Title :
Positive Solutions for Quasilinear Second Order Differential Equation
Author :
Dong, Shijie ; Gao, Zhifeng ; Wang, Yunhai
Author_Institution :
Mech. Eng. Coll., Shijiazhuang
fDate :
July 30 2007-Aug. 1 2007
Abstract :
It is well known that Krasnose´skii fixed point theorem is very important. It was extensively used for studying the boundary value problems. In this paper, Krasnose´skii fixed point theorem is extended. A new fixed point theorem is obtained. The second order quasilinear differential equation (Phi(y´))´ + a(t)f(t,y,y´) = 0, 0 < t < 1 subject to Dirichlet boundary condition is studied, where f is a non-negative continuous function, Phi(v) = |v|p-2v, p > 1. We show the existence of at least one positive solution by using the new fixed point theorem in cone.
Keywords :
boundary-value problems; fixed point arithmetic; linear differential equations; Dirichlet boundary condition; fixed point theorem; nonnegative continuous function; second order quasilinear differential equation; Artificial intelligence; Boundary conditions; Boundary value problems; Differential equations; Distributed computing; Educational institutions; Hydrogen; Mathematics; Mechanical engineering; Software engineering;
Conference_Titel :
Software Engineering, Artificial Intelligence, Networking, and Parallel/Distributed Computing, 2007. SNPD 2007. Eighth ACIS International Conference on
Conference_Location :
Qingdao
Print_ISBN :
978-0-7695-2909-7
DOI :
10.1109/SNPD.2007.158
