Introduces a q-analogue of the rational normal curve to give a geometric characterization of linearized Reed-Solomon codes and analyze the Hilbert function of the associated coordinate ring.
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3 Pith papers cite this work. Polarity classification is still indexing.
years
2026 3verdicts
UNVERDICTED 3representative citing papers
Decoded quantum interferometry is generalized to translation association schemes, reducing analysis to tridiagonal eigenvalue problems, with a finite-field matrix rank-difference protocol that produces constant-probability residual-rank bounds but no additive optimality guarantee.
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.
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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.