nLab
exponential ideal

Context

Category theory

Contents

Definition
Properties
References

Definition

A class $I$ of objects in a cartesian closed category $C$ is called an exponential ideal if whenever $Y \in I$ and $X \in C$ , the exponential object $Y^{X}$ is in $I$ .

Of course, in particular this implies that $I$ is itself cartesian closed.

Properties

Theorem

If $I ↪ C$ is a reflective subcategory, then it is an exponential ideal if and only if its reflector $C \to I$ preserves finite products.

This appears for instance as (Johnstone, A4.3.1).

References

The relation of exponential ideals to reflective subcategories is discussed in section A4.3.1 of

Peter Johnstone, Sketches of an Elephant

Revised on November 14, 2011 21:15:39 by Urs Schreiber (217.232.17.79)