Fork= 8,9,10 and 2k+ 1≤n≤4k, one can check by direct computation that (2.8) holds

Thus, to show (A

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A product version of the Hilton-Milner Theorem II

math.CO · 2026-05-10 · unverdicted · novelty 6.0

For k-subset families that cross-intersect but each lacks a common element, their size product is bounded by the square of the Hilton-Milner number when k is at least 8.

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A product version of the Hilton-Milner Theorem II math.CO · 2026-05-10 · unverdicted · none · ref 16
For k-subset families that cross-intersect but each lacks a common element, their size product is bounded by the square of the Hilton-Milner number when k is at least 8.

Fork= 8,9,10 and 2k+ 1≤n≤4k, one can check by direct computation that (2.8) holds

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