I. Introduction

In Many practical systems, variables are constrained to be nonnegative. Such constraints abound in physical systems where variables are used to represent levels of heat, population, and storage. For instance, age-structured populations described by certain Leslie models [6], compartmental models used in hydrology and biology applications, can be described by positive systems [13], [18], whose states and outputs are nonnegative whenever the initial condition and input signal are nonnegative. Since positive systems are defined on cones, not on linear spaces, many well-established results of general linear systems cannot be simply applied to positive systems. Therefore, in recent years, many researchers have shown their interests in positive systems and many fundamental results have been reported (see, for instance, [1]–[3], [7], [11], [12], [16], [17], [19], and [20] and the references therein).