Minkowski content Minkowski content boundary measure , of a set is a basic concept that uses concepts from geometry and measure theory to generalize the notions of length of a smooth curve in the plane , and area of a smooth surface in space , to arbitrary measurable sets. fractal boundaries of domains in the Euclidean space , but it can also be used in the context of general metric measure spaces.Hausdorff measure .Definition For, and each integer m with, the m-dimensional upper Minkowski content is m-dimensional lower Minkowski content is defined asthe volume of the -ball of radius r and is an -dimensional Lebesgue measure . m -dimensional Minkowski content of A are equal , then their common value is called the Minkowski content M m Properties The Minkowski content is not a measure. In particular, the m -dimensional Minkowski content in R n is not a measure unless m = 0, in which case it is the counting measure . Indeed, clearly the Minkowski content assigns the same value to the set A as well as its closure . If A is a closed m -rectifiable set in R n image of a bounded set from R m Lipschitz function , then the m -dimensional Minkowski content of A exists , and is equal to the m -dimensional Hausdorff measure of A .Footnotes
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