Periodic and quasiperiodic wavefunctions in a class of one-dimensional quasicrystals: an analytical treatment

Abstract

The one-dimensional, discrete Schrodinger equation is studied analytically for a class of quasiperiodic Hamiltonians known as the copper mean. The lattice is described by a recursion formula S_L+1=S_L-1S_L-1S_L, L=2,3, . . ., given the two initial sequences S₀ and S₁. Extended states are shown to exist for energies satisfying TrT_L=0 and Tr((T₀)^-2T₁)=2 where T_L is the transfer matrix for the Lth generation of the quasicrystal. Also, periodic states are shown to exist quite generally in a subclass of the copper mean. A specific one-dimensional quasicrystal is given as an example of this, and is shown to have exclusively periodic states.