Pages that link to "Item:Q1344230"
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The following pages link to Equivariant homotopy of posets and some applications to subgroup lattices (Q1344230):
Displaying 22 items.
- A characterization of solvability for finite groups in terms of their frame. (Q734754) (← links)
- The category of G-posets (Q776993) (← links)
- Group actions on finite spaces (Q801340) (← links)
- Plethysm for wreath products and homology of sub-posets of Dowling lattices (Q870002) (← links)
- Equivariant collapses and the homotopy type of iterated clique graphs (Q932589) (← links)
- Type d'homotopie des treillis et treillis des sous-groupes d'un groupe fini. (Homotopy type of lattices and lattices of subgroups of a finite groups) (Q1084422) (← links)
- The combinatorics and the homology of the poset of subgroups of \(p\)-power index (Q1313798) (← links)
- A note on the homotopy type of posets (Q1318820) (← links)
- On the Möbius number of the subgroup lattice of the symmetric group (Q1356039) (← links)
- The homotopy types of the posets of \(p\)-subgroups of a finite group (Q1705488) (← links)
- Symmetric products and subgroup lattices (Q1746310) (← links)
- Poset splitting and minimality of finite models (Q1747765) (← links)
- On the topology of two partition posets with forbidden block sizes (Q1840487) (← links)
- Combinatorial properties of intervals in finite solvable groups (Q1890811) (← links)
- Order analogues and Betti polynomials (Q1923997) (← links)
- The action of Young subgroups on the partition complex (Q1983147) (← links)
- Homotopy equivalences between \(p\)-subgroup categories (Q2259196) (← links)
- Poset-stratified space structures of homotopy sets (Q2326297) (← links)
- Equivariant Euler characteristics of subgroup complexes of symmetric groups (Q2694457) (← links)
- On the poset of conjugacy classes of subgroups of π-power index (Q4342909) (← links)
- A homotopy equivalence for partition posets related to liftings of \(S_{n-1}\)-modules to \(S_n\) (Q5937132) (← links)
- New approach to the groups \(H_* (\Sigma_n, \text{Lie}_n)\) by the homology theory of the category of functors (Q5939607) (← links)
