The “sticky conjecture” states that a geometric lattice is modular if and only if any two of its extensions can be “glued together”.
We define a matroid M to be sticky if every two extensions of M can be glued together along M. It is proved that. 1. (i) every modular matroid i ssticky.
Jun 15, 2009 · The sticky matroid conjecture asserts that a matroid is sticky if and only if it is modular. Poljak and Turzik proved that no rank-3 matroid ...
A matroid is sticky if any two of its extensions by disjoint sets can be glued together along the common restriction (that is, they have an amalgam).
ABSTRACT. A matroid is sticky if any two of its extensions by disjoint sets can be glued together along the common restriction (that is, ...
We define a matroid M to be sticky if every two extensions of M can be glued together along M. It is proved that 1.(i) every modular matroid i ssticky. 2.
Apr 27, 2017 · We prove the equivalence of Kantor's Conjecture and the Sticky Matroid Conjecture due to Poljak und Turzík.
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Feb 12, 2019 · We prove the equivalence of Kantor's Conjecture and the Sticky Matroid Conjecture due to Poljak und Turzík.
We prove the equivalence of Kantor's Conjecture and the Sticky Matroid Conjecture due to Poljak und Turzík. 7 Citations.
A matroid is sticky if any two of its extensions by disjoint sets can be glued together along the common restriction (that is, they have an amalgam).