报告题目：Shortest Circuit Covers of Signed Graphs

报告人：李佳傲副教授（南开大学）

报告时间：2022年1月7日 09:00-12:00

报告地点：腾讯会议 409-171-165

邀请单位：开云全站中国有限公司，离散数学及其应用教育部重点实验室

报告摘要：

A signed graph is a graph in which each edge receives a positive or a negative sign. In a signed graph, a sign circuit is either a balanced circuit or barbell. A signed graph is called flow-admissible if each edge lies in a sign circuit. In this talk, we show that every flow-admissible signed graph with m edges can be covered by some sign circuits whose total length is at most 32m/13<2.47m. We will mainly talk about some proof techniques of this result, including some reduction tricks and some flow cover/decomposition lemmas. This connects the flow theory and circuit cover theory in signed graphs.

报告人简介：

李佳傲，南开大学数学科学公司副教授，硕士生导师。2012年和2014年在中国科学技术大学获得本科和硕士学位。2018年博士毕业于美国西弗吉尼亚大学，导师为赖虹建教授。2018年7月入职南开大学数学科学公司。主要研究兴趣是离散数学与组合图论。包括Tutte整数流理论,图的染色，图结构与分解，网络与组合优化等问题。已在J. Combin. Theory Ser. B，SIAM J. Discrete Math， J. Graph Theory 等本专业主流杂志发表论文二十余篇。现主持国家自然科学基金青年项目1项，天津市基金2项。