Almost ring
In mathematics, almost modules and almost rings are certain objects interpolating between rings and their fields of fractions. They were introduced by in his study of p-adic Hodge theory.
Almost modules
Let V be a local integral domain with the maximal ideal m, and K a fraction field of V. The category of K-modules, K-Mod, may be obtained as a quotient of V-Mod by the Serre subcategory of torsion modules, i.e. those N such that any element n in N is annihilated by some nonzero element in the maximal ideal. If the category of torsion modules is replaced by a smaller subcategory, we obtain an intermediate step between V-modules and K-modules. Faltings proposed to use the subcategory of almost zero modules, i.e. N ∈ V-Mod such that any element n in N is annihilated by all elements of the maximal ideal.For this idea to work, m and V must satisfy certain technical conditions. Let V be a ring and m ⊆ V an idempotent ideal, i.e. an ideal such that m2 = m. Assume also that m ⊗ m is a flat V-module. A module N over V is almost zero with respect to such m if for all ε ∈ m and n ∈ N we have εn = 0. Almost zero modules form a Serre subcategory of the category of V-modules. The category of almost V-modules, Va-Mod, is a localization of V-Mod along this subcategory.
The quotient functor V-Mod → Va-Mod is denoted by. The assumptions on m guarantee that is an exact functor which has both the right adjoint functor and the left adjoint functor. Moreover, is full and faithful. The category of almost modules is complete and cocomplete.