On the Galois groups of the dualizing coverings for plane curves

Abstract

Let C1 be an irreducible component of a reduced projective curve C⊂ P2 defined over the field C, deg C1≥ 2, and let T be the set of lines l⊂ P2 meeting C transversally. In the article, we prove that for a line l0∈ T and any two points P1,P2∈ C1 l0 there is a loop lt⊂ T, t∈ [0,1], such that the movement of the line l0 along the loop lt induces the transposition of the points P1, P2 and the identity permutation of the other points of C l0.