On regular surfaces of general type with numerically trivial automorphism group of order 4
Abstract
Let S be a regular minimal surface of general type over the field of complex numbers, and AutQ(S) the subgroup of automorphisms acting trivially on H*(S,Q). It has been known since twenty years that |AutQ(S)|≤ 4 if the invariants of S are sufficiently large. Under the assumption that KS is ample, we characterize the surfaces achieving the equality, showing that they are isogenous to a product of two curves, of unmixed type, and that the group AutQ(S) is isomorphic to (Z/2Z)2. Moreover, unbounded families of surfaces with AutQ(S)(Z/2Z)2 are provided.
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