컨텐츠 시작
학술대회/행사
초록검색
제출번호(No.) | 0555 |
---|---|
분류(Section) | Contributed Talk |
분과(Session) | Geometry (SS-06) |
영문제목 (Title(Eng.)) |
Ricci pseudosymmetric generalized quasi-Einstein manifolds |
저자(Author(s)) |
Shyamal Kumar Hui1, Richard S. Lemence2 Nikhil Banga Sikshan Mahavidyalaya, Bishnupur -- 722122, Bankura, West Bengal, India1, Institute of Mathematics, College of Science, University of the Philippines, Diliman, Quezon City 1101 Philippines2 |
초록본문(Abstract) | As a generalization of quasi-Einstein manifold, De and Ghosh introduced the notion of generalized quasi-Einstein manifold. In this talk, we present some results on Ricci pseudosymmetric generalized quasi-Einstein manifolds (briefly, $G(QE)_{n}$). Specifically, we present results on concircular Ricci pseudosymmetric $G(QE)_{n}$, projective Ricci pseudosymmetric $G(QE)_{n}$, $W_3$-Ricci pseudosymmetric $G(QE)_{n}$, conharmonic Ricci pseudosymmetric $G(QE)_{n}$, conformal Ricci pseudosymmetric $G(QE)_{n}$ and quasi-conformal Ricci pseudosymmetric $G(QE)_{n}$. |
분류기호 (MSC number(s)) |
53B30, 53C15, 53C25 |
키워드(Keyword(s)) | generalized quasi-Einstein manifold, Ricci pseudosymmetric manifold, concircular curvature tensor, projective curvature tensor, $W_3$-curvature tensor, conharmonic curvature tensor, conformal curvatur |
강연 형태 (Language of Session (Talk)) |
English |