12-12【李佳傲】五教5401 吴文俊数学重点实验室组合图论系列讲座之150

发布者:万宏艳发布时间:2019-12-10浏览次数:800

题目:Integer Flows of Highly Connected Graphs and Signed Graphs

报告人:李佳傲 博士 南开大学


时间:12月12号 10:30-11:30


地点:五教5401


摘要:

Tutte's and Jaeger's flow conjectures predict existence of flows for highly connected graphs. Seymour and Jaeger provided $6$-flows and $4$-flows for $2$- and $4$-edge-connected graphs, respectively.  Lovasz, Thomassen, Wu and Zhang  showed that every $6p$-edge-connected graph admits a circular $(2+\frac{1}{p})$-flow. In this talk, we are able to provide a  flow value for each given  edge connectivity, showing that  every $(6p-2)$-edge-connected graph admits a circular $(2+\frac{2}{2p-1})$-flow, and every $(6p+2)$-edge-connected admits a circular flow strictly less than $2+\frac{1}{p}$. Similar results on flows of signed graphs under given edge connectivity are discussed.



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