Welcome to Anagrammer Crossword Genius! Keep reading below to see if redictive is an answer to any crossword puzzle or word game (Scrabble, Words With Friends etc). Scroll down to see all the info we have compiled on redictive.
redictive
Searching in Crosswords ...
The answer REDICTIVE has 0 possible clue(s) in existing crosswords.
Searching in Word Games ...
The word REDICTIVE is NOT valid in any word game. (Sorry, you cannot play REDICTIVE in Scrabble, Words With Friends etc)
There are 9 letters in REDICTIVE ( C3D2E1I1R1T1V4 )
To search all scrabble anagrams of REDICTIVE, to go: REDICTIVE?
Rearrange the letters in REDICTIVE and see some winning combinations
Scrabble results that can be created with an extra letter added to REDICTIVE
9 letters out of REDICTIVE
8 letters out of REDICTIVE
6 letters out of REDICTIVE
5 letters out of REDICTIVE
4 letters out of REDICTIVE
3 letters out of REDICTIVE
Searching in Dictionaries ...
Definitions of redictive in various dictionaries:
No definitions found
Word Research / Anagrams and more ...
Keep reading for additional results and analysis below.
Redictive might refer to |
---|
In mathematics, a reductive group is a type of linear algebraic group over a field. One definition is that a connected linear algebraic group G over a perfect field is reductive if it has a representation with finite kernel which is a direct sum of irreducible representations. Reductive groups include some of the most important groups in mathematics, such as the general linear group GL(n) of invertible matrices, the special orthogonal group SO(n), and the symplectic group Sp(2n). Simple algebraic groups and (more generally) semisimple algebraic groups are reductive. * Claude Chevalley showed that the classification of reductive groups is the same over any algebraically closed field. In particular, the simple algebraic groups are classified by Dynkin diagrams, as in the theory of compact Lie groups or complex semisimple Lie algebras. Reductive groups over an arbitrary field are harder to classify, but for many fields such as the real numbers R or a number field, the classification is well understood. The classification of finite simple groups says that most finite simple groups arise as the group G(k) of k-rational points of a simple algebraic group G over a finite field k, or as minor variants of that construction. * Reductive groups have a rich representation theory in various contexts. First, one can study the representations of a reductive group G over a field k as an algebraic group, which are actions of G on k-vector spaces. But also, one can study the complex representations of the group G(k) when k is a finite field, or the infinite-dimensional unitary representations of a real reductive group, or the automorphic representations of an adelic algebraic group. The structure theory of reductive groups is used in all these areas. |