A characterization of partial geometric designs

It is shown that a partial geowetric design with pzameters (r, k, t, c) satisfying certair conditions is equivalent to a two-class partially balanced incomplete block design. This generalizes a result concerning partial geometric designs and balanced incomplete block designs.

## Beutelspacher A., A combinatorial characterization of geometric spreads, Discrete Mathematics 97 (1991) 59-62. A t-spread in a projective space P = PG(d, q) is a set of t-dimensional subspaces which partitions the point set of P. A t-spread S is called geometric if it induces a spread in any (

Let \(R(, \mathscr{N}, \ldots\) be the space of bounded non-degenerate representations \(\pi: \alpha \rightarrow, 1\), where \(\alpha\) is a nuclear \(C^{*}\)-algebra and, 1 an injective von Neumann algebra with separable predual. We prove that \(R(\mathscr{\mathscr { C } , , 1 )}\) ) is an homogene