A Graph Theoretic Approach to Strong Monotonicity with respect to Polyhedral Cones期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

按检索

A Graph Theoretic Approach to Strong Monotonicity with respect to Polyhedral Cones

Authors:	Kunze H Siegel D

Institution:	(1) Department of Mathematics and Statistics, University of Guelph, Guelph, Ontario, Canada, N1G 2W1;(2) Department of Applied Mathematics, University of Waterloo, Waterloo, Ontario, Canada, N2L 3G1

Abstract:	Consider the flow _t for the system of differential equations $\dot x\left( t \right) = f\left( x \right)$ , x, $\mathbb{R}$ ⁿ, open. Let K(t) be an expanding polyhedral cone of constant dimension, k be a unit vector in K(0), and x ₀. A sufficient condition for $\frac{{\partial \phi _t }}{{\partial k}}\left( {x_0 } \right)$ K(t) for t0 is that there exists an l so that Df(_t(x₀))+lI leaves K(t) invariant for all t0. If in addition (Df(_t(x₀))+lI)^n-1 takes k into the relative interior of K(t) for all t>0 then $\frac{{\partial \phi _t }}{{\partial k}}\left( {x_0 } \right)$ is in the relative interior of K(t) for all t>0. The latter condition for strong monotonicity may be cumbersome to check; a graph theoretic condition which can replace it is presented in this paper. Knowledge of the facial structure of K(t) is required. The results contained in this paper are extensions of the Kamke-Müller theorem and Hirsch's theorem for strong monotone flows. Applications from chemical kinetics and epidemiology are considered.

Keywords:	convex cones order preserving flow strongly monotone flow graph theory
本文献已被 SpringerLink 等数据库收录！

设为首页 | 免责声明 | 关于勤云 | 加入收藏