Tensor Products, Positive Linear Operators, and Delay-Differential Equations

Abstract

We develop the theory of compound functional differential equations, which are tensor and exterior products of linear functional differential equations. Of particular interest is the equation x(t)=-α(t)x(t)-β(t)x(t-1) with a single delay, where the delay coefficient is of one sign, say δβ(t) 0 with δ∈-1,1. Positivity properties are studied, with the result that if (-1)k=δ then the k-fold exterior product of the above system generates a linear process which is positive with respect to a certain cone in the phase space. Additionally, if the coefficients α(t) and β(t) are periodic of the same period, and β(t) satisfies a uniform sign condition, then there is an infinite set of Floquet multipliers which are complete with respect to an associated lap number. Finally, the concept of u0-positivity of the exterior product is investigated when β(t) satisfies a uniform sign condition.