Hyperplans poissoniens et compacts de Steiner
1974 ◽
Vol 6
(03)
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pp. 563-579
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Keyword(s):
A compact convex set in RN is Steiner if it is a finite Minkowski sum of line segments, or a limit of such finite sums, and then satisfies an extension of the Steiner formula. With each Poisson hyperplane stationary process A is uniquely associated a Steiner set M, and for any linear variety V, the Steiner set associated with is the projection of M on V. The density of the order k network Ak (i.e., the set of the intersections of k hyperplanes belonging to A) is linked with simple geometrical properties of M. In the isotropic case, the expression of the covariance measures associated with Ak is derived and compared with the analogous results obtained for (N — k)-dimensional Poisson flats.
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1974 ◽
Vol 11
(01)
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pp. 184-189
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2001 ◽
Vol 70
(3)
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pp. 323-336
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Keyword(s):
1984 ◽
Vol 16
(02)
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pp. 324-346
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1984 ◽
Vol 27
(2)
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pp. 233-237
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1988 ◽
Vol 37
(2)
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pp. 177-200
1996 ◽
Vol 28
(02)
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pp. 384-393
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1985 ◽
Vol 17
(02)
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pp. 308-329
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