Least path criterion (LPC) for unique indexing in a two-dimensional decagonal quasilattice

Abstract

The least path criterion or least path length in the context of redundant basis vector systems is discussed and a mathematical proof is presented of the uniqueness of indices obtained by applying the least path criterion. Though the method has greater generality, this paper concentrates on the two-dimensional decagonal lattice. The order of redundancy is also discussed; this will help eventually to correlate with other redundant but desirable indexing sets. © 2002 International Union of Crystallography Printed in Great Britain-all rights reserved.