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Reduction and Efficient Solution of ILP Models of Mixed Hamming Packings Yielding Improved Upper Bounds

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  • Péter Naszvadi

    (Faculty of Informatics, Eötvös Loránd University, 1117 Budapest, Hungary
    HUN-REN Wigner Research Centre for Physics, 1121 Budapest, Hungary)

  • Peter Adam

    (HUN-REN Wigner Research Centre for Physics, 1121 Budapest, Hungary
    Institute of Physics, University of Pécs, 7624 Pécs, Hungary)

  • Mátyás Koniorczyk

    (HUN-REN Wigner Research Centre for Physics, 1121 Budapest, Hungary)

Abstract

We consider mixed Hamming packings, addressing the maximal cardinality of codes with a minimum codeword Hamming distance. We do not rely on any algebraic structure of the alphabets. We extend known-integer linear programming models of the problem to be efficiently tractable using standard ILP solvers. This is achieved by adopting the concept of contact graphs from classical continuous sphere packing problems to the present discrete context, resulting in a reduction technique for the models which enables their efficient solution as well as their decomposition to smaller subproblems. Based on our calculations, we provide a systematic summary of all lower and upper bounds for packings in the smallest Hamming spaces. The known results are reproduced, with some bounds found to be sharp, and the upper bounds improved in some cases.

Suggested Citation

  • Péter Naszvadi & Peter Adam & Mátyás Koniorczyk, 2025. "Reduction and Efficient Solution of ILP Models of Mixed Hamming Packings Yielding Improved Upper Bounds," Mathematics, MDPI, vol. 13(16), pages 1-20, August.
    • Handle: RePEc:gam:jmathe:v:13:y:2025:i:16:p:2633-:d:1726028
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