Three chapters on Cremona groups

Abstract

In the first part of this article, we answer a question of I. Dolgachev, which is related to the following problem: given a birational map f∈Bir(Pmk) and a linear projective map A∈PGLm+1(k), when is A f regularizable? Dolgachev's initial question is whether this may happen for all A in PGLm+1(k), and the answer is negative. We then look at the sequence n\, fn, f∈Bir(P2k). We show that there is no constraint on the sequence n\, fn-deg\, fn-1 for small values of n. Finally we study the degree of pencils of curves which are invariant by a birational map. When f is a Halphen or Jonqui\`eres twist, we prove that this degree is bounded by a function of deg\, f. We derive corollaries on the structure of conjugacy classes, and their properties with respect to the Zariski topology of Bir(P2k).