Overcoherence implies holonomicity
Abstract
Let be a mixed characteristic complete discrete valuation ring with perfect residue field. Let be a smooth formal scheme over . We prove than a , -module which is overcoherent after any change of basis is an holonomic , -module. Furthermore, we check that this implies than a bounded complex of ,\,-modules is overholonomic after any change of basis if and only if, for any integer j, H j () is overholonomic after any change of basis.
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