Tangent Fields and the Local Structure of Random Fields |
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| Authors: | Kenneth J. Falconer |
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| Affiliation: | (1) Mathematical Institute, University of St. Andrews, North Haugh, St. Andrews, Fife, KY16 9SS, Scotland |
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| Abstract: | A tangent field of a random field X on  N at a point z is defined to be the limit of a sequence of scaled enlargements of X about z. This paper develops general properties of tangent fields, emphasising their rich structure and strong invariance properties which place considerable constraints on their form. The theory is illustrated by a variety of examples, both of a smooth and fractal nature. |
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| Keywords: | Tangent fields random fields fractional brownian fields self-similar processes strong invariance |
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