- high-level
system on its components;
qualities produced this way are
irreducible to the system's
constituent parts. The
whole is
other than the sum of...
-
number theory, Hilbert's
irreducibility theorem,
conceived by
David Hilbert in 1892,
states that
every finite set of
irreducible polynomials in a finite...
- Stephen, "Com****tional
irreducibility". A New Kind of Science. Wolfram, Stephen, "History of com****tional
irreducibility". A New Kind of Science. Wolfram...
- Look up
irreducibility in Wiktionary, the free dictionary.
Irreducibility is the
philosophical principle that a
complete account of an
entity is not possible...
- Eisenstein's
criterion Perron's
irreducibility criterion Hilbert's
irreducibility theorem Cohn's
irreducibility criterion Irreducible component of a topological...
-
specifically in the
representation theory of
groups and algebras, an
irreducible representation ( ρ , V ) {\displaystyle (\rho ,V)} or
irrep of an algebraic...
-
definition of
irreducibility and
irreducible components extends immediately to schemes. In a
Hausdorff space, the
irreducible subsets and the
irreducible components...
-
integer coefficients that are
irreducible over the
rational numbers, but it does
allow in
certain important cases for
irreducibility to be
proved with very little...
- In mathematics, the
concept of
irreducibility is used in
several ways. A
polynomial over a
field may be an
irreducible polynomial if it
cannot be factored...
- Cohn's
irreducibility criterion is a
sufficient condition for a
polynomial to be
irreducible in Z [ x ] {\displaystyle \mathbb {Z} [x]} —that is, for...
