What is the spectral category?

Abstract

For a category C with finite limits and a class S of monomorphisms in C that is pullback stable, contains all isomorphisms, is closed under composition, and has the strong left cancellation property, we use pullback stable S-essential monomorphisms in C to construct a spectral category Spec(C,S). We show that it has finite limits and that the canonical functor C Spec(C,S) preserves finite limits. When C is a normal category, assuming for simplicity that S is the class of all monomorphisms in C, we show that pullback stable S-essential monomorphisms are the same as what we call subobject-essential monomorphisms.