✦ LIBER ✦

An inequality for Tchebycheff polynomials and extensions

✍ Scribed by Richard Askey; George Gasper; Lawrence A Harris

Book ID: 107776591
Publisher: Elsevier Science
Year: 1975
Tongue: English
Weight: 436 KB
Volume: 14
Category: Article
ISSN: 0021-9045
DOI: 10.1016/0021-9045(75)90061-1

No coin nor oath required. For personal study only.

📜 SIMILAR VOLUMES

Orthogonal polynomials and extensions of

Orthogonal polynomials and extensions of Copson's inequality

✍ B.M. Brown; W.D. Evans; L.L. Littlejohn 📂 Article 📅 1993 🏛 Elsevier Science 🌐 English ⚖ 857 KB

An inequality for polynomials

✍ M.A. Qazi 📂 Article 📅 2007 🏛 Elsevier Science 🌐 English ⚖ 144 KB

Homogeneous polynomials and extensions o

Homogeneous polynomials and extensions of Hardy-Hilbert's inequality

✍ Vasileios A. Anagnostopoulos; Yannis Sarantopoulos; Andrew M. Tonge 📂 Article 📅 2011 🏛 John Wiley and Sons 🌐 English ⚖ 131 KB

## Abstract If __L__ is a continuous symmetric __n__‐linear form on a real or complex Hilbert space and \documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$\widehat{L}$\end{document} is the associated continuous __n__‐homogeneous polynomial, then \documentclass{article}\use

An inequality for Tutte polynomials

✍ Bill Jackson 📂 Article 📅 2010 🏛 Springer-Verlag 🌐 English ⚖ 447 KB

An inequality for chromatic polynomials

✍ D.R. Woodall 📂 Article 📅 1992 🏛 Elsevier Science 🌐 English ⚖ 250 KB

Woodall, D.R., An inequality for chromatic polynomials, Discrete Mathematics 101 (1992) 327-331. It is proved that if P(G, t) is the chromatic polynomial of a simple graph G with II vertices, m edges, c components and b blocks, and if t S 1, then IP(G, t)/ 2 1t'(tl)hl(l + ys + ys2+ . + yF' +spl), wh

An Inequality for Cosine Polynomials

✍ Horst Alzer 📂 Article 📅 1997 🏛 Elsevier Science 🌐 English ⚖ 113 KB