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- Classification of triply transitive finite groups
What I really mean , Start with a two transitive group then add a one elemen to acted set,Find an another set which is transitive on new set, If you define a semiderect produc of these two group such that two transitive group behave like a stabilizer,then you will get three transitive group I hope the idea is clear
- What does it mean for a group action to be sharply transitive?
I have just become comfortable with the concept of K-transitivity of group actions Now, as I begin to read more, I find some literature referencing a new term, "Sharply N-Transitive," where "N" is
- Sharply $2$-transitive subgroup of a group
Sharply $2$-transitive subgroup of a group Ask Question Asked 9 years, 11 months ago Modified 9 years, 11 months ago
- Approximating integrals with a sharply peaked integrand
Approximating integrals with a sharply peaked integrand Ask Question Asked 5 years, 6 months ago Modified 5 years, 2 months ago
- Sharply $k$-transitive actions on spheres - Mathematics Stack Exchange
A nice fact from complex analysis is that the mobius group acts sharply 3-transitively on the Riemann sphere I am wondering if other sharply k-transitive (continuous
- Classifying sharply 3-transitive actions on spheres.
My question is, are the only sharply $3$ -transitive actions on spheres the mobius transformations, up to conjugation by a self-homeomorphism of the sphere? I'm also interested in the analogous question when we look at the extended real line and real mobius transformations
- Why Mathieu group M11 is sharply 4-transitive?
I am studying Steiner system and Construction of Mathieu groups from automorphism of some Steiner system Mathieu group M11 is automorhism group of S(4,5,11) Steiner system I am not able to underst
- Zassenhauss theorem on sharply 3-transitive groups
William Kerby's lecture note on "On infinite sharply multiply transitive groups" has it (Thm 10 2), however uses abstractions through skew fields I was wondering if there is a self contained proof without too much of details
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