A division property of the Fibonacci word

The combinatorial properties of the Fibonacci infinite word are of great interest in some aspects of mathematics and physics, such as number theory, fractal geometry, formal language, computational complexity, quasicrystals etc. In this note, we introduce the singular words of the Fibonacci infinit

We say that a semigroup S has property P.\* , n > 2, if, given elements xi. , x, of S, at least two of the n! products of these elements coincide. In a recent paper, Restivo considered the Fibonacci semigroup (i.e. the Rees quotient of (a, h}+ by the ideal of nonfactors of the well-known infinite Fi

We prove the following interesting combinatorial property of the poset of the factors of a word. Let w be a word and n = G w + 2, where G w is the maximal length of a repeated factor of w. If v is any word such that the posets of the factors of v and of w up to length n are isomorphic, then v can be

A fourth order hamiltonian is used to explore transport properties of semiconductor Fibonacci heterostructures. The tunneling current and time delay are obtained for different Fibonacci sequences constructed with Ga As and Al x Ga 1-x As. Energy minibands are calculated to study the fractal dimensio