On a generic inverse differential Galois problem for GLn

Abstract

GLn (C) Let F be a differential field with algebraically closed field of constants C. We prove that F< Yij>(Xij)⊃ F< Yij> is a generic Picard-Vessiot extension of F for . If E⊃ F is any Picard-Vessiot extension with differential Galois group then E F(Xij) as F- and -modules and there are fij∈ F such that F< Yij>(Xij)⊃ F< Yij> specializes to E⊃ F via Yij fij. The [fij]∈ Mn(F) for which the image of the map Yij fij is a Picard-Vessiot extension of F with group can be characterized as those [fij]∈ Mn(F) for which the wronskians of the monomials in F< Yij>(Xij) of degree less than or equal to k all map to non-zero elements under Yijij.

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