Abstract
This paper discusses nonnegativity and positivity concepts and related properties for the state and
output trajectory solutions of dynamic linear time-invariant systems described by functional differential
equations subject to point time delays. The various nonnegativities and positivities are
introduced hierarchically from the weakest one to the strongest one while separating the corresponding properties when applied to the
state space or to the output space as well as for the zero-initial state or zero-input responses. The formulation
is first developed by defining cones for the input, state and output spaces of the dynamic system, and then
extended, in particular, to cones being the three first orthants each being of the corresponding dimension of
the input, state, and output spaces.