monotonicity

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1: 10.37 Inequalities; Monotonicity

§10.37 Inequalities; Monotonicity

…

2: 10.14 Inequalities; Monotonicity

§10.14 Inequalities; Monotonicity

… ►For monotonicity properties of

J_{\nu}\left(\nu\right)

and

J_{\nu}'\left(\nu\right)

see Lorch (1992). … ►For further monotonicity properties see Landau (1999, 2000), and Muldoon and Spigler (1984).

3: 35.9 Applications

… ►For other statistical applications of

{{}_{p}F_{q}}

functions of matrix argument see Perlman and Olkin (1980), Groeneboom and Truax (2000), Bhaumik and Sarkar (2002), Richards (2004) (monotonicity of power functions of multivariate statistical test criteria), Bingham et al. (1992) (Procrustes analysis), and Phillips (1986) (exact distributions of statistical test criteria). …

4: Bibliography L

… ►

A. Laforgia and M. E. Muldoon (1988) Monotonicity properties of zeros of generalized Airy functions. Z. Angew. Math. Phys. 39 (2), pp. 267–271.

ⓘ

External Links:: ISSN 0044-2275, Document, MathReview (Evangelos Ifantis), ZentralBlatt
Referenced by:: §9.13(i).
Encodings:: BibTeX

►

A. Laforgia and S. Sismondi (1988) Monotonicity results and inequalities for the gamma and error functions. J. Comput. Appl. Math. 23 (1), pp. 25–33.

ⓘ

External Links:: ISSN 0377-0427, Document, MathReview (M. E. Cohen), ZentralBlatt
Referenced by:: §7.8.
Encodings:: BibTeX

… ►

L. J. Landau (2000) Bessel functions: Monotonicity and bounds. J. London Math. Soc. (2) 61 (1), pp. 197–215.

ⓘ

External Links:: ISSN 0024-6107, Document, MathReview (M. E. Muldoon), ZentralBlatt
Referenced by:: §10.14, §10.15.
Encodings:: BibTeX

… ►

J. T. Lewis and M. E. Muldoon (1977) Monotonicity and convexity properties of zeros of Bessel functions. SIAM J. Math. Anal. 8 (1), pp. 171–178.

ⓘ

External Links:: ISSN 1095-7154, Document, MathReview (T. Erber), ZentralBlatt
Referenced by:: §10.21(iv).
Encodings:: BibTeX

… ►

L. Lorch, M. E. Muldoon, and P. Szegő (1970) Higher monotonicity properties of certain Sturm-Liouville functions. III. Canad. J. Math. 22, pp. 1238–1265.

ⓘ

External Links:: ISSN 0008-414X, MathReview (G. Sansone), ZentralBlatt
Referenced by:: §10.21(ii).
Encodings:: BibTeX

…

5: 1.4 Calculus of One Variable

… ►

§1.4(i) Monotonicity

… ►Each of the preceding four cases is classified as monotonic; sometimes strictly monotonic is used for the strictly increasing or strictly decreasing cases. … ►For

f(x)

monotonic and

\phi(x)

integrable on

[a,b]

, there exists

c\in[a,b]

, such that …

6: 8.13 Zeros

… ►The negative zero

x_{-}(a)

decreases monotonically in the interval

-1<a<0

, and satisfies …

7: 9.8 Modulus and Phase

… ►

§9.8(iii) Monotonicity

…

8: 8.3 Graphics

… ►Some monotonicity properties of

\gamma^{*}\left(a,x\right)

and

\Gamma\left(a,x\right)

in the four quadrants of the (

a, x

)-plane in Figure 8.3.6 are given in Erdélyi et al. (1953b, §9.6). …

9: 23.20 Mathematical Applications

… ►The boundary of the rectangle

R

, with vertices

0

\omega_{1}

\omega_{1}+\omega_{3}

\omega_{3}

, is mapped strictly monotonically by

\wp

onto the real line with

0\to\infty

\omega_{1}\to e_{1}

\omega_{1}+\omega_{3}\to e_{2}

\omega_{3}\to e_{3}

0\to-\infty

. … ►The two pairs of edges

[0,\omega_{1}]\cup[\omega_{1},2\omega_{3}]

and

[2\omega_{3},2\omega_{3}-\omega_{1}]\cup[2\omega_{3}-\omega_{1},0]

R

are each mapped strictly monotonically by

\wp

onto the real line, with

0\to\infty

\omega_{1}\to e_{1}

2\omega_{3}\to-\infty

; similarly for the other pair of edges. …

10: 3.8 Nonlinear Equations

… ►

(a)

$f(x_{0})f^{\prime\prime}(x_{0})>0$ and $f^{\prime}(x)$ , $f^{\prime\prime}(x)$ do not change sign between $x_{0}$ and $\xi$ (monotonic convergence).

►

(b)

$f(x_{0})f^{\prime\prime}(x_{0})<0$ , $f^{\prime}(x)$ , $f^{\prime\prime}(x)$ do not change sign in the interval $(x_{0},x_{1})$ , and $\xi\in[x_{0},x_{1}]$ (monotonic convergence after the first iteration).

…