A geometrical approach to compute loop-free petri net place invariant;

And a sufficient and necessary condition for the existence of place invariants for a class of Petri net is proved.

The relations between path gain and place invariants and between paths, basic circles and their corresponding place invariants are presented.

In this paper it is shown that an improvement of Holder s inequality can be established by introducing a concept of variable unit-vector and by the help of the positive definiteness of Gram matrix.

A concept of a variable unit-vector is introduced.