Partial geometric designs having circulant concurrence matrices

Abstract: We classify small partial geometric designs (PGDs) by spectral characteristics of their concurrence matrices. It is well known that the concurrence matrix of a PGD can have at most three distinct eigenvalues, all of which are nonnegative integers. The matrix contains useful information on the incidence structure of the design. An ordinary 2‐ ( v , k , λ ) $(v,k,\lambda )$ design has a single concurrence λ $\lambda $, and its concurrence matrix is circulant, a partial geometry has two concurrences 1 and 0, and… Show more

“…3 be the nonsymmetric self-dual association scheme as 16 [18] in [10]. Then its character table is (cf.…”

“…Nowak et al [14] and Olmez [17] investigated which difference sets and difference families produce partial geometric designs, and Nowak et al [15] discovered a family of partial geometric designs arising from the fusion schemes of certain Hamming schemes. Furthermore, Song et al [18] studied partial geometric designs by spectral characteristics of their concurrence matrices. In [22] a one-to-one correspondence between partial geometric designs and partial geometric difference sets is established.…”

Self‐dual association schemes, fusions of Hamming schemes, and partial geometric designs

“…3 be the nonsymmetric self-dual association scheme as 16 [18] in [10]. Then its character table is (cf.…”

“…Nowak et al [14] and Olmez [17] investigated which difference sets and difference families produce partial geometric designs, and Nowak et al [15] discovered a family of partial geometric designs arising from the fusion schemes of certain Hamming schemes. Furthermore, Song et al [18] studied partial geometric designs by spectral characteristics of their concurrence matrices. In [22] a one-to-one correspondence between partial geometric designs and partial geometric difference sets is established.…”

Self‐dual association schemes, fusions of Hamming schemes, and partial geometric designs