statistical applications

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11: 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)).

12: Ingram Olkin

… ►His well-known books in the statistics community include Theory of Majorization and its Applications (with A. …

13: 23.21 Physical Applications

§23.21 Physical Applications

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14: Donald St. P. Richards

… ►He is also Associate Editor of the Annals of Statistics, Associate Review Editor of the Journal of the American Statistical Association, and Member of the Board of Governors of the Institute for Mathematics and its Applications. …

15: Bibliography W

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G. Wei and B. E. Eichinger (1993) Asymptotic expansions of some matrix argument hypergeometric functions, with applications to macromolecules. Ann. Inst. Statist. Math. 45 (3), pp. 467–475.

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External Links:: ISSN 0020-3157, Document, MathReview (N. K. Thakare), ZentralBlatt
Referenced by:: §35.9.
Encodings:: BibTeX

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16: Bibliography

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S. V. Aksenov, M. A. Savageau, U. D. Jentschura, J. Becher, G. Soff, and P. J. Mohr (2003) Application of the combined nonlinear-condensation transformation to problems in statistical analysis and theoretical physics. Comput. Phys. Comm. 150 (1), pp. 1–20.

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Notes:: Includes algorithms for Lerch’s transcendent. C and Mathematica codes by Aksenov and Jentschura are available.
External Links:: Code, Document
Referenced by:: 1st item.
Encodings:: BibTeX

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17: 31.17 Physical Applications

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§31.17(ii) Other Applications

►Heun functions appear in the theory of black holes (Kerr (1963), Teukolsky (1972), Chandrasekhar (1984), Suzuki et al. (1998), Kalnins et al. (2000)), lattice systems in statistical mechanics (Joyce (1973, 1994)), dislocation theory (Lay and Slavyanov (1999)), and solution of the Schrödinger equation of quantum mechanics (Bay et al. (1997), Tolstikhin and Matsuzawa (2001), and Hall et al. (2010)). …

18: Bibliography M

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B. M. McCoy (1992) Spin Systems, Statistical Mechanics and Painlevé Functions. In Painlevé Transcendents: Their Asymptotics and Physical Applications, D. Levi and P. Winternitz (Eds.), NATO Adv. Sci. Inst. Ser. B Phys., Vol. 278, pp. 377–391.

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Notes:: Proc. NATO Adv. Res. Workshop, Sainte-Adèle, Canada, 1990
External Links:: MathReview, ZentralBlatt
Referenced by:: §32.16.
Encodings:: BibTeX

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19: Bibliography S

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I. Shavitt (1963) The Gaussian Function in Calculations of Statistical Mechanics and Quantum Mechanics. In Methods in Computational Physics: Advances in Research and Applications, B. Alder, S. Fernbach, and M. Rotenberg (Eds.), Vol. 2, pp. 1–45.

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Referenced by:: §8.24(i), §8.24(iii).
Encodings:: BibTeX

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20: 10.73 Physical Applications

§10.73 Physical Applications

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§10.73(ii) Spherical Bessel Functions

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§10.73(iii) Kelvin Functions

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§10.73(iv) Bickley Functions

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