Modulus sheaves with transfers

Abstract

We generalise Kahn, Miyazaki, Saito, Yamazaki's theory of modulus pairs to pairs (X, D) consisting of a qcqs scheme X equipped with an effective Cartier divisor D representing a ramification bound. We develop theories of sheaves on such pairs for modulus versions of the Zariski, Nisnevich, \'etale, fppf, and qfh-topologies. We extend the Suslin-Voevodsky theory of correspondances to modulus pairs, under the assumption that the interior U = X D is Noetherian. The resulting point of view highlights connections to (Raynaud-style) rigid geometry, and potentially provides a setting where wild ramification can be compared with irregular singularities. This framework leads to a homotopy theory of modulus pairs MH(X,D) and a theory of motives with modulus MDMeff(X,D) over a general base (X, D). For example, the case where X is the spectrum of a rank one valuation ring (of mixed or equal characteristic) equipped with a choice D of pseudo-uniformiser is allowed.

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