In group theory, the Whitehead problem is the following question:

Is every abelian group A with Ext¹(A, Z) = 0 a free abelian group?

The condition Ext¹(A, Z) = 0 can be equivalently formulated as follows: whenever B is an abelian group and f : B → A is a surjective group homomorphism whose kernel is isomorphic to the group of integers Z, then there exists a group homomorphism g : A → B with fg = id_A.

The question was asked by J. H. C. Whitehead in the 1950s, motivated by the second Cousin problem. The affirmative answer for countable groups was already found in the 1950s. Progress for larger groups was slow, and the problem was considered one of the most important ones in algebra for many years.

In 1973, Saharon Shelah showed that from the standard ZFC axiom system, the statement can be neither proven nor disproven.

This result was completely unexpected. While the existence of undecidable statements had been known since Gödel's incompleteness theorem of 1931, previous examples of undecidable statements (such as the Continuum hypothesis) had been confined to the realm of set theory. The Whitehead problem was the first purely algebraic problem that was shown to be undecidable.

The Whitehead problem remains undecidable even if one assumes the Continuum hypothesis, as shown by Shelah in 1980. Various similar independence statements were proved and it was realized more and more that the theory of abelian groups depends very sensitively on the underlying set theory.

References

• S. Shelah: "Infinite Abelian groups, Whitehead problem and some constructions", Israel Journal of Mathematics 18 (1974), pp. 243-256.
• S. Shelah: "Whitehead groups may not be free, even assuming CH. II", Israel Journal of Mathematics 35 (1980), pp. 257-285