告 人: 池汉慈(西交利物浦大学)

报告时间:2025年5月22日16:30-17:30

报告地点:维格堂113


  要:We construct a continuous 2-parameter family of steady Ricci solitons on complex line bundles over complex projective space of real dimension 4m+2. These complex line bundles are classified by an integer k, and the base space is not necessarily Kähler—Einstein. We show that if k lies between 3 and 2m+1, there exists at least one asymptotically conical (AC) Ricci-flat metric in this family. Furthermore, for each k larger than or equal to 3, the family includes infinitely many asymptotically paraboloidal (AP) steady Ricci solitons.


邀请人:王