International Journal of Engineering, Science and Mathematics
  • Year: 2016
  • Volume: 5
  • Issue: 1

Analysis Maximum And Minimum Principles on Maximum Riemannian Manifolds

  • Author:
  • Mohamed M. Osman
  • Total Page Count: 9
  • Page Number: 210 to 218

Department of mathematics faculty of science, University of Al-Baha-Kingdom of Saudi Arabia

Online published on 22 August, 2016.

Abstract

In this paper uniform upper and lower continuous function on manifolds spaces with curvature bounds on and applications compact Riemannian boundary is complete with Ricci and we prove is spectral and Direct computatations on spectrum.

Keywords

Maximum and minimum principle, Dirichlet-Riemannian boundary operators Maximum principles, variable exponent storing week operators curvature, computation, variation principle positivity-hyper surfaces on Riemannian manifolds approximation, spectral and Direct on spectrum manifolds