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On properties of integrals of the Legendre polynomial. / Kholshevnikov, K.V.; Shaidulin, V.S.

In: Vestnik St. Petersburg University: Mathematics, Vol. 47, No. 1, 2014, p. 28-38.

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Harvard

Kholshevnikov, KV & Shaidulin, VS 2014, 'On properties of integrals of the Legendre polynomial', Vestnik St. Petersburg University: Mathematics, vol. 47, no. 1, pp. 28-38. https://doi.org/10.3103/S1063454114010051

APA

Kholshevnikov, K. V., & Shaidulin, V. S. (2014). On properties of integrals of the Legendre polynomial. Vestnik St. Petersburg University: Mathematics, 47(1), 28-38. https://doi.org/10.3103/S1063454114010051

Vancouver

Kholshevnikov KV, Shaidulin VS. On properties of integrals of the Legendre polynomial. Vestnik St. Petersburg University: Mathematics. 2014;47(1):28-38. https://doi.org/10.3103/S1063454114010051

Author

Kholshevnikov, K.V. ; Shaidulin, V.S. / On properties of integrals of the Legendre polynomial. In: Vestnik St. Petersburg University: Mathematics. 2014 ; Vol. 47, No. 1. pp. 28-38.

BibTeX

@article{d974ddb6cd38466ab55d070cda4f73bc,
title = "On properties of integrals of the Legendre polynomial",
abstract = "Properties of the integrals (Formula presented.) of the Legendre polynomials P n(x) on the base interval -1 ≤ x ≤ 1 are systematically considered. The generating function (Formula presented.) is defined; here, Q 0 = 0 and Q k with k > 0 is a polynomial of degree 2k - 1 in each of the variables x and z. A second-order differential equation is derived, an analogue of Rodrigues' formula is obtained, and the asymptotic behavior as n → ∞ is determined. It is proved that the representation (Formula presented.) holds if and only if n ≥ k, where f nk is a polynomial divisible by neither x - 1 nor x + 1. The main result is the sharp bound (formula presented.) Here, (formula presented.) where t k is the maximum of the function √tJk(t) on the half-axis t > 0 and J k(t) is the Bessel function. The first values A k and differences A k - μ1 k 1/6 are tabulated below as follows.",
keywords = "Integrals Of Legendre polynomial, Bessel functions, asymptotics, estimate, recurrence",
author = "K.V. Kholshevnikov and V.S. Shaidulin",
year = "2014",
doi = "10.3103/S1063454114010051",
language = "English",
volume = "47",
pages = "28--38",
journal = "Vestnik St. Petersburg University: Mathematics",
issn = "1063-4541",
publisher = "Pleiades Publishing",
number = "1",

}

RIS

TY - JOUR

T1 - On properties of integrals of the Legendre polynomial

AU - Kholshevnikov, K.V.

AU - Shaidulin, V.S.

PY - 2014

Y1 - 2014

N2 - Properties of the integrals (Formula presented.) of the Legendre polynomials P n(x) on the base interval -1 ≤ x ≤ 1 are systematically considered. The generating function (Formula presented.) is defined; here, Q 0 = 0 and Q k with k > 0 is a polynomial of degree 2k - 1 in each of the variables x and z. A second-order differential equation is derived, an analogue of Rodrigues' formula is obtained, and the asymptotic behavior as n → ∞ is determined. It is proved that the representation (Formula presented.) holds if and only if n ≥ k, where f nk is a polynomial divisible by neither x - 1 nor x + 1. The main result is the sharp bound (formula presented.) Here, (formula presented.) where t k is the maximum of the function √tJk(t) on the half-axis t > 0 and J k(t) is the Bessel function. The first values A k and differences A k - μ1 k 1/6 are tabulated below as follows.

AB - Properties of the integrals (Formula presented.) of the Legendre polynomials P n(x) on the base interval -1 ≤ x ≤ 1 are systematically considered. The generating function (Formula presented.) is defined; here, Q 0 = 0 and Q k with k > 0 is a polynomial of degree 2k - 1 in each of the variables x and z. A second-order differential equation is derived, an analogue of Rodrigues' formula is obtained, and the asymptotic behavior as n → ∞ is determined. It is proved that the representation (Formula presented.) holds if and only if n ≥ k, where f nk is a polynomial divisible by neither x - 1 nor x + 1. The main result is the sharp bound (formula presented.) Here, (formula presented.) where t k is the maximum of the function √tJk(t) on the half-axis t > 0 and J k(t) is the Bessel function. The first values A k and differences A k - μ1 k 1/6 are tabulated below as follows.

KW - Integrals Of Legendre polynomial

KW - Bessel functions

KW - asymptotics

KW - estimate

KW - recurrence

U2 - 10.3103/S1063454114010051

DO - 10.3103/S1063454114010051

M3 - Article

VL - 47

SP - 28

EP - 38

JO - Vestnik St. Petersburg University: Mathematics

JF - Vestnik St. Petersburg University: Mathematics

SN - 1063-4541

IS - 1

ER -

ID: 7018321