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Mathematical inequalities play an important role in almost all branches of mathe-
matics as well as in other areas of science. The basic work ”Inequalities” by Hardy,
Littlewood and Polya appeared 1934 and the books ”Inequalities” by Beckenbach
and Bellman published in 1961 and ”Analytic inequalities” by Mitronovic published
in 1970 made considerable contribution to this field and supplied motivation, ideas,
techniques and applications. This theory in recent years has attached the attention of
large number of researchers, stimulated new research directions and influenced various
aspect of mathematical analysis and applications. Since 1934 an enormous amount
of effort has been devoted to the discovery of new types of inequalities and the ap-
plication of inequalities in many part of analysis. The usefulness of Mathematical
inequalities is felt from the very beginning and is now widely acknowledged as one
of the major deriving forces behind the development of modern real analysis. This
Ph.D thesis deals with the inequalities for Bregman and Burbea-Rao divergences and
some of its related inequalities, namely Jensen’s inequality, majorization inequality,
Slater’s inequality and inequalities obtained by Mati ́ and Peˇari ́.
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The first chapter contains a survey of basic concepts, indications and results from
theory of convex functions and theory of inequalities used in subsequent chapters to
which we refer as the known facts.
In the second chapter we give an improvement of Jensen’s inequality for convex
monotone function and various applications for related inequalities and divergences.
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In the third chapter we give Sapogov’s extension of Cebyˇev’s inequality and use
this extension to prove majorization inequality. We also give mean value theorems
for majorization inequality. As application, we present a class of Cauchy’s means and
prove logarithmic convexity for differences of power means.
In the fourth chapter we generalize some results of Mati ́ and Peˇari ́. We use a
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log-convexity criterion and establish improvements and reverses of Slater’s and related
inequalities.
In the fifth chapter we give Bregman and Burbea-Rao divergences for double in-
tegrals and matrices. We derive mean-value theorems for the divergences induced by
C 2 -functions. As application, we present certain Cauchy type means. We prove pos-
itive semi-definiteness of the matrices generated by these divergences which implies
exponential convexity and log-convexity of the divergences. Also show the mono-
tonicity of the corresponding means of Cauchy type. At the end we consider integral
power means.
In the sixth chapter we give several results for functions of two variables and
majorized matrices by using continuous convex functions and Green function. We
prove mean value theorems and give generalized Cauchy means. We give applications
of those generalized means and show that they are monotonic. We prove positive
semi-definiteness of matrices generated by differences deduced from the majorization
inequalities for double integrals and majorized matrices which implies exponential
convexity and log-convexity of these differences. |
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