RT Journal Article
T1 Renormalization transformation of periodic and aperiodic lattices
A1 Maciá Barber, Enrique Alfonso
A1 Rodriguez Oliveros, Rogelio
AB In this work we introduce a similarity transformation acting on transfer matrices describing the propagation of elementary excitations through either periodic or Fibonacci lattices. The proposed transformation can act at two different scale lengths. At the atomic scale the transformation allows one to express the systems' global transfer matrix in terms of an equivalent on-site model one. Correlation effects among different hopping terms are described by a series of local phase factors in that case. When acting on larger scale lengths, corresponding to short segments of the original lattice, the similarity transformation can be properly regarded as describing an effective renormalization of the chain. The nature of the resulting renormalized lattice significantly depends on the kind of order (i.e., periodic or quasiperiodic) of the original lattice, expressing a delicate balance between chemical complexity and topological order as a consequence of the renormalization process.
PB American Physical Society
SN 1098-0121
YR 2006
FD 2006-10
LK https://hdl.handle.net/20.500.14352/52105
UL https://hdl.handle.net/20.500.14352/52105
LA eng
NO ©2006 The American Physical Society.E.M. warmly thanks J. César Flores, Gerardo G. Naumis, and Víctor R. Velasco for enlightening conversations on aperiodic systems. We acknowledge M. V. Hernández for a critical reading of the manuscript. This work has been supported by the Universidad Complutense de Madrid through Project No. PR27/05-14014-BSCH.
NO Universidad Complutense de Madrid
DS Docta Complutense
RD 8 abr 2025