A subset of a vector space is said to be absorbing if for any , there exists a scalar such that
where is the underlying scalar field of and where the notation denotes the set
Sets which are absorbing are sometimes said to be radical at .
A subset of a vector space is said to be absorbing if for any , there exists a scalar such that
where is the underlying scalar field of and where the notation denotes the set
Sets which are absorbing are sometimes said to be radical at .
This entry contributed by Christopher Stover
Stover, Christopher. "Absorbing Set." From MathWorld--A Wolfram Web Resource, created by Eric W. Weisstein. https://mathworld.wolfram.com/AbsorbingSet.html