Unboundedness of fiber invariants of canonically fibred varieties of general type
Abstract
We answer an open question concerning the boundedness of canonical fiber spaces in high dimensions and prove the following: for any set of integers n≥ 3, 0<d<n and N>0, there exists a nonsingular projective n-fold X of general type so that X is canonically fibred by d-dimensional varieties F with pg(F)≥ N. This disproves the desired boundedness parallel to Beauville's boundedness theorem in the surface case.
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