In geometric measure theory, Falconer's conjecture, named after Kenneth Falconer, is an unsolved problem concerning the sets of Euclidean distances between points in compact -dimensional spaces. Intuitively, it states that a set of points that is large in its Hausdorff dimension must determine a set of distances that is large in measure. More precisely, if is a compact set of points in -dimensional Euclidean space whose Hausdorff dimension is strictly greater than , then the conjecture states that the set of distances between pairs of points in must have nonzero Lebesgue measure.
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| - Vermutung von Falconer (de)
- Falconer's conjecture (en)
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| - In der Mathematik ist die Vermutung von Falconer eine 1985 von Kenneth J. Falconer aufgestellte Vermutung, die beantworten soll, wie groß die Dimension einer Menge sein muss, damit die Menge ihrer Abstände positives Volumen hat. Sie verallgemeinert den Satz von Steinhaus. Die Vermutung von Falconer besagt, dass für eine kompakte Menge der Hausdorff-Dimension größer als die Menge positives Lebesgue-Maß hat. (de)
- In geometric measure theory, Falconer's conjecture, named after Kenneth Falconer, is an unsolved problem concerning the sets of Euclidean distances between points in compact -dimensional spaces. Intuitively, it states that a set of points that is large in its Hausdorff dimension must determine a set of distances that is large in measure. More precisely, if is a compact set of points in -dimensional Euclidean space whose Hausdorff dimension is strictly greater than , then the conjecture states that the set of distances between pairs of points in must have nonzero Lebesgue measure. (en)
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| - In der Mathematik ist die Vermutung von Falconer eine 1985 von Kenneth J. Falconer aufgestellte Vermutung, die beantworten soll, wie groß die Dimension einer Menge sein muss, damit die Menge ihrer Abstände positives Volumen hat. Sie verallgemeinert den Satz von Steinhaus. Die Vermutung von Falconer besagt, dass für eine kompakte Menge der Hausdorff-Dimension größer als die Menge positives Lebesgue-Maß hat. (de)
- In geometric measure theory, Falconer's conjecture, named after Kenneth Falconer, is an unsolved problem concerning the sets of Euclidean distances between points in compact -dimensional spaces. Intuitively, it states that a set of points that is large in its Hausdorff dimension must determine a set of distances that is large in measure. More precisely, if is a compact set of points in -dimensional Euclidean space whose Hausdorff dimension is strictly greater than , then the conjecture states that the set of distances between pairs of points in must have nonzero Lebesgue measure. (en)
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