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A short proof of R udnev’s point-plane incidence bound

2 Pith papers cite this work. Polarity classification is still indexing.

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abstract

In this note we give a shortened proof of a theorem of Rudnev, which bounds the number of incidences between points and planes over an arbitrary field. Rudnev's proof uses a map that goes via the four-dimensional Klein quadric to a three-dimensional space, where it applies a bound of Guth and Katz on intersection points of lines. We describe a simple geometric map that directly sends point-plane incidences to line-line intersections in space, allowing us to reprove Rudnev's theorem with fewer technicalities.

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2026 2

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UNVERDICTED 2

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Entropy lower bounds and sum-product phenomena

math.CO · 2026-04-22 · unverdicted · novelty 7.0

Entropy lower bounds are established for sums and products, including a max(H(X+X'), H(XX')) bounded below by a linear function of H(X) and min-entropy of X over arbitrary fields.

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  • Entropy lower bounds and sum-product phenomena math.CO · 2026-04-22 · unverdicted · none · ref 8

    Entropy lower bounds are established for sums and products, including a max(H(X+X'), H(XX')) bounded below by a linear function of H(X) and min-entropy of X over arbitrary fields.