Symplectic resolutions of the quotient of R2 by a non-finite symplectic group

Abstract

We construct smooth symplectic resolutions of the quotient of R2 under some infinite discrete sub-group of GL2(R) preserving a log-symplectic structure. This extends from algebraic geometry to smooth real differential geometry the Du Val symplectic resolution of C2/G, with G ⊂ SL2(C) a finite group. The first of these infinite groups is G=Z, identified to triangular matrices with spectrum 1. Smooth functions on the quotient R2/G come with a natural Poisson bracket, and R2/Gis for an arbitrary k ≥ 1 set-isomorphic to the real Du Val singular variety A2k = (x,y,z) ∈ R3 , x2 +y2= z2k. We show that each one of the usual minimal resolutions of these Du Val varieties are symplectic resolutions of R2/G. The same holds for G'=Z Z/2Z (identified to triangular matrices with spectrum 1), with the upper half of D2k+1 playing the role of A2k.