Localization in one-dimensional systems with generalized Fibonacci disorder

We study the localization properties of a one-dimensional system with generalized Fibonacci disorder. In the tight-binding approximation, and using a variety of methods, we obtain the localization length, the transmission coefficient and the inverse participation ratio, to characterize the degree of localization of every eigenstate. For the first elements of Class I of generalized Fibonacci disorder we find delocalized eigenstates between localized ones.