The Eigenvalues and the Eigenfunctions of the Sturm-Liouville Fuzzy Boundary Value Problem According To the Generalized Differentiability
Journal Title: Scholars Journal of Physics, Mathematics and Statistics - Year 2017, Vol 4, Issue 4
Abstract
In this paper, the eigenvalues and the eigenfunctions of the fuzzy Sturm-Liouville fuzzy boundary value problem equation is examined under the approach of generalized differentiability. Different examples are solved for these problems.
Authors and Affiliations
Hülya Gültekin Çitil
Keywords
Related Articles
- EP ID EP385894
- DOI -
- Views 54
- Downloads 0
Survey of Attitudes toward Statisticsfor BusinessUndergraduates
In business education, statistics course has traditionally been taught at the undergraduate level curriculum to enable them to design, present, analyze, and interpret data in their field and will serve asbasis in making...
Properties of Solutions for a Degenerate Parabolic Equationwith Nonlinear Sources
In this paper existence of a unique classical nonnegative solution is established and the sufficientconditions for the solutionthat exists globally or blows up in finite time are obtained for thedegenerate parabolic prob...
Integer Points on the Hyperbola
The binary quadratic equation representing hyperbola is considered. Different patterns of solutions are obtained. A few relations between the solutions are exhibited.
Transport Modeling at Macro Level: Some Results for Odisha
The central motive of this article is to study adopting multiple regression technique to reflect the effects of some socio-economic indicators on transport system. It is found that socio-economic indicators like agricult...
On The Ternary Quadratic Diophantine Equation x2+ y2-xy=103z2
The ternary quadratic Diophantine equation represented by is analyzed for its non-zero distinct integer solutions. A few interesting properties between the solutions and special figurate numbers are obtained.