Rogers–zengő polynomials
(0.001 seconds)
21—30 of 260 matching pages
21: 17.14 Constant Term Identities
…
►
Rogers–Ramanujan Constant Term Identities
…22: 24.18 Physical Applications
§24.18 Physical Applications
►Bernoulli polynomials appear in statistical physics (Ordóñez and Driebe (1996)), in discussions of Casimir forces (Li et al. (1991)), and in a study of quark-gluon plasma (Meisinger et al. (2002)). ►Euler polynomials also appear in statistical physics as well as in semi-classical approximations to quantum probability distributions (Ballentine and McRae (1998)).23: 24.3 Graphs
24: 18.4 Graphics
25: 18.7 Interrelations and Limit Relations
§18.7 Interrelations and Limit Relations
… ►Chebyshev, Ultraspherical, and Jacobi
… ►Legendre, Ultraspherical, and Jacobi
… ►§18.7(ii) Quadratic Transformations
… ►§18.7(iii) Limit Relations
…26: 18.41 Tables
…
►
§18.41(i) Polynomials
►For () see §14.33. ►Abramowitz and Stegun (1964, Tables 22.4, 22.6, 22.11, and 22.13) tabulates , , , and for . The ranges of are for and , and for and . … ►For , , and see §3.5(v). …27: 18.6 Symmetry, Special Values, and Limits to Monomials
…
►For Jacobi, ultraspherical, Chebyshev, Legendre, and Hermite polynomials, see Table 18.6.1.
►
Laguerre
… ► ►§18.6(ii) Limits to Monomials
… ►
18.6.4
…