249 research outputs found
Composite operators from the operator product expansion: what can go wrong?
The operator product expansion is used to compute the matrix elements of
composite renormalized operators on the lattice. We study the product of two
fundamental fields in the two-dimensional sigma-model and discuss the possible
sources of systematic errors. The key problem turns out to be the violation of
asymptotic scaling.Comment: Lattice 99 (Improvement and Renormalization), 3 pages, 3 eps figure
O(n) vector model at n=-1, -2 on random planar lattices: a direct combinatorial derivation
The O(n) vector model with logarithmic action on a lattice of coordination 3
is related to a gas of self-avoiding loops on the lattice. This formulation
allows for analytical continuation in n: critical behaviour is found in the
real interval [-2,2]. The solution of the model on random planar lattices,
recovered by random matrices, also involves an analytic continuation in the
number n of auxiliary matrices. Here we show that, in the two cases n=-1, -2, a
combinatorial reformulation of the loop gas problem allows to achieve the
random matrix solution with no need of this analytical continuation.Comment: 4 pages, 2 figure
An exactly solvable random satisfiability problem
We introduce a new model for the generation of random satisfiability
problems. It is an extension of the hyper-SAT model of Ricci-Tersenghi, Weigt
and Zecchina, which is a variant of the famous K-SAT model: it is extended to
q-state variables and relates to a different choice of the statistical
ensemble. The model has an exactly solvable statistic: the critical exponents
and scaling functions of the SAT/UNSAT transition are calculable at zero
temperature, with no need of replicas, also with exact finite-size corrections.
We also introduce an exact duality of the model, and show an analogy of
thermodynamic properties with the Random Energy Model of disordered spin
systems theory. Relations with Error-Correcting Codes are also discussed.Comment: 31 pages, 1 figur
On the one dimensional Euclidean matching problem: exact solutions, correlation functions and universality
We discuss the equivalence relation between the Euclidean bipartite matching
problem on the line and on the circumference and the Brownian bridge process on
the same domains. The equivalence allows us to compute the correlation function
and the optimal cost of the original combinatoric problem in the thermodynamic
limit; moreover, we solve also the minimax problem on the line and on the
circumference. The properties of the average cost and correlation functions are
discussed
Scaling hypothesis for the Euclidean bipartite matching problem II. Correlation functions
We analyze the random Euclidean bipartite matching problem on the hypertorus
in dimensions with quadratic cost and we derive the two--point correlation
function for the optimal matching, using a proper ansatz introduced by
Caracciolo et al. to evaluate the average optimal matching cost. We consider
both the grid--Poisson matching problem and the Poisson--Poisson matching
problem. We also show that the correlation function is strictly related to the
Green's function of the Laplace operator on the hypertorus
Effective mesonic theory for the 't Hooft model on the lattice
We apply to a lattice version of the 't~Hooft model, QCD in two space-time
dimensions for large number of colours, a method recently proposed to obtain an
effective mesonic action starting from the fundamental, fermionic one. The idea
is to pass from a canonical, operatorial representation, where the low-energy
states have a direct physical interpretation in terms of a Bogoliubov vacuum
and its corresponding quasiparticle excitations, to a functional, path integral
representation, via the formalism of the transfer matrix. In this way we obtain
a lattice effective theory for mesons in a self-consistent setting. We also
verify that well-known results from other different approaches are reproduced
in the continuum limit.Comment: 21 pages, 2 figure
Transfer matrix for Kogut-Susskind fermions in the spin basis
In the absence of interaction it is well known that the Kogut-Susskind
regularizations of fermions in the spin and flavor basis are equivalent to each
other. In this paper we clarify the difference between the two formulations in
the presence of interaction with gauge fields. We then derive an explicit
expression of the transfer matrix in the spin basis by a unitary transformation
on that one in the flavor basis which is known. The essential key ingredient is
the explicit construction of the fermion Fock space for variables which live on
blocks. Therefore the transfer matrix generates time translations of two
lattice units.Comment: 16 page
Two-Dimensional Heisenberg Model with Nonlinear Interactions
We investigate a two-dimensional classical -vector model with a nonlinear
interaction (1 + \bsigma_i\cdot \bsigma_j)^p in the large-N limit. As
observed for N=3 by Bl\"ote {\em et al.} [Phys. Rev. Lett. {\bf 88}, 047203
(2002)], we find a first-order transition for and no finite-temperature
phase transitions for , both phases have short-range
order, the correlation length showing a finite discontinuity at the transition.
For , there is a peculiar transition, where the spin-spin correlation
length is finite while the energy-energy correlation length diverges.Comment: 7 pages, 2 figures in a uufile. Discussion of the theory for p = p_c
revised and enlarge
Exact integration of height probabilities in the Abelian Sandpile Model
The height probabilities for the recurrent configurations in the Abelian
Sandpile Model on the square lattice have analytic expressions, in terms of
multidimensional quadratures. At first, these quantities have been evaluated
numerically with high accuracy, and conjectured to be certain cubic
rational-coefficient polynomials in 1/pi. Later their values have been
determined by different methods.
We revert to the direct derivation of these probabilities, by computing
analytically the corresponding integrals. Yet another time, we confirm the
predictions on the probabilities, and thus, as a corollary, the conjecture on
the average height.Comment: 17 pages, added reference
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