A BOUNDARY VALUE PROBLEM FOR LOADED DIFFERENTIAL EQUATION WITH THE BARRETT OPERATOR IN THE MAIN PART
Journal Title: Вестник КРАУНЦ. Физико-математические науки - Year 2016, Vol 4, Issue
Abstract
In this paper, we study the boundary value problem for loaded differential equations of fractional order with the Barrett operator in the main part.
Authors and Affiliations
Rita Berezgova
Keywords
Related Articles
- EP ID EP487482
- DOI 10.18454/2079-6641-2016-15-4-7-11
- Views 81
- Downloads 0
NUMERICAL ANALYSIS SOME OSCILLATION EQUATIONS WITH FRACTIONAL ORDER DERIVATIVES
The paper presents a mathematical model of non-classical dynamic systems. A numerical method of difference schemes, depending on various parameters of the system were found numerical solutions of models. The phase trajec...
INSTRUCTIONAL TECHNIQUES CREATIVE APPROACH IN TEACHING THEORY IMAGES
The article describes some aspects of a creative approach to teaching the theory of images.
THE FIRST BOUNDARY VALUE PROBLEM FOR THE NON-HOMOGENEOUS HALLAIRE EQUATION
First boundary value problem is investigated for the Hallaire inhomogeneous equation. With the help of the Fourier method we have found an explicit representation of a regular solution.
SYMMETRY CLASSIFICATION OF NEWTONIAN INCOMPRESSIBLEFLUID’S EQUATIONS FLOW IN TURBULENT BOUNDARY LAYERS
Lie group method is applicable to both linear and non-linear partial differential equations, which leads to find new solutions for partial differential equations. Lie symmetry group method is applied to study Newtonian i...
EARTH’S ELECTROMAGNETIC FIELD BY OBSERVATIONS IN BURYATIA
The data obtained by the World Wide Lightning Location Network (WWLLN) in the territory of Zabaykal’e are compared with the data received by the equipment for observations of Earth’s natural pulse electromagnetic field i...