Decomposition of matrices from SL 2(K[x, y])
Abstract
Let K be an algebraically closed field of characteristic zero and K[x,y] the polynomial ring. The group SL2(K[x,y]) of all matrices with determinant equal to 1 over K[x,y] can not be generated by elementary matrices. The known counterexample was pointed out by P.M. Cohn. Conversely, A.A.Suslin proved that the group SLr(K[x1,…,xn]) is generated by elementary matrices for r 3 and arbitrary n≥ 2, the same is true for n=1 and arbitrary r. It is proven that any matrix from SL2(K[x,y]) with at least one entry of degree 2 is either a product of elementary matrices or a product of elementary matrices and of a matrix similar to the one pointed out by P. Cohn. For any matrix pmatrixarraycc f & g\\ -Q & P arraypmatrix∈SL2(K[x,y]), we obtain formulas for the homogeneous components Pi , Qi for the unimodular row (-Q, P) as combinations of homogeneous components of the polynomials f, g, respectively, with the same coefficients.
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