Local boundedness of Catlin q-type

Abstract

In [6], D'Angelo introduced the notion of finite type for points p of a real hypersurface M of Cn by defining the order of contact q(M,p) of complex analytic q-dimensional varieties with M at p. Later, Catlin [4] defined q-type, Dq(M,p) for points of hypersurfaces by considering generic (n-q+1)-dimensional complex affine subspaces of Cn. We define a generalization of the Catlin's q-type for an arbitrary subset M of Cn in a similar way that D'Angelo's 1-type, 1(M,p), is generalized in [13]. Using recent results connecting the D'Angelo and Catlin q-types in [1] and building on D'Angelo's work on the openness of the set of points of finite q-type, we prove the openness of the set of points of finite Catlin q-type for an arbitrary subset M⊂ Cn.