iii), §16.4(iii), §16.4(iii)
- Wilson class orthogonal polynomials §18.26(i)
- Rogers–Dougall very well-poised sum ¶ ‣ §16.4(ii)
- Saalschützian §16.4(i)
- terminating ¶ ‣ §16.2(iv), §16.2(iii)
- transformation of variable §16.6
- very well-poised §16.4(i)
- Watson’s sum ¶ ‣ §16.4(ii)
- well-poised §16.4(i)
- Whipple’s sum ¶ ‣ §16.4(ii)
- Whipple’s transformation §16.4(iii)
- with two variables Ch.16, §16.16(ii)
- zeros §16.9
- generalized hypergeometric series §16.2(i)
-
generalized integrals
- asymptotic expansions §2.6(i)
-
generalized logarithms §3.1(iv), §4.12
- applications §4.44
- generalized precision §3.1(iv)
-
generalized sine and cosine integrals §8.21
- analytic properties §8.21(i)
- asymptotic expansions for large variable §8.21(viii)
-
auxiliary functions §8.21(vii)
- asymptotic expansions for large variable §8.21(viii)
- integral representations §8.21(vii)
- computation Ch.8
- definitions
- expansions in series of spherical Bessel functions ¶ ‣ §8.21(vi)
- integral representations §8.21(iii)
- interrelations §8.21(iv)
- notation §8.1
- power-series expansions ¶ ‣ §8.21(vi)
- relation to sine and cosine integrals §8.21(v)
- special values §8.21(v)
-
general orthogonal polynomials Ch.18
- computation Ch.18
- difference operators §18.2(ii)
- monic §18.2(iii)
- on finite point sets ¶ ‣ §18.2(i)
- on intervals ¶ ‣ §18.2(i)
- orthonormal §18.2(iii)
- recurrence relations §18.2(iv)
- sums of products §18.2(v)
- weight functions ¶ ‣ §18.2(i)
- -difference operators §18.2(ii)
- zeros §18.2(vi)
-
Genocchi numbers §24.15(i)
- table Table 24.15.1
-
genus
- Riemann surface §21.7(i)
- geometric mean §1.2(iv), §1.7(iii)
- geometric progression (or series) ¶ ‣ §1.2(ii)
-
geophysics
- spherical harmonics §14.30(iv)
-
Gibbs phenomenon
- sine integral §6.16(i)
- Glaisher’s constant ¶ ‣ §2.10(i), §5.17
-
Glaisher’s notation
- Jacobian elliptic functions §22.1
-
Goldbach conjecture
- number theory §27.13(ii)
-
Goodwin–Staton integral
- asymptotic expansion §7.12(iii)
- computation §7.22(ii)
- definition §7.2(v)
- relations to Dawson’s integral and exponential integral §7.5
-
Graf’s addition theorem
- Bessel functions ¶ ‣ §10.23(ii)
- modified Bessel functions ¶ ‣ §10.44(ii)
-
Gram–Schmidt procedure
- for least squares approximation §3.11(v)
-
graph theory
- combinatorics §26.19
-
gravitational radiation
- Coulomb functions §33.22(vii)
-
Green’s theorem for vector-valued functions
- three dimensions ¶ ‣ §1.6(v)
- two dimensions ¶ ‣ §1.6(iv)
-
group representations
- orthogonal polynomials ¶ ‣ §18.38(iii)
-
group theory
- hypergeometric function §15.17(v)
-
Gudermannian function §4.23(viii)
- inverse §4.23(viii)
- relation to amplitude () function ¶ ‣ §22.16(i)
- relation to -function §19.10(ii)
- tables §4.46