Multifractal formalism is used to study properties of probability measures
supported by energy spectra of a fully frustrated nearest-neighbor Ising mo
del on finite-size triangular lattices. The spectra of singularities of the
se measures as well as the maximal Holder exponent are shown to display a s
trong asymmetry under the change of the sign of the interaction parameter.
Demonstrated is also some similarity between the temperature dependence of
this exponent in cases of the antiferromagnetic triangular Ising model and
the one-dimensional Ising system. Consequently, the multifractal formalism
is proved to be useful for indicating the existence of frustration in latti
ce systems with discrete energies and for analyzing the influence of frustr
ation on properties of these systems for different temperatures. (C) 1999 E
lsevier Science B.V. All rights reserved.