M. Sababheh, S. Furuichi, H. R. Moradi
Published 2020-03-24Version 1
Convex functions have played a major role in the field of Mathematical inequalities. In this paper, we introduce a new concept related to convexity, which proves better estimates when the function is somehow more convex than another. In particular, we define what we called $g-$convexity as a generalization of $\log-$convexity. Then we prove that $g-$convex functions have better estimates in certain known inequalities like the Hermite-Hadard inequality, super additivity of convex functions, the Majorization inequality and some means inequalities. Strongly related to this, we define the index of convexity as a measure of ``how much the function is convex". Applications including Hilbert space operators, matrices and entropies will be presented in the end.
GÂteaux-Differentiability of Convex Functions in Infinite Dimension
On new types of convex functions and their properties
Approximation of Lipschitz functions by $Δ$-convex functions in Banach spaces
![QR code for arXiv:2003.10892 [math.FA]](http://oss.arxitics.com/images/favicon.svg)