Minkowski content

The Minkowski content (named after Hermann Minkowski), or the 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 the space, to arbitrary measurable sets.

It is typically applied to fractal boundaries of domains in the Euclidean space, but it can also be used in the context of general metric measure spaces.

It is related to, although different from, the Hausdorff measure.

Definition

For , and each integer m with , the m-dimensional upper Minkowski content is

and the m-dimensional lower Minkowski content is defined as

where is the volume of the (nm)-ball of radius r and is an -dimensional Lebesgue measure.

If the upper and lower m-dimensional Minkowski content of A are equal, then their common value is called the Minkowski content Mm(A).[1][2]

Properties

See also

Footnotes

References

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