More on zeros and approximation of the Ising partition function

Abstract: We consider the problem of computing the partition function $\sum _x e^{f(x)}$ , where $f: \{-1, 1\}^n \longrightarrow {\mathbb R}$ is a quadratic or cubic polynomial on the Boolean cube $\{-1, 1\}^n$ . In the case of a quadratic polynomial f, we show that the partition function can be approximated within relative error $0 < \epsilon < 1$ in quasi-polynomial $n^{O(\ln n… Show more

“…In [6] we prove that for any 0 < 𝛿 < 1, fixed in advance, the value of (4.1) can be approximated within relative error 0 < 𝜖 < 1 in quasi-polynomial n O 𝛿 (ln n−ln 𝜖) time provided…”

“…Other than that, the complexity does not depend on f j . The result of [6] allows us to handle certain sparse systems (1.1). Namely, let us fix integers r i ≥ 1 for i = 1, … , m, integer c ≥ 1 and suppose that the matrix A = ( 𝛼 ij ) contains at most r i non-zero entries in the ith row and at most c non-zero entries in each column, while all entries satisfy the inequalities…”

“…Note that there is no dependence on the right hand sides 𝛽 i or probabilities p j . We note that the system of equations (3.1) for perfect matchings in a k-uniform Δ-regular hypergraph is not sparse in the above sense when k is fixed but Δ is allowed to grow, and Theorem 1.2 does not follow from the results of [6].…”

“…In [6] we prove that for any $$$ 0<\delta <1 $$$, fixed in advance, the value of () can be approximated within relative error $$$ 0<\epsilon <1 $$$ in quasi‐polynomial $$$ {n}^{O_{\delta}\left(\ln n-\ln \epsilon \right)} $$$ time provided $$$$ \sum \limits_{j:\kern0.3em j\ne k}\left|{g}_{jk}\right|\le 1-\delta \kern1em \mathrm{for}\kern1em k=1,\dots, n. $$$$ Geometrically, the condition () means that the Lipschitz constant of the quadratic form $$$$ \sum \limits_{1\le k<j\le n}{g}_{kj}{\eta}_k{\eta}_j, $$$$ on the Boolean cube $$$ {\left\{-1,1\right\}}^n $$$ endowed with the $$$ {\ell}^1 $$$‐metric does not exceed $$$ 1-\delta $$$ (the condition is essentially sharp, modulo NP $$$ \ne $$$ BPP hypothesis). To avoid dealing with exponentially large numbers, we assume that the coefficients …”

“…The result of [6] allows us to handle certain sparse systems (). Namely, let us fix integers $$$ {r}_i\ge 1 $$$ for $$$ i=1,\dots, m $$$, integer $$$ c\ge 1 $$$ and suppose that the matrix $$$ A=\left({\alpha}_{ij}\right) $$$ contains at most $$$ {r}_i $$$ non‐zero entries in the $$$ i $$$th row and at most $$$ c $$$ non‐zero entries in each column, while all entries satisfy the inequalities $$$$ \mid {\alpha}_{ij}\mid \le 1\kern1em \mathrm{for}\ \mathrm{all}\kern1em i,j.$$…”

Smoothed counting of 0–1 points in polyhedra

“…In [6] we prove that for any 0 < 𝛿 < 1, fixed in advance, the value of (4.1) can be approximated within relative error 0 < 𝜖 < 1 in quasi-polynomial n O 𝛿 (ln n−ln 𝜖) time provided…”

“…Other than that, the complexity does not depend on f j . The result of [6] allows us to handle certain sparse systems (1.1). Namely, let us fix integers r i ≥ 1 for i = 1, … , m, integer c ≥ 1 and suppose that the matrix A = ( 𝛼 ij ) contains at most r i non-zero entries in the ith row and at most c non-zero entries in each column, while all entries satisfy the inequalities…”

“…Note that there is no dependence on the right hand sides 𝛽 i or probabilities p j . We note that the system of equations (3.1) for perfect matchings in a k-uniform Δ-regular hypergraph is not sparse in the above sense when k is fixed but Δ is allowed to grow, and Theorem 1.2 does not follow from the results of [6].…”

“…In [6] we prove that for any $$$ 0<\delta <1 $$$, fixed in advance, the value of () can be approximated within relative error $$$ 0<\epsilon <1 $$$ in quasi‐polynomial $$$ {n}^{O_{\delta}\left(\ln n-\ln \epsilon \right)} $$$ time provided $$$$ \sum \limits_{j:\kern0.3em j\ne k}\left|{g}_{jk}\right|\le 1-\delta \kern1em \mathrm{for}\kern1em k=1,\dots, n. $$$$ Geometrically, the condition () means that the Lipschitz constant of the quadratic form $$$$ \sum \limits_{1\le k<j\le n}{g}_{kj}{\eta}_k{\eta}_j, $$$$ on the Boolean cube $$$ {\left\{-1,1\right\}}^n $$$ endowed with the $$$ {\ell}^1 $$$‐metric does not exceed $$$ 1-\delta $$$ (the condition is essentially sharp, modulo NP $$$ \ne $$$ BPP hypothesis). To avoid dealing with exponentially large numbers, we assume that the coefficients …”

“…The result of [6] allows us to handle certain sparse systems (). Namely, let us fix integers $$$ {r}_i\ge 1 $$$ for $$$ i=1,\dots, m $$$, integer $$$ c\ge 1 $$$ and suppose that the matrix $$$ A=\left({\alpha}_{ij}\right) $$$ contains at most $$$ {r}_i $$$ non‐zero entries in the $$$ i $$$th row and at most $$$ c $$$ non‐zero entries in each column, while all entries satisfy the inequalities $$$$ \mid {\alpha}_{ij}\mid \le 1\kern1em \mathrm{for}\ \mathrm{all}\kern1em i,j.$$…”

Smoothed counting of 0–1 points in polyhedra

Formation of tantalum coatings with a given structure on the surface of niti alloy by magnetron sputter deposition

The Complexity of Approximating the Complex-Valued Ising Model on Bounded Degree Graphs