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Research Paper#Finite Geometry, Combinatorial Design🔬 ResearchAnalyzed: Jan 3, 2026 08:48

Small 3-fold Blocking Sets in PG(2,p^n)

Published:Dec 31, 2025 07:48
1 min read
ArXiv

Analysis

This paper addresses the open problem of constructing small t-fold blocking sets in the finite Desarguesian plane PG(2,p^n), specifically focusing on the case of 3-fold blocking sets. The construction of such sets is important for understanding the structure of finite projective planes and has implications for related combinatorial problems. The paper's contribution lies in providing a construction that achieves the conjectured minimum size for 3-fold blocking sets when n is odd, a previously unsolved problem.
Reference

The paper constructs 3-fold blocking sets of conjectured size, obtained as the disjoint union of three linear blocking sets of Rédei type, and they lie on the same orbit of the projectivity (x:y:z)↦(z:x:y).

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Research#Geometry🔬 ResearchAnalyzed: Jan 10, 2026 08:44

Quiver Braid Group Action Applied to 3-Fold Crepant Resolution

Published:Dec 22, 2025 08:39
1 min read
ArXiv

Analysis

This research paper explores the application of quiver braid group actions within the context of 3-fold crepant resolutions, a complex topic in algebraic geometry. The study likely contributes to the understanding of singularities and their resolutions, potentially impacting related fields.
Reference

The paper focuses on quiver braid group action for a 3-fold crepant resolution.

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