This book examines a topic from the theory of residues and duality. For broad classes of local algebras $f:R\rightarrow S$ and an $R$-module $M$ of zero dimensional support, Huang provides various canonical constructions of an $S$-module of zero dimensional support. Canonical isomorphisms between the various approaches are given using the residue map. The constructions preserve injective hulls of residue fields. This work should be of considerable interest to people working with residual complexes and duality theory, as well as to those interested in injective modules.
Introduction Generalized fractions on modules with support Modules with zero dimensional support Pseudofunctors Residues for power series rings A pseudofunctor on the residually finitely generated category Comparison of pseudofunctors References.