The residually weakly primitive and locally two-transitive rank two geometries for the groups PSL(2, q)

De Saedeleer, Julie

15 October 2010

The main goal of this thesis is a contribution to the classification of all incidence geometries of rank two on which some group PSL(2,q), q a prime power, acts flag-transitively. Actually we require that the action be RWPRI (residually weakly primitive) and (2T)1 (doubly transitive on every residue of rank one). In fact our definition of RWPRI requires the geometry to be firm (each residue of rank one has at least two elements) and RC (residually connected). The main goal is achieved in this thesis. It is stated in our "Main Theorem". The proof of this theorem requires more than 60pages. Quite surprisingly, our proof in the direction of the main goal uses essentially the classification of all subgroups of PSL(2,q), a famous result provided in Dickson’s book "Linear groups: With an exposition of the Galois field theory", section 260, in which the group is called Linear Fractional Group LF(n, pn). Our proof requires to work with all ordered pairs of subgroups up to conjugacy. The restrictions such as RWPRI and (2T)1 allow for a complete analysis. The geometries obtained in our "Main Theorem" are bipartite graphs; and also locally 2-arc-transitive graphs in the sense of Giudici, Li and Cheryl Praeger. These graphs are interesting in their own right because of the numerous connections they have with other fields of mathematics.

locally s-arc-transitive graphs

Projective Special Linear Group

Coset Geometries

The residually weakly primitive and locally two-transitive rank two geometries for the groups PSL(2, q)

De Saedeleer, Julie

15 October 2010

The main goal of this thesis is a contribution to the classification of all incidence geometries<p>of rank two on which some group PSL(2,q), q a prime power, acts flag-transitively.<p>Actually we require that the action be RWPRI (residually weakly primitive) and (2T)1<p>(doubly transitive on every residue of rank one). In fact our definition of RWPRI requires<p>the geometry to be firm (each residue of rank one has at least two elements) and RC<p>(residually connected).<p><p>The main goal is achieved in this thesis.<p>It is stated in our "Main Theorem". The proof of this theorem requires more than 60pages.<p><p>Quite surprisingly, our proof in the direction of the main goal uses essentially the classification<p>of all subgroups of PSL(2,q), a famous result provided in Dickson’s book "Linear groups: With an exposition of the Galois field theory", section 260, in which the group is called Linear Fractional Group LF(n, pn).<p><p>Our proof requires to work with all ordered pairs of subgroups up to conjugacy.<p><p>The restrictions such as RWPRI and (2T)1 allow for a complete analysis.<p><p>The geometries obtained in our "Main Theorem" are bipartite graphs; and also locally 2-arc-transitive<p>graphs in the sense of Giudici, Li and Cheryl Praeger. These graphs are interesting in their own right because of<p>the numerous connections they have with other fields of mathematics. / Doctorat en Sciences / info:eu-repo/semantics/nonPublished

Mathématiques

Sciences exactes et naturelles

Linear algebraic groups

Finite simple groups

Groupes linéaires algébriques

Groupes simples finis

locally s-arc-transitive graphs

Projective Special Linear Group

Coset Geometries