inequalities

§4.18 Inequalities

►

Jordan’s Inequality

… ►For more inequalities see Mitrinović (1964, pp. 101–111), Mitrinović (1970, pp. 235–265), and Bullen (1998, pp. 250–254).

§5.6 Inequalities

… ►

Gautschi’s Inequality

… ►

Kershaw’s Inequality

…

§19.24 Inequalities

►

§19.24(i) Complete Integrals

… ►Other inequalities can be obtained by applying Carlson (1966, Theorems 2 and 3) to (19.16.20)–(19.16.23). … ► ►

§19.24(ii) Incomplete Integrals

…

… ►Richards has published numerous papers on special functions of matrix argument, harmonic analysis, multivariate statistical analysis, probability inequalities, and applied probability. …

§10.14 Inequalities; Monotonicity

… ►

Kapteyn’s Inequality

… ►For inequalities for the function $\mathrm{\Gamma }\left(\nu +1\right){(2/x)}^{\nu }{J}_{\nu }\left(x\right)$ with $\nu >-\frac{1}{2}$ see Neuman (2004). …

… ►

… ►Another significant contribution was the Askey-Gasper inequality for Jacobi polynomials which was published in Positive Jacobi polynomial sums. II (with G. …This inequality was a key element of Louis de Branges’ proof of the Bieberbach conjecture in 1985. …

§19.9 Inequalities

►

§19.9(i) Complete Integrals

… ►Other inequalities are: … ►

§19.9(ii) Incomplete Integrals

… ►Simple inequalities for incomplete integrals follow directly from the defining integrals (§19.2(ii)) together with (19.6.12): …

§8.10 Inequalities

… ►The inequalities in (8.10.1) and (8.10.2) are reversed when $a\ge 1$. …For further inequalities of these types see Qi and Mei (1999) and Neuman (2013). …

… ►In the proof of this conjecture de Branges (1985) uses the inequality …The proof of this inequality is given in Askey and Gasper (1976). …