Algebraic Constructions of Universal Cycles on Grassmannians Gq(2,n)
Abstract
We study universal cycles on the Grassmannian Gq(2,n), the set of 2-dimensional Fq-subspaces of Fqn. While their existence is known from inductive and Eulerian graph methods, we give a direct algebraic construction when n is odd under the coprimality condition (n,\,q(q2-1))=1, using a projective-ratio decomposition and a global product condition. We also present explicit examples where a single cycle is simultaneously universal for both Gq(2,5) and Gq(3,5), realizing Grassmannian duality |Gq(k,n)|=|Gq(n-k,n)| at the level of universal cycles.
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