On pairs of non measurable linear varieties in A$_{n}$

G. Raguso and L. Rella

Abstract: We consider a family of varieties, where each variety is a pair consisting of a hyperplane and a straight line in $n$-dimensional affine space $A_{n}$, where $n\geq 3$. Using Stoka's second condition, we show that this family is not measurable, therefore it is an example of a family of varietes in the sense of Dulio's classification [D].

[D] Dulio, P.: Some results on the Integral Geometry of unions of indipendent families. Rev. Colombiana Mat. {\bf 31}(2) (1997), 99--108.

Keywords: Integral geometry

Classification (MSC2000): 53C65

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