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Felix Goldberg
Felix Goldberg
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Constructions of $$2-(v,3,3)$-designs

I am looking for ways to construct an infinite family of designs with parameters $(v,3,3)$$2-(v,3,3)$ and apart from some doubling-type recursive constructions (such as in this paper) I haven't found anything in the literature.

So, are there "explicit" ways to construct a family of such designs?

Constructions of $(v,3,3)$-designs

I am looking for ways to construct an infinite family of designs with parameters $(v,3,3)$ and apart from some doubling-type recursive constructions (such as in this paper) I haven't found anything in the literature.

So, are there "explicit" ways to construct a family of such designs?

Constructions of $2-(v,3,3)$-designs

I am looking for ways to construct an infinite family of designs with parameters $2-(v,3,3)$ and apart from some doubling-type recursive constructions (such as in this paper) I haven't found anything in the literature.

So, are there "explicit" ways to construct a family of such designs?

Source Link
Felix Goldberg
Felix Goldberg
  • 7k
  • 4
  • 31
  • 55

Constructions of $(v,3,3)$-designs

I am looking for ways to construct an infinite family of designs with parameters $(v,3,3)$ and apart from some doubling-type recursive constructions (such as in this paper) I haven't found anything in the literature.

So, are there "explicit" ways to construct a family of such designs?