A class of non-embeddable designs

## Abstract We establish the existence of non‐embeddable quasi‐derived 2‐designs with the parameters (13, 4, 3), (15, 6, 5), and (16, 6, 5). © 2007 Wiley Periodicals, Inc. J Combin Designs 16: 364–372, 2008

described a sufficient condition for the non-embeddability of a quasi-derived design into a symmetric balanced incomplete block design. In this paper, by using the notion of incomplete designs, this criterion is changed to find certain quasi-derived designs in some special cases. Many infinite serie

## Abstract The main result in this article is a method of constructing a non‐embeddable quasi‐derived design from a quasi‐derived design and an α‐resolvable design. This method is a generalization of techniques used by van Lint and Tonchev in 14, 15 and Kageyama and Miao in 8. As applications, we

## Abstract We propose a technique for constructing two infinite families of non‐embeddable quasi‐residual designs as soon as one such design satisfying certain conditions exists. The main tools are generalized Hadamard matrices and balanced generalized weighing matrices. Starting with a specific n

## Abstract A Menon design of order __h__^2^ is a symmetric (4__h__^2^,2__h__^2^‐__h__,__h__^2^‐__h__)‐design. Quasi‐residual and quasi‐derived designs of a Menon design have parameters 2‐(2__h__^2^ + __h__,__h__^2^,__h__^2^‐__h__) and 2‐(2__h__^2^‐__h__,__h__^2^‐__h__,__h__^2^‐__h__‐1), respective