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 An, where n 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 [6] . MSC 2000: 53C65 Keywords: Integral geometry
On Pair of Non Measurable Linear Varieties in An
RAGUSO, Grazia;
2006-01-01
Abstract
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 An, where n 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 [6] . MSC 2000: 53C65 Keywords: Integral geometryFile in questo prodotto:
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