黄元秋: On the sizes of matchings in 1-planar graphs with high minimum degree
发布日期:2022-04-14  字号:   【打印

报告时间:2022年4月19日(星期二)14:00

报告平台:腾讯会议 ID:477 734 080,密码:357159

:黄元秋 教授

工作单位:湖南师范大学

举办单位:数学学院

报告简介

A matching of a graph is a set of edges without common end vertex. A graph is called 1-planar if it admits a drawing in the plane such that each edge is crossed at most once. Recently, Biedl and Wittnebel proved that every 1-planar graph with minimum degree 3 and n≥7 vertices has a matching of size at least (n+12)/7, and this is tight for some graphs; they also provided tight lower bounds on the matching of sizes for 1-planar graphs with minimum degree 4 and 5. In this paper, we show that any 1-planar graph with minimum degree 6 and n≥32 vertices has a matching of size at least (3n+4)/7, and this lower bound is tight. Our result confirms a conjecture posed by Biedl and Wittnebel.

报告人简介

黄元秋,湖南师范大学二级教授、博士生导师,教育部“新世纪优秀人才”入选者,湖南省普通高校学科带头人。现为湖南师范大学数学与统计学院副院长、中国组合数学与图论学会理事、中国运筹学会理事、湖南省数学学会常务理事。1996年博士毕业于中国科学院应用数学研究所,主要从事图论与组合中相关问题的研究,包括图的亏格及最大亏格、图在曲面上的嵌入分布、图的交叉数、图的k-平面性等。在 J. Combin. Theory Ser. B、J. Graph Theory、Discrete Math.、Discrete Appl. Math.、Eur. J. Combin.、Electron. J. Combin.以及 《中国科学》等国内外学术期刊上发表论文120余篇。5次主持完成国家自然科学基金项目,以及省部级科研项目多项。