ON THE HYER-ULAM STABILITY OF THE ARITHMETIC AND GEOMETRIC MEANS
Journal Title: Journal of Science And Arts - Year 2009, Vol 11, Issue 2
Abstract
We prove the Hyers-Ulam stability of the classical means using the stability of Jensen equation.
Authors and Affiliations
Vasile Pop
Keywords
Related Articles
- EP ID EP129151
- DOI -
- Views 242
- Downloads 0
EXACT SOLUTIONS OF AN UNSTEADY CONDUCTING DUSTY FLUID FLOW BETWEEN NON-TORSIONAL OSCILLATING PLATE AND A LONG WAVY WALL
Frenet frames are a central construction in modern differential geometry, in which the structure is described with respect to an object of interest rather than with respect to external coordinate systems. In the present...
INTERACTION OF ULTRASOUND WITH BIOLOGICAL MATERIALS
This paper deals with medical applications of focused ultrasound in minimally invasive treatment of a variety of disorders. The pressure distributions generated by plane as well as focused ultrasound beams are presented....
SOLUTION OF TIME INDEPENDENT SCHRÖDINGER EQUATION FOR THE QUANTUM HARMONIC OSCILLATOR USING FRACTIONAL HARTLEY TRANSFORM
In this paper we have proved some operation transform formulae for fractional Hartley transform in section 2. Solution of Time Independent Schrödinger Equation for the Quantum Harmonic Oscillator was found using the abov...
NEW BOUNDS FOR A CONVERGENCE BY DETEMPLE
The aim of this paper is to improve results of DeTemple [A quicker convergence to Euler's constant Amer. Math. Monthly 100 (1993) 468—470] about the defining sequence of the Euler-Mascheroni constant.
FINITENESS PROPERTIES FOR THE PATH COALGEBRA ASSOCIATED TO A POSET
Let P be a partially ordered set (poset) locally finite and kQ the path coalgebra over a field k associated to P. In this paper we investigate finiteness properties of this coalgebra by using an injective morphism of coa...