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 (not necessarily local) 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 N \mapsto N^a. The assumptions on
m guarantee that (-)^a is an
exact functor which has both the right
adjoint functor M \mapsto M_* and the left adjoint functor M \mapsto M_!. Moreover, (-)_* is
full and faithful. The category of almost modules is
complete and
cocomplete. == Almost rings ==