5 research outputs found
Classification of affine operators up to biregular conjugacy
Let f(x)=Ax+b and g(x)=Cx+d be two affine operators given by n-by-n matrices
A and C and vectors b and d over a field F. They are said to be biregularly
conjugate if hf=gh for some bijection h: F^n-->F^n being biregular, this means
that the coordinate functions of h and h^{-1} are polynomials. Over an
algebraically closed field of characteristic 0, we obtain necessary and
sufficient conditions of biregular conjugacy of affine operators and give a
canonical form of an affine operator up to biregular conjugacy. These results
for bijective affine operators were obtained by J.Blanc [Conjugacy classes of
affine automorphisms of K^n and linear automorphisms of P^n in the Cremona
groups, Manuscripta Math. 119 (2006) 225-241]
Topological classification of affine operators on unitary and Euclidean spaces
We classify affine operators on a unitary or Euclidean space U up to
topological conjugacy. An affine operator is a map f: U-->U of the form
f(x)=Ax+b, in which A: U-->U is a linear operator and b in U. Two affine
operators f and g are said to be topologically conjugate if hg=fh for some
homeomorphism h: U-->U