Volume 4,  Issue 3 (GI8), 2003

Article 56

SEPARATION AND DISCONJUGACY

R.C. BROWN

DEPARTMENT OF MATHEMATICS,
UNIVERSITY OF ALABAMA-TUSCALOOSA,
AL 35487-0350, USA.
E-Mail: dbrown@gp.as.ua.edu

Received 21 November, 2001; Accepted 25 March, 2003.
Communicated by: A.M. Fink


ABSTRACT.    The triangle inequality $ \Vert \mathbf{x} + \mathbf{y} \Vert \leq
( \Vert\mathbf{x}\Vert + \Vert\mathbf{y}\Vert)$ is well-known and fundamental. Since the 8th General Inequalities meeting in Hungary (September 15-21, 2002), the author has been considering an idea that as triangle inequality, the inequality $ \Vert \mathbf{x} + \mathbf{y} \Vert^2 \leq 2( \Vert\mathbf{x}%
\Vert^2 + \Vert\mathbf{y}\Vert^2)$ may be more suitable. The triangle inequality $ \Vert \mathbf{x} + \mathbf{y} \Vert^2 \leq 2( \Vert\mathbf{x}%
\Vert^2 + \Vert\mathbf{y}\Vert^2)$ will be naturally generalized for some natural sum of any two members $ \mathbf{f}_j$ of any two Hilbert spaces $ %
\mathcal{H}_j$. We shall introduce a natural sum Hilbert space for two arbitrary Hilbert spaces.
Key words:
Separation, Symmetric second order differential operator, Disconjugacy, Limit-point.

2000 Mathematics Subject Classification:
Primary: 26D10, 34C10; Secondary 34L99, 47E05.


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Report of the General Inequalities 8 Conference; September 15-21, 2002, Noszvaj, Hungary
Compiled by Zsolt Páles

Convolution Inequalities and Applications
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The Hardy-Landau-Littlewood Inequalities with Less Smoothness
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Continuity Properties of Convex-type Set-Valued Maps
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Carleman's Inequality - History, Proofs and Some New Generalizations
Maria Johansson, Lars-Erik Persson and Anna Wedestig

Andersson's Inequality and Best Possible Inequalities
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On Some Results Involving the Cebysev Functional and its Generalisations
P. Cerone

Separation and Disconjugacy
R.C. Brown

New Norm Type Inequalities for Linear Mappings
Saburou Saitoh

An Integral Approximation in Three Variables
A. Sofo

On Some Spectral Results Relating to the Relative Values of Means
C.E.M. Pearce

On Zeros of Reciprocal Polynomials of Odd Degree
Piroska Lakatos and László Losonczi

Some New Hardy Type Inequalities and their Limiting Inequalities
Anna Wedestig

Generalizations of the Triangle Inequality
Saburou Saitoh

A Survey on Cauchy-Bunyakovsky-Schwarz Type Discrete Inequalities
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