The composition conjecture for Abel equation

The composition conjecture for the Abel differential equation states that if all solutions in a neighborhood of the origin are periodic then the indefinite integrals of its coefficients are compositions of a periodic function. Several research articles were published in the last 20 years to prove the conjecture or a weaker version of it. The problem is related to the classical center problem of polynomial two-dimensional systems. The conjecture opens important relations with classical analysis and algebra. We give a widely accessible exposition of this conjecture and verify the conjecture for certain classes of coefficients.