Independent sets, matchings, and occupancy fractions

Abstract: We prove tight upper bounds on the logarithmic derivative of the independence and matching polynomials of d‐regular graphs. For independent sets, this theorem is a strengthening of the results of Kahn, Galvin and Tetali, and Zhao showing that a union of copies of Kd,d maximizes the number of independent sets and the independence polynomial of a d‐regular graph. For matchings, this shows that the matching polynomial and the total number of matchings of a d‐regular graph are maximized by a union of copies of Kd,… Show more

“…It is conjectured that latter maximizes the number of independents of every fixed size. Let i t (G) denote the number of independent sets of size t in G. Recall that kG denotes a disjoint union of k copies of G. See [23,Section 8] for the current best bounds on this problem. 9.2.…”

“…The proof in Section 3, following [45], used a variant of the Hölder's inequality, and is related to the original entropy method proof. Recently, an elegant new proof of the result was found [23] using a novel method, unrelated to previous proofs. We discuss this new technique in this section.…”

“…Notably, Davies, Jenssen, Perkins, and Roberts [23] recently gave a new proof of the above theorems by introducing a powerful new technique, which has already had a number Homomorphisms from G to correspond to independent sets of G.…”

“…In [23], Theorem 7.2 was proved for all d-regular graphs G by considering all graphs on d vertices that could be induced by the neighborhood of a vertex in G and using a linear program to constrain the probability distribution of the neighborhood profile of a random vertex. When G is trianglefree, the neighborhood of a vertex is always an independent set, which significantly simplifies the situation.…”

“…They are both based on the following idea, introduced in [23] for this problem. We draw a random independent set I from the hard-core model and look at the neighborhood of a uniform random vertex v ∈ V (G).…”

Extremal Regular Graphs: Independent Sets and Graph Homomorphisms

“…It is conjectured that latter maximizes the number of independents of every fixed size. Let i t (G) denote the number of independent sets of size t in G. Recall that kG denotes a disjoint union of k copies of G. See [23,Section 8] for the current best bounds on this problem. 9.2.…”

“…The proof in Section 3, following [45], used a variant of the Hölder's inequality, and is related to the original entropy method proof. Recently, an elegant new proof of the result was found [23] using a novel method, unrelated to previous proofs. We discuss this new technique in this section.…”

“…Notably, Davies, Jenssen, Perkins, and Roberts [23] recently gave a new proof of the above theorems by introducing a powerful new technique, which has already had a number Homomorphisms from G to correspond to independent sets of G.…”

“…In [23], Theorem 7.2 was proved for all d-regular graphs G by considering all graphs on d vertices that could be induced by the neighborhood of a vertex in G and using a linear program to constrain the probability distribution of the neighborhood profile of a random vertex. When G is trianglefree, the neighborhood of a vertex is always an independent set, which significantly simplifies the situation.…”

“…They are both based on the following idea, introduced in [23] for this problem. We draw a random independent set I from the hard-core model and look at the neighborhood of a uniform random vertex v ∈ V (G).…”

Extremal Regular Graphs: Independent Sets and Graph Homomorphisms

Occupancy fraction, fractional colouring, and triangle fraction

A tight upper bound on the average order of dominating sets of a graph