Pages that link to "Item:Q2551965"
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The following pages link to Every group is the collineation group of some projective plane (Q2551965):
Displaying 19 items.
- A convex polytope and an antimatroid for any given, finite group (Q510527) (← links)
- Simple groups acting on translation planes (Q580704) (← links)
- On the full automorphism group of a Hamiltonian cycle system of odd order (Q897244) (← links)
- Gruppenuniversalität und Homogenisierbarkeit (Q1073014) (← links)
- Freie Möbiusebenen. (Free Moebius planes) (Q1098094) (← links)
- Equivalence structures and their automorphisms (Q1101821) (← links)
- Automorphism groups of finite distributive lattices with a given sublattice of fixed points (Q1141160) (← links)
- Automorphism groups of posets and lattices with a given subset of fixed points (Q1159218) (← links)
- Dimension and automorphism groups of lattices (Q1169489) (← links)
- Automorphismengruppen von Hasse-Diagrammen modularer Verbände (Q1212484) (← links)
- On the collineation groups of infinite projective and affine planes (Q1237947) (← links)
- Embeddings and collineation groups of projective planes (Q1238989) (← links)
- Vector representable matroids of given rank with given automorphism group (Q1252862) (← links)
- Every group is the automorphism group of a rank-3 matroid (Q1336195) (← links)
- Pathological projective planes: associate affine planes (Q2562511) (← links)
- On 2-factorizations of the complete graph: From the<i>k</i>-pyramidal to the universal property (Q3184590) (← links)
- The class of non-Desarguesian projective planes is Borel complete (Q4683539) (← links)
- Some Results on 1‐Rotational Hamiltonian Cycle Systems (Q4979577) (← links)
- Realisation of groups as automorphism groups in permutational categories (Q5013339) (← links)