Dieudonné determinant linear algebra , the Dieudonné determinant is a generalization of the determinant of a matrix to matrices over division rings and local rings . It was introduced by.K is a division ring , then the Dieudonné determinant is a homomorphism of groups from the group GL n n by n matrices over K onto the abelianization K × / of the multiplicative group K × of K .Properties Let R be a local ring . There is a determinant map from the matrix ring GL to the abelianised unit group R × ab with the following properties: The determinant is invariant under elementary row operations The determinant of the identity is 1 If a row is left multiplied by a in R × then the determinant is left multiplied by a The determinant is multiplicative: det = detdet If two rows are exchanged, the determinant is multiplied by −1 If R is commutative, then the determinant is invariant under transposition Assume that K is finite over its centre F . The reduced norm gives a homomorphism N n n F × . We also have a homomorphism from GLn F × obtained by composing the Dieudonné determinant from GLn K × / with the reduced norm N 1 from GL1 = K × to F × via the abelianization.Tannaka–Artin problem is whether these two maps have the same kernel SLn F is locally compact but false in general.
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