P-22 Ricci solitons on Riemannian submanifolds with special vector field
Presenter Status
Professor, Department of Mathematics
Preferred Session
Poster Session
Location
Buller Hall Hallways
Start Date
22-10-2021 2:00 PM
End Date
22-10-2021 3:00 PM
Presentation Abstract
We investigate the recent development of Ricci solitons on Riemannian submanifolds with several kinds of vector fields. Many results have been provided after Perelman used the Ricci soliton to solve the Poincare conjecture. This notion also has some connection with rectifying submanifolds and some recent characterization results will be discussed.
P-22 Ricci solitons on Riemannian submanifolds with special vector field
Buller Hall Hallways
We investigate the recent development of Ricci solitons on Riemannian submanifolds with several kinds of vector fields. Many results have been provided after Perelman used the Ricci soliton to solve the Poincare conjecture. This notion also has some connection with rectifying submanifolds and some recent characterization results will be discussed.