Mathematics – Group Theory
Scientific paper
2004-02-11
Mathematics
Group Theory
The paper is partially re-written, and a section where we prove that the Noether's problem is true for L3(2) is added
Scientific paper
We prove that for a system of indeterminates (X_a) indiced by the P^2(2), the projective plane over F_2, there exists a 3-3 correspondance compatible with the incidence structures of P^2(2), such that (X_a) is one of the orbits of it. We give two applications of this construction : 1) for any sufficientely general polynomial P in k[X] over a field k of car. 0, such that its Galois group is a subgroup of L3(2) ((=L2(7)), there exists Q in k[X] such that the Galois group of P-TQ over k(T) is L3(2). This implies in particular the so-called "arithmetical lifting property" for L3(2) over k. 2) There exists a generic polynomial in 7 parameters for polynomials of degree 7 with Galois group L3(2). This is equivalent to the fact that the Noether's problem for L3(2) acting over the seven points of P^2(2) has a positive answer.
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