Although they play a fundamental role in nearly all branches of mathematics, inequalities
are usually obtained by ad hoc methods rather than as consequences of some underlying …

The idea for this book came from the time the authors spent at the Statistics and Applied
Mathematical Sciences Institute (SAMSI) in Research Triangle Park in North Carolina …

The last treatise on the theory of determinants, by T. Muir, revised and enlarged by WH
Metzler, was published by Dover Publications Inc. in 1960. It is an unabridged and corrected …

Abstract In 1893 Jacques Hadamard introduced the famous inequality concerning the
determinant of the Gram matrix. The generalizations of this inequality are the main subject of …

Hermite–Hadamard-type inequalities for generalized convex functions Page 1 Hermite–Hadamard-type
inequalities for generalized convex functions doktori (Ph.D.) értekezés Bessenyei Mihaly …

The objective of this paper is to propose a method for evaluating fault identifiability in linear
discrete time-varying systems. The basic idea of this method is to quantify the difficulty in …

A Ducci sequence is the sequence {X, DX, D 2 X,...} generated by n-tuples X=(x 1, x 2,...,
xn)∈ Z n, where DX= D (x 1, x 2,..., xn)=(| x 2− x 1|,| x 3− x 2|,...,| xn− x 1|). Equivalently, the …

The coverage probability (CP) and the average rate expressions when fractional frequency
reuse (FFR) or soft frequency reuse (SFR) schemes are employed in single-input–multiple …

Bounds for various functions of the eigenvalues of a Hermitian matrix A, based on the traces
of A and A 2, are improved. A technique is presented whereby these bounds can be …

Let I be a real interval, that is, a nonempty, connected and bounded subset of R. An n-
dimensional Chebyshev system on I consists of a set of real valued continuous functions …