Miklós–Manickam–Singhi conjectures on partial geometries

Abstract: In this paper we give a proof of the Manickam-Miklós-Singhi (MMS) conjecture for some partial geometries. Specifically, we give a condition on partial geometries which implies that the MMS conjecture holds. Further, several specific partial geometries that are counterexamples to the conjecture are described.

“…A stronger theorem along the same lines was proved in [8,Corollary 52]. Furthermore, in [5] the geometry of van Lint and Schrijver was listed as a counterexample to the Manickam-Miklós-Singhi conjecture for partial geometries.…”

“…A partial geometry pg(5, 5, 2) has v = 81 points and as many lines. We shall denote the geometry of van Lint and Schrijver by G = (P, L), where the set of lines L consists of 6-element subsets of the set of points P. Two constructions of G are given in [11], the first using cyclotomy in the finite field F 81 , and the second using the dual code of the repetition code in F 5 3 . The first construction does not essentially use multiplication in F 81 and we describe it here in purely linear algebraic terms.…”

“…Negative lines were used in [5] to show that G does not have the strict MMS star property. There are 27 cliques of size 6 in the line graph Γ 2 (G ′ ) that are not stars.…”

“…Van Lint and Schrijver [11] constructed a partial geometry with parameters pg (5,5,2). Another construction of the same partial geometry was given in [1].…”

A new partial geometry pg(5,5,2)

“…A stronger theorem along the same lines was proved in [8,Corollary 52]. Furthermore, in [5] the geometry of van Lint and Schrijver was listed as a counterexample to the Manickam-Miklós-Singhi conjecture for partial geometries.…”

“…A partial geometry pg(5, 5, 2) has v = 81 points and as many lines. We shall denote the geometry of van Lint and Schrijver by G = (P, L), where the set of lines L consists of 6-element subsets of the set of points P. Two constructions of G are given in [11], the first using cyclotomy in the finite field F 81 , and the second using the dual code of the repetition code in F 5 3 . The first construction does not essentially use multiplication in F 81 and we describe it here in purely linear algebraic terms.…”

“…Negative lines were used in [5] to show that G does not have the strict MMS star property. There are 27 cliques of size 6 in the line graph Γ 2 (G ′ ) that are not stars.…”

“…Van Lint and Schrijver [11] constructed a partial geometry with parameters pg (5,5,2). Another construction of the same partial geometry was given in [1].…”

A new partial geometry pg(5,5,2)

A new partial geometry pg(5,5,2)