Projective cover

In the branch of abstract mathematics called category theory, a projective cover of an object X is in a sense the best approximation of X by a projective object P. Projective covers are the dual of injective envelopes.

Definition[edit]

Let ${\displaystyle {\mathcal {C}}}$ be a category and X an object in ${\displaystyle {\mathcal {C}}}$. A projective cover is a pair (P,p), with P a projective object in ${\displaystyle {\mathcal {C}}}$ and p a superfluous epimorphism in Hom(P, X).

If R is a ring, then in the category of R-modules, a superfluous epimorphism is then an epimorphism ${\displaystyle p:P\to X}$ such that the kernel of p is a superfluous submodule of P.

Properties[edit]

Projective covers and their superfluous epimorphisms, when they exist, are unique up to isomorphism. The isomorphism need not be unique, however, since the projective property is not a full fledged universal property.

The main effect of p having a superfluous kernel is the following: if N is any proper submodule of P, then ${\displaystyle p(N)\neq M}$.^[1] Informally speaking, this shows the superfluous kernel causes P to cover M optimally, that is, no submodule of P would suffice. This does not depend upon the projectivity of P: it is true of all superfluous epimorphisms.

If (P,p) is a projective cover of M, and P' is another projective module with an epimorphism ${\displaystyle p':P'\rightarrow M}$, then there is a split epimorphism α from P' to P such that ${\displaystyle p\alpha =p'}$

Unlike injective envelopes and flat covers, which exist for every left (right) R-module regardless of the ring R, left (right) R-modules do not in general have projective covers. A ring R is called left (right) perfect if every left (right) R-module has a projective cover in R-Mod (Mod-R).

A ring is called semiperfect if every finitely generated left (right) R-module has a projective cover in R-Mod (Mod-R). "Semiperfect" is a left-right symmetric property.

A ring is called lift/rad if idempotents lift from R/J to R, where J is the Jacobson radical of R. The property of being lift/rad can be characterized in terms of projective covers: R is lift/rad if and only if direct summands of the R module R/J (as a right or left module) have projective covers.^[2]

Examples[edit]

In the category of R modules:

• If M is already a projective module, then the identity map from M to M is a superfluous epimorphism (its kernel being zero). Hence, projective modules always have projective covers.
• If J(R)=0, then a module M has a projective cover if and only if M is already projective.
• In the case that a module M is simple, then it is necessarily the top of its projective cover, if it exists.
• The injective envelope for a module always exists, however over certain rings modules may not have projective covers. For example, the natural map from Z onto Z/2Z is not a projective cover of the Z-module Z/2Z (which in fact has no projective cover). The class of rings which provides all of its right modules with projective covers is the class of right perfect rings.
• Any R-module M has a flat cover, which is equal to the projective cover if R has a projective cover.

See also[edit]

• Projective resolution

References[edit]

• Anderson, Frank Wylie; Fuller, Kent R (1992). Rings and Categories of Modules. Springer. ISBN 0-387-97845-3. Retrieved 2007-03-27.
• Faith, Carl (1976), Algebra. II. Ring theory., Grundlehren der Mathematischen Wissenschaften, No. 191. Springer-Verlag
• Lam, T. Y. (2001), A first course in noncommutative rings (2nd ed.), Graduate Texts in Mathematics, 131. Springer-Verlag, ISBN 0-387-95183-0