Circular symmetrization

A geometrical transformation of an open (closed) set $ G $ in the plane, relative to a ray $ \lambda $ emanating from a point $ P $, onto a set $ G ^ {*} $ in the same plane defined as follows: 1) the intersection of $ G ^ {*} $ with some circle with centre at $ P $ is either empty or is the entire circle, depending on whether the intersection of $ G $ with the same circle is empty or the entire circle, respectively; and 2) if the intersection of $ G $ with a circle with centre at $ P $ has angular Lebesgue measure $ \Phi $, then the intersection of $ G ^ {*} $ with the same circle is an open (closed) arc intersecting $ \lambda $, symmetric about $ \lambda $ and visible from $ P $ at angle $ \Phi $.

The above definition carries over in a natural way to the three-dimensional case (symmetrization relative to a half-plane). See also Symmetrization.

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