Correction to: “Transverse quadruple systems with five holes”

## Abstract Transverse Steiner quadruple systems with five holes are either of type __g__^5^ or __g__^4^__u__^1^. We concentrate on the systems of type g^4^__u__^1^ and settle existence except when __g__ ≡ __u__ ≡ 2 (mod 4) and all except 40 parameter situations when __g__ ≡ __u__ + 2 ≡ 0 (mod 4).

## Abstract In this article, we investigate a block sequence of a Steiner quadruple system which contains the blocks exactly once such that the collection of all blocks together with all unions of two consecutive blocks of the sequence forms an error correcting code with minimum distance four. In p

An error in the proof of the Theorem 1 of a previous paper of the author's is corrected. It is also pointed out that an important class of system/signal models, called composite sources, can be cast into the framework of the model considered in the referenced paper. Thus, the parameter estimation/sy