1. Let V be a non-singular rational surface defined over an algebraic number field k. There is a standard conjecture that the only obstructions to the Hasse principle and to weak approximation on V are the Brauer–Manin obstructions. A prerequisite for calculating these is a knowledge of the Brauer group of V; indeed there is one such obstruction, which may however be trivial, corresponding to each element of Br V/Br k. Because k is an algebraic number field, the natural injectionis an isomorphism; so the first step in calculating the Brauer–Manin obstruction is to calculate the finite group H1 (k), Pic .
The object of this paper is to find all the irreducible algebraic surfaces which (for
special values of the parameters b, r, s) are invariant under the Lorenz systemx˙ = X(x, y, z) = s(y−x),
y˙ = Y(x, y, z) = rx−y−xz,
ż = Z(x, y, z) =−bz+xy. (1)It is customary in considering the Lorenz system to require the parameters b, r, s to
be all strictly positive; however for this particular problem we shall follow previous
practice in only imposing the condition s ≠ 0. (If s = 0 the equations are trivially
integrable and x is constant on any trajectory; thus x should be regarded as a
parameter and the question discussed in this paper ceases to be a natural one.)
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