511 research outputs found
Lattice Green Functions: the seven-dimensional face-centred cubic lattice
We present a recursive method to generate the expansion of the lattice Green
function of the d-dimensional face-centred cubic (fcc) lattice. We produce a
long series for d =7. Then we show (and recall) that, in order to obtain the
linear differential equation annihilating such a long power series, the most
economic way amounts to producing the non-minimal order differential equations.
We use the method to obtain the minimal order linear differential equation of
the lattice Green function of the seven-dimensional face-centred cubic (fcc)
lattice. We give some properties of this irreducible order-eleven differential
equation. We show that the differential Galois group of the corresponding
operator is included in . This order-eleven operator is
non-trivially homomorphic to its adjoint, and we give a "decomposition" of this
order-eleven operator in terms of four order-one self-adjoint operators and one
order-seven self-adjoint operator. Furthermore, using the Landau conditions on
the integral, we forward the regular singularities of the differential equation
of the d-dimensional lattice and show that they are all rational numbers. We
evaluate the return probability in random walks in the seven-dimensional fcc
lattice. We show that the return probability in the d-dimensional fcc lattice
decreases as as the dimension d goes to infinity.Comment: 19 page
Diagonals of rational functions, pullbacked 2F1 hypergeometric functions and modular forms (unabrigded version)
We recall that diagonals of rational functions naturally occur in lattice
statistical mechanics and enumerative combinatorics. We find that a
seven-parameter rational function of three variables with a numerator equal to
one (reciprocal of a polynomial of degree two at most) can be expressed as a
pullbacked 2F1 hypergeometric function. This result can be seen as the simplest
non-trivial family of diagonals of rational functions. We focus on some
subcases such that the diagonals of the corresponding rational functions can be
written as a pullbacked 2F1 hypergeometric function with two possible rational
functions pullbacks algebraically related by modular equations, thus showing
explicitely that the diagonal is a modular form. We then generalise this result
to eight, nine and ten parameters families adding some selected cubic terms at
the denominator of the rational function defining the diagonal. We finally show
that each of these previous rational functions yields an infinite number of
rational functions whose diagonals are also pullbacked 2F1 hypergeometric
functions and modular forms.Comment: 39 page
From Holonomy of the Ising Model Form Factors to n-Fold Integrals and the Theory of Elliptic Curve
We recall the form factors f(j)N,N corresponding to the l-extension C(N,N; l) of the two-point diagonal correlation function of the Ising model on the square lattice and their associated linear differential equations which exhibit both a "Russian-doll" nesting, and a decomposition of the linear differential operators as a direct sum of operators (equivalent to symmetric powers of the differential operator of the complete elliptic integral E). The scaling limit of these differential operators breaks the direct sum structure but not the "Russian doll" structure, the "scaled" linear differential operators being no longer Fuchsian. We then introduce some multiple integrals of the Ising class expected to have the same singularities as the singularities of the n-particle contributions c(n) to the susceptibility of the square lattice Ising model. We find the Fuchsian linear differential equations satisfied by these multiple integrals for n = 1, 2, 3, 4 and, only modulo a prime, for n = 5 and 6, thus providing a large set of (possible) new singularities of the x(n). We get the location of these singularities by solving the Landau conditions. We discuss the mathematical, as well as physical, interpretation of these new singularities. Among the singularities found, we underline the fact that the quadratic polynomial condition 1 + 3w + 4w² = 0, that occurs in the linear differential equation of x⁽³⁾, actually corresponds to the occurrence of complex multiplication for elliptic curves. The interpretation of complex multiplication for elliptic curves as complex fixed points of generators of the exact renormalization group is sketched. The other singularities occurring in our multiple integrals are not related to complex multiplication situations, suggesting a geometric interpretation in terms of more general (motivic) mathematical structures beyond the theory of elliptic curves. The scaling limit of the (lattice off-critical) structures as a confluent limit of regular singularities is discussed in the conclusion
Stieltjes moment sequences for pattern-avoiding permutations
International audienceA small set of combinatorial sequences have coefficients that can be represented as moments of a nonnegative measure on . Such sequences are known as Stieltjes moment sequences. This article focuses on some classical sequences in enumerative combinatorics, denoted , and counting permutations of that avoid some given pattern . For increasing patterns , we recall that the corresponding sequences, , are Stieltjes moment sequences, and we explicitly find the underlying density function, either exactly or numerically, by using the Stieltjes inversion formula as a fundamental tool. We show that the generating functions of the sequences and correspond, up to simple rational functions, to an order-one linear differential operator acting on a classical modular form given as a pullback of a Gaussian \, _2F_1 hypergeometric function, respectively to an order-two linear differential operator acting on the square of a classical modular form given as a pullback of a \, _2F_1 hypergeometric function. We demonstrate that the density function for the Stieltjes moment sequence is closely, but non-trivially, related to the density attached to the distance traveled by a walk in the plane with unit steps in random directions. Finally, we study the challenging case of the sequence and give compelling numerical evidence that this too is a Stieltjes moment sequence. Accepting this, we show how rigorous lower bounds on the growth constant of this sequence can be constructed, which are stronger than existing bounds. A further unproven assumption leads to even better bounds, which can be extrapolated to give an estimate of the (unknown) growth constant
Association studies using random and "candidate" microsatellite loci in two infectious goat diseases
We established a set of 30 microsatellites of Bovidae origin for use in a biodiversity study in Swiss and Creole goats. Additional microsatellites located within or next to "candidate" genes of interest, such as cytokine genes (IL4, INF-gamma) and MHC class II genes (DRB, DYA) were tested in the caprine species in order to detect possible associations with two infectious caprine diseases. Microsatellite analysis was undertaken using automated sequencers (ABI373 & 3100). In the first study, a total of 82 unrelated Creole goats, 37 resistant and 45 susceptible to Heartwater disease (Cowdriosis) were analysed. In this study, the two microsatellite loci DRBP1 (MHCII) and BOBT24 (IL4) were positively associated with disease susceptibility, demonstrating a corrected P-value of 0.002 and 0.005, respectively. In a second investigation, we tested 36 goats, naturally infected with the nematode parasite Trichostrongylus colubriformis. These animals were divided into a "low" and "high" excreting group on the basis of two independently recorded fecal egg counts. For this nematode resistance study, we detected a significant association of one of the alleles of the microsatellite locus SPS113 with "low" excretion (resistance). The MHC class II locus DYA (P19), was weakly associated with susceptibility in both diseases (Pc = 0.05). In future experiments, we will extend the sample size in order to verify the described associations
Association studies using random and “candidate” microsatellite loci in two infectious goat diseases
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