Iterations of the functor of naive A1-connected components of varieties
Abstract
For any sheaf of sets F on Sm/k, it is well known that the universal A1-invariant quotient of F is given as the colimit of sheaves Sn( F) where S(F) is the sheaf of naive A1-connected components of F. We show that these infinite iterations of naive A1-connected components in the construction of universal A1-invariant quotient for a scheme are certainly required. For every n, we construct an A1-connected variety Xn such that Sn(Xn)≠ Sn+1(Xn) and Sn+2(Xn)=*.
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