In this paper,by using the idea of the central projection it is shown that the geometric property of a class of planar quasi-homogeneous vector fields of degree n + 1 depends on their induced vector fields.By virtue of its induced vector field,it is proven that this vector field has 10 types of sector invariant fields with different topological classification.Furthermore,its global topological structure is discussed and it is shown that there are 13 types of different topological classification when n is even number and 12 types of...
