报告题目:Sequencing Groups
报告人: Brian Alspach, University of Newcastle
报告时间:6月3日 15:00
报告地点:数A302
内容简介: Basil Gordon (1961) defined a finite group G to be sequenceable if there is a permutation g(1),g(2),…,g(n) of the non-elements of G so that the partial products g(1), g(1)g(2), g(1)g(2)g(3),…,g(1)g(2)g(3)..g(n) are distinct. It is R-sequenceable if the preceding vertices form a directed cycle whose arcs are generated by distinct elements of G. It was conjectured that every finite abelian group either is sequenceable or R-sequenceable. The conjecture has been solved recently. I shall discuss the proof and then discuss a generalization known as strongly sequenceable.