Related papers: Golden-Thompson from Davis
We obtain simple proofs of certain inequalites for bivariate means.
In this paper,we will give an easy example to satisfy that we can not conclude CDE' Inequality just from the CD Inequality.
The original Ando-Hiai and Golden-Thompson inequalities present comparisons for the operator geometric mean $\sharp_v$ when $0\leq v\leq 1.$ Our main target in this article is to study these celebrated inequalities for means other than the…
We extend a result of Levin and Ste\v{c}kin concerning an inequality analogous to Hardy's inequality.
We show that an inequality related to Newton's inequality provides one more relation between skewness and kurtosis. This also gives simple and alternative proofs of the bounds for skewness and kurtosis.
A simple proof of the weighted two variable geometric-arithmetic a mean inequality based on one given earlier valid only for integer weights
A generalization of an inequality from IMO is proven.
We give lower bounds on the case of worst inhomogeneous approximation.
The purpose of this article is to establish the dual version of the uniform cover inequality of Bollobas and Thomason.
We study an inequality suggested by Littlewood, our result refines a result of Bennett.
In this paper, we first provide a better estimate of the second inequality in Hermite-Hadamard inequality. Next, we study the reverse of the celebrated Davis-Choi-Jensen's inequality. Our results are employed to establish a new bound for…
We present a relative form of the Toponogov comparison theorem.
In this note we prove an inequality involving primes and the product of consecutive primes.
In this paper we present a short and elementary proof for the error in Simpson's rule.
We prove that the sequences generate by the Douglas-Rachford method converge weakly to a solution of the inclusion problem
In this paper, an inequality of Simpson type for quasi-convex mappings are proved. The constant in the classical Simpson's inequality is improved. Furthermore, the obtained bounds can be (much) better than some recently obtained bounds.…
We give conditions on a knot on which the Morton-Franks-Williams inequality is not sharp. As applications, we show infinitely many examples of knots where the inequality is not sharp and also prove (by giving examples) that the deficit of…
In this paper we present some reverses of the Golden-Thompson type inequalities: Let $H$ and $K$ be Hermitian matrices such that $ e^s e^H \preceq_{ols} e^K \preceq_{ols} e^t e^H$ for some scalars $s \leq t$, and $\alpha \in [0 , 1]$. Then…
We improve constants in the Rademacher-Menchov inequality.
We prove the Levin-Ste\v{c}kin inequality using Chebyshev's inequality and symmetrization. Symmetry and slightly modified Chebyshev's inequality are also the key to an elementary proof of Clausing's inequality .