Extensions of Hamiltonian systems dependent on a rational parameter

The technique of "extension" allows to build \((n+1)\)-dimensional Hamiltonian systems with a non-trivial polynomial in the momenta first integral of any given degree starting from a \(n\)-dimensional Hamiltonian satisfying some additional properties. Until now, the application of the method was restricted to integer values of a certain fundamental parameter determining the degree of the additional first integral. In this article we show how this technique can be generalized to any rational value of the same parameter. Several examples are given, among them the anisotropic oscillator and a special case of the Tremblay-Turbiner-Winternitz system.