Nonlinear oscillation of certain third-order neutral differential equation with distributed delay
Sathish Kumar
Marappan
Paavai Engineering College (Autonomous)
Paavai Institutions,
Paavai Nagar, NH-7,
Pachal -637 018.
Namakkal Dist. Tamilnadu,
India.
author
Ganesan
V
Department of Mathematics,
Aringar Anna Government Arts College, Namakkal-637002,
Tamilnadu, India.
author
Janaki
S
Deputy Directorate of statistics,
Government of Tamil Nadu,
Namakkal-637003, Tamil Nadu, India.
author
Osama
Moaaz
Department of Mathematics,
Faculty of Science,
Mansoura University,
Mansoura, 35516, Egypt.
author
text
article
2018
eng
The authors obtain necessary and sufficient conditions for the existence of oscillatory solutions with a specified asymptotic behavior of solutions to a nonlinear neutral differential equation with distributed delay of third order. We give new theorems which ensure that every solution to be either oscillatory or converges to zero asymptotically. Examples dwelling upon the importance of applicability of these results.
Journal of Mahani Mathematical Research Center
Shahid Bahonar University of Kerman
2251-7952
7
v.
1
no.
2018
1
12
http://jmmrc.uk.ac.ir/article_1952_fdc230aad0e65c21c4a52d14c10d29ff.pdf
dx.doi.org/10.22103/jmmrc.2018.11248.1052
Some results on convergence and existence of best proximity points
Marzieh
Ahmadi Baseri
Yazd University
author
H.
Mazaheri
Yazd University
author
T. D
Narang
Guru Nanak Dev University
author
text
article
2018
eng
In this paper, we introduce generalized cyclic φ-contraction maps in metric spaces and give some results of best proximity points of such mappings in the setting of a uniformly convex Banach space. Moreover, we obtain convergence and existence results of proximity points of the mappings on reflexive Banach spaces
Journal of Mahani Mathematical Research Center
Shahid Bahonar University of Kerman
2251-7952
7
v.
1
no.
2018
13
24
http://jmmrc.uk.ac.ir/article_2055_6bcf15495105392fcbe4e154e8350936.pdf
dx.doi.org/10.22103/jmmrc.2018.10747.1045
A TAXICAB VERSION OF A TRIANGLE' S APOLLONIUS CIRCLE
Temel
ERMİŞ
Department of Mathematics and Computer Sciences, Faculty of Arts and Sciences, Eskişehir Osmangazi University, Eskişehir, TURKEY
author
Ozcan
Gelişgen
Deparment of Mathematics and Computer Sciences, Faculty of Art and Sciences, Eskişehir Osmangazi University, Eskişehir, TURKEY
author
Aybuke
Ekici
Deparment of Mathematics and Computer Sciences, Faculty of Art and Sciences, Eskişehir Osmangazi University, Eskişehir, TURKEY
author
text
article
2018
eng
One of the most famous problems of classical geometry is the Apollonius' problem asks construction of a circle which is tangent to three given objects. These objects are usually taken as points, lines, and circles. This well known problem was posed by Apollonius of Perga ( about 262 - 190 B.C.) who was a Greek mathematician known as the great geometer of ancient times after Euclid and Archimedes. The Apollonius' problem can be reduced specically to the question \Is there the circle that touches all three excircles of given triangle and encompasses them? " when all three objects are circles. In literature, altough there are a lot of works on the solution of this question in the Euclidean plane, there is not the work on this question in different metric geometries. In this paper, we give that the conditions of existence of Apollonius taxicab circle for any triangle.
Journal of Mahani Mathematical Research Center
Shahid Bahonar University of Kerman
2251-7952
7
v.
1
no.
2018
25
36
http://jmmrc.uk.ac.ir/article_2073_c7f14ca1b6a6c894e370b7160e394b3a.pdf
dx.doi.org/10.22103/jmmrc.2018.2073