INITIAL VALUE PROBLEM FOR FRACTIONAL ORDER EQUATION WITH CONSTANT COEFFICIENTS
Journal Title: Вестник КРАУНЦ. Физико-математические науки - Year 2016, Vol 4, Issue
Abstract
In this paper we construct an explicit representation of the solution of the Cauchy problem for ordinary differential equation of fractional order with Dzhrbashyan-Nersesyan operators.
Authors and Affiliations
Fatima Bogatyreva
Keywords
Related Articles
- EP ID EP487755
- DOI 10.18454/2079-6641-2016-16-4-1-21-26
- Views 114
- Downloads 0
REVERSALS IN THE 6-CELLS CONVECTION DRIVEN
We describe the large-scale model geodynamo, which based on indirect data of inhomogeneities in the density of the Earth’s core. Convection structure is associated with spherical harmonic Y24 , which defines the basic po...
DUFFING OSCILLATOR WITH AN EXTERNAL HARMONIC IMPACT AND DERIVED VARIABLES FRACTIONAL RIEMANN-LIOUVILLE, IS CHARACTERIZED BY VISCOUS FRICTION
The paper suggested a generalization of Duffing oscillator with viscous friction hereditarity, which is represented by the operator of fractional order derivative of the variable in the Riemann-Liouville. Built explicit...
A NONLOCAL BOUNDARY VALUE PROBLEM FOR A MIXED-TYPE EQUATION IN AN UNBOUNDED DOMAIN, WHICH IS PART OF AN ELLIPTIC RECTANGLE
In an article for mixed-type equation in an unbounded domain elliptic part is a rectangle, the unique solvability of a nonlocal boundary value problem. The uniqueness of the solution is proved by energy integrals, and th...
STATISTICAL ANALYSIS OF DISTURBANCE GEOACOUSTIC EMISSIONS IMMEDIATELY PRECEDING THE STRONG EARTHQUAKES IN KAMCHATKA
The results of statistical analysis of perturbations of geoacoustic emission using the method of superposed epoch. It is shown that 45,8% perturbation of geoacoustic emission arise in the daily range of 2,5 to strong ear...
GENERALIZED EQUATIONS OF MATHIEU
We consider a nonlocal model of the wave process, which generalizes the classical model parmetricheskogo resonance Mathieu. It is proved that this model has a unique solution.