Twin Polynomial Vector Fields of Arbitrary Degree

In this paper we study polynomial vector fields on C² of degree larger than 2 with n² isolated singularities. More precisely, we show that if two polynomial vector fields share n²- 1 singularities with the same spectra (trace and determinant) and from these singularities n²- 2 have the same positions, then both vector fields have identical position and spectra at all the singularities. Moreover we also show that if two polynomial vector fields share n²- 1 singularities with the same positions and from these singularities n²- 2 have the same spectra, then both vector fields have identical position and spectra at all the singularities. Moreover we also prove that generic vector fields of degree n> 2 have no twins and that for any n> 2 there exist two uniparametric families of twin vector fields, i.e. two different families of vector fields having exactly the same singular points and for each singular point both vector fields have the same spectrum.