A Higman inequality for regular near polygons

Vanhove, Frédéric

doi:10.1007/s10801-011-0275-7

Cited by 10 publications

(10 citation statements)

References 35 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…The lower bound for t generalizes a lower bound obtained in [15]. In fact, the techniques we invoked in this section are similar to some of the techniques used in [15] and [32].…”

Section: A Generalization Of the Haemers-roos Inequalitymentioning

confidence: 67%

On tetrahedrally closed line systems and a generalization of the Haemers-Roos inequality

Bruyn

2020

Linear Algebra and its Applications

View full text Add to dashboard Cite

We generalize the well-known Haemers-Roos inequality for generalized hexagons of order (s, t) to arbitrary near hexagons S with an order. The proof is based on the fact that a certain matrix associated with S is idempotent. The fact that this matrix is idempotent has some consequences for tetrahedrally closed line systems in Euclidean spaces. One of the early theorems relating these line systems with near hexagons is known to contain an essential error. We fix this gap here in the special case for geometries having an order.

show abstract

“…The lower bound for t generalizes a lower bound obtained in [15]. In fact, the techniques we invoked in this section are similar to some of the techniques used in [15] and [32].…”

Section: A Generalization Of the Haemers-roos Inequalitymentioning

confidence: 67%

On tetrahedrally closed line systems and a generalization of the Haemers-Roos inequality

Bruyn

2020

Linear Algebra and its Applications

View full text Add to dashboard Cite

show abstract

“…Cameron, Goethals and Seidel [4] extended Segre's result to all generalised quadrangles of order (q, q 2 ), q odd. This was then extended further to regular near 2d-gons of order (s, t) by Vanhove [18], which also provided a generalisation of the so-called Higman bound : if s > 1 then the intersection number c i for all i ∈ {1, . .…”

Section: Introductionmentioning

confidence: 99%

“…, d} then any nontrivial m-ovoid is a hemisystem [18,Theorem 3]. Vanhove showed that for q odd if DH(2d − 1, q 2 ) has a hemisystem then it induces a distance regular graph with classical parameters [18,Theorem 4]. Hence the question of the existence of hemisystems in DH(2d −1, q 2 ) is of great interest.…”

Section: Introductionmentioning

confidence: 99%

On m-ovoids of regular near polygons

Bamberg

Lansdown

Lee

2017

Des. Codes Cryptogr.

View full text Add to dashboard Cite

show abstract

“…The properties of D-bounded distance-regular graphs were studied in [13], and these properties were used in the classification of classical distance-regular graphs of negative type [15]. Other applications of D-bounded distance-regular graphs are given in [3,12,13,15]. Before stating our main results, we show one more definition and some known results.…”

Section: Introductionmentioning

confidence: 99%

Nonexistence of a Class of Distance-Regular Graphs

Huang¹,

Pan²,

Weng³

2015

Electron. J. Combin.

View full text Add to dashboard Cite

Let $\Gamma$ denote a distance-regular graph with diameter $D \geq 3$ and intersection numbers $a_1=0, a_2 \neq 0$, and $c_2=1$. We show a connection between the $d$-bounded property and the nonexistence of parallelograms of any length up to $d+1$. Assume further that $\Gamma$ is with classical parameters $(D, b, \alpha, \beta)$, Pan and Weng (2009) showed that $(b, \alpha, \beta)= (-2, -2, ((-2)^{D+1}-1)/3).$ Under the assumption $D \geq 4$, we exclude this class of graphs by an application of the above connection.

show abstract

A Higman inequality for regular near polygons

Cited by 10 publications

References 35 publications

On tetrahedrally closed line systems and a generalization of the Haemers-Roos inequality

On tetrahedrally closed line systems and a generalization of the Haemers-Roos inequality

On m-ovoids of regular near polygons

Nonexistence of a Class of Distance-Regular Graphs

Contact Info

Product

Resources

About