Groups: statistics, structure, and algorithms. Science today relies on digital technologies using quantised and digital information. Because of the discrete nature of digital information, much of the mathematics underpinning these advances comes from the core disciplines of algebra and combinatorics within which this proposal falls. All aspects of the proposal focus on strengthening theoretical understanding of algebraic and combinatorial structures, and increasing computational power for workin ....Groups: statistics, structure, and algorithms. Science today relies on digital technologies using quantised and digital information. Because of the discrete nature of digital information, much of the mathematics underpinning these advances comes from the core disciplines of algebra and combinatorics within which this proposal falls. All aspects of the proposal focus on strengthening theoretical understanding of algebraic and combinatorial structures, and increasing computational power for working with them. The fundamental research outcomes, in terms of theorems, algorithms, and the training of young research mathematicians, will thus both enhance the high international standing of Australian mathematics, and strengthen Australia's capabilities in these important areas.Read moreRead less
Factorisation of Finite Groups and Graphs. The combinatorial structure of a graph is strongly influenced by its
symmetry, and the symmetry is described precisely by its group of
automorphisms. Interplay between actions of the automorphism group on
vertices, edges, and other configurations, reveals important graph
structure, especially the existence of graph factorisations. In turn, a group factorisation arises whenever a group has two
independent transitive actions, and these arise in parti ....Factorisation of Finite Groups and Graphs. The combinatorial structure of a graph is strongly influenced by its
symmetry, and the symmetry is described precisely by its group of
automorphisms. Interplay between actions of the automorphism group on
vertices, edges, and other configurations, reveals important graph
structure, especially the existence of graph factorisations. In turn, a group factorisation arises whenever a group has two
independent transitive actions, and these arise in particular while
determining graph automorphism groups, and graph factorisations. We will classify families of group factorisations, especially for simple groups, and apply this to establish a theory of symmetrical graph
factorisations, and to study Cayley graphs and 2-closures of permutation groups.
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Efficient computation in finite groups with applications in algebra and graph theory. The cutting-edge research of the project will further strengthen Australia's prominent role in computational group theory and algebraic graph theory. Besides the theoretical advances, the project includes the implementation and wide distribution of matrix group algorithms, benefiting immediately the algebraic research community and undergraduate mathematical education.
Finite permutation groups and flag-transitive incidence structures. Mathematics is the enabling discipline for all the sciences and so a strong mathematical research community in Australia provides the foundations for future discoveries in science and technology. By developing new theory for permutation groups, producing a new paradigm for the study of Buekenhout geometries and classifying certain families of flag-transitive incidence structures, we will enhance Australia's leading position in P ....Finite permutation groups and flag-transitive incidence structures. Mathematics is the enabling discipline for all the sciences and so a strong mathematical research community in Australia provides the foundations for future discoveries in science and technology. By developing new theory for permutation groups, producing a new paradigm for the study of Buekenhout geometries and classifying certain families of flag-transitive incidence structures, we will enhance Australia's leading position in Permutation Group Theory, Algebraic Graph Theory and Finite Geometry. This will attract international and Australian postgraduate students and visitors, and strengthen the research activities of Australia by enhancing the collaboration between UWA and leading international universities.Read moreRead less