On the one-dimensional extensions of q-matroids

Abstract

In this paper we introduce a q-analogue of the single-element extensions of matroids for q-matroids, which we call one-dimensional extensions. To enumerate such extensions, we define a q-analogue of modular cuts and define a certain function which we call a modular cut selector. It assigns each newly appearing one-dimensional subspace to a modular cut. By using these notion, we prove the one-to-one correspondence between the one-dimensional extensions and the modular cut selectors. Furthermore, we define the canonnical representatives of the isomorphic class of the q-matroids, which enable us to enumerate non-isomorphic q-matroids without the paiwise isomorphism testing. As an application, we develop a classification algorithm for q-matroids, and classify all the q-matroids on ground spaces over F2 and F3 of dimension 4 and 5 respectively. We also determine some 5-dimensional q-matroids related to the q-Fano plane, which is the q-analogue of the Fano plane, over F2.

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