Kaplansky's theorem on projective modules

In abstract algebra, Kaplansky's theorem on projective modules, first proven by Irving Kaplansky, states that a projective module over a local ring is free;^[1] where a not-necessarily-commutative ring is called local if for each element x, either x or 1 − x is a unit element.^[2] The theorem can also be formulated so to characterize a local ring (#Characterization of a local ring).

For a finite projective module over a commutative local ring, the theorem is an easy consequence of Nakayama's lemma.^[3] For the general case, the proof (both the original as well as later one) consists of the following two steps:

Observe that a projective module over an arbitrary ring is a direct sum of countably generated projective modules.
Show that a countably generated projective module over a local ring is free (by a "[reminiscence] of the proof of Nakayama's lemma"^[4]).

The idea of the proof of the theorem was also later used by Hyman Bass to show big projective modules (under some mild conditions) are free.^[5] According to (Anderson & Fuller 1992), Kaplansky's theorem "is very likely the inspiration for a major portion of the results" in the theory of semiperfect rings.^[1]

Proof

The proof of the theorem is based on two lemmas, both of which concern decompositions of modules and are of independent general interest.

Lemma 1 — ^[6] Let ${\mathfrak {F}}$ denote the family of modules that are direct sums of some countably generated submodules (here modules can be those over a ring, a group or even a set of endomorphisms). If $M$ is in ${\mathfrak {F}}$ , then each direct summand of $M$ is also in ${\mathfrak {F}}$ .

Proof: Let N be a direct summand; i.e., $M=N\oplus L$ . Using the assumption, we write $M=\bigoplus _{i\in I}M_{i}$ where each $M_{i}$ is a countably generated submodule. For each subset $A\subset I$ , we write $M_{A}=\bigoplus _{i\in A}M_{i},N_{A}=$ the image of $M_{A}$ under the projection $M\to N\hookrightarrow M$ and $L_{A}$ the same way. Now, consider the set of all triples ( $J$ , $B$ , $C$ ) consisting of a subset $J\subset I$ and subsets $B,C\subset {\mathfrak {F}}$ such that $M_{J}=N_{J}\oplus L_{J}$ and $N_{J},L_{J}$ are the direct sums of the modules in $B,C$ . We give this set a partial ordering such that $(J,B,C)\leq (J',B',C')$ if and only if $J\subset J'$ , $B\subset B',C\subset C'$ . By Zorn's lemma, the set contains a maximal element $(J,B,C)$ . We shall show that $J=I$ ; i.e., $N=N_{J}=\bigoplus _{N'\in B}N'\in {\mathfrak {F}}$ . Suppose otherwise. Then we can inductively construct a sequence of at most countable subsets $I_{1}\subset I_{2}\subset \cdots \subset I$ such that $I_{1}\not \subset J$ and for each integer $n\geq 1$ ,

M_{I_{n}}\subset N_{I_{n}}+L_{I_{n}}\subset M_{I_{n+1}}

Let $I'=\bigcup _{0}^{\infty }I_{n}$ and $J'=J\cup I'$ . We claim:

M_{J'}=N_{J'}\oplus L_{J'}.

The inclusion $\subset$ is trivial. Conversely, $N_{J'}$ is the image of $N_{J}+L_{J}+M_{I'}\subset N_{J}+M_{I'}$ and so $N_{J'}\subset M_{J'}$ . The same is also true for $L_{J'}$ . Hence, the claim is valid.

Now, $N_{J}$ is a direct summand of $M$ (since it is a summand of $M_{J}$ , which is a summand of $M$ ); i.e., $N_{J}\oplus M'=M$ for some $M'$ . Then, by modular law, $N_{J'}=N_{J}\oplus (M'\cap N_{J'})$ . Set ${\widetilde {N_{J}}}=M'\cap N_{J'}$ . Define ${\widetilde {L_{J}}}$ in the same way. Then, using the early claim, we have:

M_{J'}=M_{J}\oplus {\widetilde {N_{J}}}\oplus {\widetilde {L_{J}}},

which implies that

{\widetilde {N_{J}}}\oplus {\widetilde {L_{J}}}\simeq M_{J'}/M_{J}\simeq M_{J'-J}

is countably generated as $J'-J\subset I'$ . This contradicts the maximality of $(J,B,C)$ . $\square$

Lemma 2 — If $M_{i},i\in I$ are countably generated modules with local endomorphism rings and if $N$ is a countably generated module that is a direct summand of $\bigoplus _{i\in I}M_{i}$ , then $N$ is isomorphic to $\bigoplus _{i\in I'}M_{i}$ for some at most countable subset $I'\subset I$ .

Proof:^[7] Let ${\mathcal {G}}$ denote the family of modules that are isomorphic to modules of the form $\bigoplus _{i\in F}M_{i}$ for some finite subset $F\subset I$ . The assertion is then implied by the following claim:

Given an element $x\in N$ , there exists an $H\in {\mathcal {G}}$ that contains x and is a direct summand of N.

Indeed, assume the claim is valid. Then choose a sequence $x_{1},x_{2},\dots$ in N that is a generating set. Then using the claim, write $N=H_{1}\oplus N_{1}$ where $x_{1}\in H_{1}\in {\mathcal {G}}$ . Then we write $x_{2}=y+z$ where $y\in H_{1},z\in N_{1}$ . We then decompose $N_{1}=H_{2}\oplus N_{2}$ with $z\in H_{2}\in {\mathcal {G}}$ . Note $\{x_{1},x_{2}\}\subset H_{1}\oplus H_{2}$ . Repeating this argument, in the end, we have: ${\textstyle \{x_{1},x_{2},\dots \}\subset \bigoplus _{0}^{\infty }H_{n}}$ ; i.e., ${\textstyle N=\bigoplus _{0}^{\infty }H_{n}}$ . Hence, the proof reduces to proving the claim and the claim is a straightforward consequence of Azumaya's theorem (see the linked article for the argument). $\square$

Proof of the theorem: Let $N$ be a projective module over a local ring. Then, by definition, it is a direct summand of some free module $F$ . This $F$ is in the family ${\mathfrak {F}}$ in Lemma 1; thus, $N$ is a direct sum of countably generated submodules, each a direct summand of F and thus projective. Hence, without loss of generality, we can assume $N$ is countably generated. Then Lemma 2 gives the theorem. $\square$

Characterization of a local ring

Kaplansky's theorem can be stated in such a way to give a characterization of a local ring. A direct summand is said to be maximal if it has an indecomposable complement.

Theorem — ^[8] Let R be a ring. Then the following are equivalent.

R is a local ring.
Every projective module over R is free and has an indecomposable decomposition $M=\bigoplus _{i\in I}M_{i}$ such that for each maximal direct summand L of M, there is a decomposition $M={\Big (}\bigoplus _{j\in J}M_{j}{\Big )}\bigoplus L$ for some subset $J\subset I$ .

The implication $1.\Rightarrow 2.$ is exactly (usual) Kaplansky's theorem and Azumaya's theorem. The converse $2.\Rightarrow 1.$ follows from the following general fact, which is interesting itself:

A ring R is local $\Leftrightarrow$ for each nonzero proper direct summand M of $R^{2}=R\times R$ , either $R^{2}=(0\times R)\oplus M$ or $R^{2}=(R\times 0)\oplus M$ .

$(\Rightarrow )$ is by Azumaya's theorem as in the proof of $1.\Rightarrow 2.$ . Conversely, suppose $R^{2}$ has the above property and that an element x in R is given. Consider the linear map $\sigma :R^{2}\to R,\,\sigma (a,b)=a-b$ . Set $y=x-1$ . Then $\sigma (x,y)=1$ , which is to say $\eta :R\to R^{2},a\mapsto (ax,ay)$ splits and the image $M$ is a direct summand of $R^{2}$ . It follows easily from that the assumption that either x or -y is a unit element. $\square$

Notes

^ ^a ^b Anderson & Fuller 1992, Corollary 26.7.
^ Anderson & Fuller 1992, Proposition 15.15.
^ Matsumura 1989, Theorem 2.5.
^ Lam 2000, Part 1. § 1.
^ Bass 1963
^ Anderson & Fuller 1992, Theorem 26.1.
^ Anderson & Fuller 1992, Proof of Theorem 26.5.
^ Anderson & Fuller 1992, Exercise 26.3.

References

Anderson, Frank W.; Fuller, Kent R. (1992), Rings and categories of modules, Graduate Texts in Mathematics, vol. 13 (2 ed.), New York: Springer-Verlag, pp. x+376, doi:10.1007/978-1-4612-4418-9, ISBN 0-387-97845-3, MR 1245487
Bass, Hyman (February 28, 1963). "Big projective modules are free". Illinois Journal of Mathematics. 7 (1). University of Illinois at Champagne-Urbana: 24–31. doi:10.1215/ijm/1255637479.
Kaplansky, Irving (1958), "Projective modules", Ann. of Math., 2, 68 (2): 372–377, doi:10.2307/1970252, hdl:10338.dmlcz/101124, JSTOR 1970252, MR 0100017
Lam, T.Y. (2000). "Bass's work in ring theory and projective modules". arXiv:math/0002217. MR1732042
Matsumura, Hideyuki (1989), Commutative Ring Theory, Cambridge Studies in Advanced Mathematics (2nd ed.), Cambridge University Press, ISBN 978-0-521-36764-6