History of algebraic invariant theory

The conventional studies of algebraic invariants and geometrical properties are that these invariants are derived for planar objects using points,lines from one single image.

The algebraic invariant is an important subject in mathematical field; and it is an important tool to other fields.

In this paper, the relation between invariant -algebra and tail -algebra ofjump processes in investigated, and from which, it is obtained that sufficient and necessaryconditions for existence of successful coupling for jump processes with regular q-pairs is thatall bounded harnionic functions for jump processes are constant.