We study the dynamics of the renormalization operator acting on the space of
pairs (v,t), where v is a diffeomorphism and t belongs to [0,1], interpreted as
unimodal maps x-->v(q_t(x)), where q_t(x)=-2t|x|^a+2t-1. We prove the so called
complex bounds for sufficiently renormalizable pairs with bounded
combinatorics. This allows us to show that if the critical exponent a is close
to an even number then the renormalization operator has a unique fixed point.
Furthermore this fixed point is hyperbolic and its codimension one stable
manifold contains all infinitely renormalizable pairs.