Pairwise reflection symmetry exists in generalized Latin rectangles for λ=1 if and only if n is a power of two, with constructions for sufficiently large odd λ and computational searches revealing group structure.
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A literature review of authentication in quantum networks concludes that it is not an intrinsic limitation but depends on explicit resources and deployment assumptions.
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Pairwise Reflection Symmetry in Generalized Latin Rectangles
Pairwise reflection symmetry exists in generalized Latin rectangles for λ=1 if and only if n is a power of two, with constructions for sufficiently large odd λ and computational searches revealing group structure.