= Cantor algebra
{wiki=Cantor_algebra}
Cantor algebra is a type of algebraic structure associated with the Cantor set, which is an important object in topology and measure theory. The Cantor set itself is a well-known example of a fractal and is constructed by repeatedly removing the middle third of a line segment. The concept of Cantor algebra often refers to certain algebraic systems or structures that can be constructed using the Cantor set, particularly in the context of functional analysis, measure theory, or logic.
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