Novikov conjecture

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11—20 of 27 matching pages

11: Richard A. Askey

… ►This inequality was a key element of Louis de Branges’ proof of the Bieberbach conjecture in 1985. …

12: Preface

… ►Novikov, P. …

13: 17.13 Integrals

… ►Askey (1980) conjectured extensions of the foregoing integrals that are closely related to Macdonald (1982). These conjectures are proved independently in Habsieger (1988) and Kadell (1988).

14: Bibliography Z

… ►

D. Zeilberger and D. M. Bressoud (1985) A proof of Andrews’

q

-Dyson conjecture. Discrete Math. 54 (2), pp. 201–224.

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External Links:: ISSN 0012-365X, Document, MathReview (Ira Gessel), ZentralBlatt
Referenced by:: §17.14.
Encodings:: BibTeX

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15: Bibliography N

… ►

G. Nemes (2021) Proofs of two conjectures on the real zeros of the cylinder and Airy functions. SIAM J. Math. Anal. 53 (4), pp. 4328–4349.

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External Links:: ISSN 0036-1410, Document, Link, MathReview (José Luis López), ZentralBlatt
Referenced by:: (10.18.17), (10.18.18), §10.18(iii), (9.8.22), (9.8.23), §9.8(iv), Erratum (V1.1.8) for Section 9.8(iv), Erratum (V1.1.8) for Section 10.18(iii).
Encodings:: BibTeX

…

16: 18.14 Inequalities

… ►

18.14.25

\sum_{m=0}^{n}\frac{{\left(\lambda+1\right)_{n-m}}}{(n-m)!}\frac{{\left(% \lambda+1\right)_{m}}}{m!}\mbox{$\displaystyle\frac{P^{(\alpha,\beta)}_{m}% \left(x\right)}{P^{(\beta,\alpha)}_{m}\left(1\right)}\geq 0$},

x\geq-1

\alpha+\beta\geq\lambda\geq 0

\beta\geq-\tfrac{1}{2}

n=0,1,\dots

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Symbols:: $P^{(\NVar{\alpha},\NVar{\beta})}_{\NVar{n}}\left(\NVar{x}\right)$ : Jacobi polynomial, ${\left(\NVar{a}\right)_{\NVar{n}}}$ : Pochhammer’s symbol (or shifted factorial), $!$ : factorial (as in $n!$ ), $m$ : nonnegative integer, $n$ : nonnegative integer and $x$ : real variable
Proved:: Gasper (1977, Theorem 5)(proved)
Source:: Askey and Gasper (1976, Conjecture 1); conjectured
Referenced by:: Erratum (V1.2.0) Section 18.14
Permalink:: http://dlmf.nist.gov/18.14.E25
Encodings:: pMML, png, TeX
See also:: Annotations for §18.14(iv), §18.14(iv), §18.14 and Ch.18

►

18.14.26

\sum_{m=0}^{n}\frac{P^{(\alpha,\beta)}_{m}\left(x\right)}{P^{(\beta,\alpha)}_{% m}\left(1\right)}\geq 0,

x\geq-1

n=0,1,\dots

ⓘ

Symbols:: $P^{(\NVar{\alpha},\NVar{\beta})}_{\NVar{n}}\left(\NVar{x}\right)$ : Jacobi polynomial, $m$ : nonnegative integer, $n$ : nonnegative integer and $x$ : real variable
Proved:: Gasper (1977, Theorem 4); also proved there for $\alpha+\beta\geq-2$ , $\beta\geq 0$ (proved)
Source:: Askey and Gasper (1976, (1.7), (1.12)); conjectured
Referenced by:: §18.14(iv), §18.38(ii)
Permalink:: http://dlmf.nist.gov/18.14.E26
Encodings:: pMML, png, TeX
See also:: Annotations for §18.14(iv), §18.14(iv), §18.14 and Ch.18

… ►

18.14.27

\sum_{m=0}^{n}\frac{{\left(\lambda+1\right)_{n-m}}}{(n-m)!}\frac{{\left(% \lambda+1\right)_{m}}}{m!}\mbox{$\displaystyle\frac{(-1)^{m}L^{(\beta)}_{m}% \left(x\right)}{L^{(\beta)}_{m}\left(0\right)}\geq 0$},

x\geq 0

\beta,\lambda\geq-\tfrac{1}{2}

n=0,1,\dots

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Symbols:: $L^{(\NVar{\alpha})}_{\NVar{n}}\left(\NVar{x}\right)$ : Laguerre (or generalized Laguerre) polynomial, ${\left(\NVar{a}\right)_{\NVar{n}}}$ : Pochhammer’s symbol (or shifted factorial), $!$ : factorial (as in $n!$ ), $m$ : nonnegative integer, $n$ : nonnegative integer and $x$ : real variable
Proved:: Gasper (1977, Theorem 1)(proved)
Source:: Askey and Gasper (1976, Conjecture 2); conjectured
Referenced by:: Erratum (V1.2.0) Section 18.14
Permalink:: http://dlmf.nist.gov/18.14.E27
Encodings:: pMML, png, TeX
See also:: Annotations for §18.14(iv), §18.14(iv), §18.14 and Ch.18

17: Bibliography H

… ►

L. Habsieger (1986) La

q

-conjecture de Macdonald-Morris pour

G_{2}

. C. R. Acad. Sci. Paris Sér. I Math. 303 (6), pp. 211–213 (French).

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External Links:: ISSN 0249-6291, MathReview (David M. Bressoud), ZentralBlatt
Referenced by:: §17.14.
Encodings:: BibTeX

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18: 18.40 Methods of Computation

… ►An alternate, and highly efficient, approach follows from the derivative rule conjecture, see Yamani and Reinhardt (1975), and references therein, namely that …

19: 27.2 Functions

… ►Gauss and Legendre conjectured that

\pi\left(x\right)

is asymptotic to

x/\ln x

x\to\infty

: …

20: Bibliography

… ►

G. E. Andrews (1979) Plane partitions. III. The weak Macdonald conjecture. Invent. Math. 53 (3), pp. 193–225.

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External Links:: ISSN 0020-9910, Document, MathReview (Edward A. Bender), ZentralBlatt
Referenced by:: §26.12(i), §26.12(ii).
Encodings:: BibTeX

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