Difference Galois groups under specialization

Abstract

We present a difference analogue of a result given by Hrushovski on differential Galois groups under specialization. Let k be an algebraically closed field of characteristic zero and X an irreducible affine algebraic variety over k. Consider the linear difference equation σ(Y)=AY where A∈ GLn(k(X)(x)) and σ is the shift operator σ(x)=x+1. Assume that the Galois group G of the above equation over k(X)(x) is defined over k(X) i.e. the vanishing ideal of G is generated by a finite set S⊂ k(X)[X,1/(X)]. For a c∈ X, denote by v c the map from k[X] to k given by v c(f)=f( c) for any f∈ k[X]. We prove that the set of c∈ X satisfying that v c(A) and v c(S) are well-defined and the affine variety in GLn(k) defined by v c(S) is the Galois group of σ(Y)=v c(A)Y over k(x) is Zariski dense in X. We apply our result to van der Put-Singer's conjecture which asserts that an algebraic subgroup G of GLn(k) is the Galois group of a linear difference equation over k(x) if and only if the quotient G/G by the identity component is cyclic. We show that if van der Put-Singer's conjecture is true for k=C then it will be true for any algebraically closed field k of characteristic zero.