Generalizes Delsarte bounds to multivariate Q-polynomial association schemes, deriving upper bounds on codes and designs characterized via Wilson polynomials, plus Lloyd-type conditions and applications to Lee distance and orthogonal arrays.
Duality of translation association schemes coming from certain actions
1 Pith paper cite this work. Polarity classification is still indexing.
abstract
Translation association schemes are constructed from actions of finite groups on finite abelian groups satisfying certain natural conditions. It is also shown that the mere existence of maps from finite groups to themselves sending each element in their groups to its `adjoint' entails the self-duality of the constructed association schemes. Many examples of these, including Hamming scheme and sesquilinear forms schemes, are provided. This con- struction is further generalized to show the duality of the association schemes coming from actions of two finite groups on the same finite abelian group. An example of this is supplied with weak Hamming schemes.
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math.CO 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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Codes and designs in multivariate $Q$-polynomial association schemes
Generalizes Delsarte bounds to multivariate Q-polynomial association schemes, deriving upper bounds on codes and designs characterized via Wilson polynomials, plus Lloyd-type conditions and applications to Lee distance and orthogonal arrays.