Gronwall-OuIang-Type Integral Inequalities on Time Scales

被引:0
作者
Ailian Liu
Martin Bohner
机构
[1] Shandong Economic University,School of Statistics and Mathematics
[2] Missouri University of Science and Technology,Department of Mathematics and Statistics
来源
Journal of Inequalities and Applications | / 2010卷
关键词
Chain Rule; Integral Inequality; Discrete Analogue; Nonoscillatory Solution; Nonnegative Constant;
D O I
暂无
中图分类号
学科分类号
摘要
We present several Gronwall-OuIang-type integral inequalities on time scales. Firstly, an OuIang inequality on time scales is discussed. Then we extend the Gronwall-type inequalities to multiple integrals. Some special cases of our results contain continuous Gronwall-type inequalities and their discrete analogues. Several examples are included to illustrate our results at the end.
引用
收藏
相关论文
共 13 条
  • [1] Yang-Liang O(1957)The boundedness of solutions of linear differential equations Advances in Mathematics 3 409-415
  • [2] Yang E(1998)On some nonlinear integral and discrete inequalities related to Ou-Iang's inequality Acta Mathematica Sinica 14 353-360
  • [3] Pachpatte BG(1994)On a certain inequality arising in the theory of differential equations Journal of Mathematical Analysis and Applications 182 143-157
  • [4] Pang PYH(1995)On an integral inequality and its discrete analogue Journal of Mathematical Analysis and Applications 194 569-577
  • [5] Agarwal RP(2008)New Gronwall-Ou-Iang type integral inequalities and their applications The ANZIAM Journal 50 111-127
  • [6] Cho YJ(1990)Analysis on measure chains—a unified approach to continuous and discrete calculus Results in Mathematics 18 18-56
  • [7] Kim Y-H(2007)Some nonlinear dynamic inequalities on time scales Proceedings of Indian Academy of Sciences. Mathematical Sciences 117 545-554
  • [8] Pečarić J(1979)The second law of thermodynamics and stability Archive for Rational Mechanics and Analysis 70 167-179
  • [9] Hilger S(1980)On a nonlinear convolution equation occurring in the theory of water percolation Annales Polonici Mathematici 37 223-229
  • [10] Li WN(undefined)undefined undefined undefined undefined-undefined
12