Cremona maps and involutions

Abstract

We deal with the following question of Dolgachev : is the Cremona group generated by involutions ? Answer is yes in dimension 2 (Cerveau-Deserti). We give an upper bound of the minimal number n of involutions we need to write a birational self map of P2C. We prove that de Jonqui\`eres maps of P3C and maps of small bidegree of P3C can be written as a composition of involutions of P3C and give an upper bound of n for such maps . We get similar results in particular for automorphisms of (P1C)n, automorphisms of PnC, tame automorphisms of Cn, monomial maps of PnC, and elements of the subgroup generated by the standard involution of PnC and PGL(n+1,C).