Abstract

A quasi-symmetric design (QSD) is a 2-$(v,k,\lambda)$ design with intersection numbers $x$ and $y$ with $x< y$. The block graph of such a design is formed on its blocks with two distinct blocks being adjacent if they intersect in $y$ points. It is well known that the block graph of a QSD is a strongly regular graph (SRG) with parameters $(b,a,c,d)$ with smallest eigenvalue $ -m =-\frac{k-x}{y-x}$.The classification result of SRGs with smallest eigenvalue $-m$, is used to prove that for a fixed pair $(\lambda\ge 2,m\ge 2)$, there are only finitely many QSDs. This gives partial support towards Marshall Hall Jr.'s conjecture, that for a fixed $\lambda\ge 2$, there exist finitely many symmetric $(v, k, \lambda)$-designs.We classify QSDs with $m=2$ and characterize QSDs whose block graph is the complete multipartite graph with $s$ classes of size $3$. We rule out the possibility of a QSD whose block graph is the Latin square graph $LS_m (n)$ or complement of $LS_m (n)$, for $m=3,4$.SRGs with no triangles have long been studied and are of current research interest. The characterization of QSDs with triangle-free block graph for $x=1$ and $y=x+1$ is obtained and the non-existence of such designs with $x=0$ or $\lambda > 2(x+2)$ or if it is a $3$-design is proven. The computer algebra system Mathematica is used to find parameters of QSDs with triangle-free block graph for $2\le m \le 100$. We also give the parameters of QSDs whose block graph parameters are $(b,a,c,d)$ listed in Brouwer's table of SRGs.

Highlights

  • A 2-(v, k, λ) design D is called quasisymmetric if the sizes of the intersection of two distinct blocks take only two values x and y, with (0 x < y < k)

  • It is well known that the block graph of a quasi-symmetric design (QSD) is a strongly regular graph (SRG) with parameters (b, a, c, d) with smallest eigenvalue

  • A natural question is, given a SRG with the right parameters to be the block graph of a QSD, when is it the block graph of a QSD? In section 4, we prove some results concerning this question

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Summary

Introduction

A 2-(v, k, λ) design D (with b blocks and r blocks through a given point) is called quasisymmetric if the sizes of the intersection of two distinct blocks take only two values x and y, with (0 x < y < k). We prove that if D is a QSD whose block graph is the complete multipartite graphs with s classes of size 3, with parameters (3s, 3(s − 1), 3(s − 2), 3(s − 1)), D is a 2-(9(1 + 2u), 6(1 + 2u), 5 + 12u) design with intersection numbers 3(1 + 2u) and 4(1 + 2u) or complement of this design (with z = 2u + 1). Let D be a QSD whose block graph is the complete multipartite graphs with s classes of size 3, with parameters (3s, 3(s − 1), 3(s − 2), 3(s − 1)), D is a 2-(9(1 + 2u), 6(1 + 2u), 5 + 12u) design with intersection numbers 3(1 + 2u) and 4(1 + 2u) (with z = 2u + 1) or the complement of this design.

Preliminaries
Result
Finiteness results in support of Hall’s conjecture
Block graphs of QSDs
Quasi-symmetric designs with triangle-free block graph

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