Abstract
A class of harmonic n-manifold, denoted by HM{sub n}, is, in fact, focussed on a Riemannian manifold with harmonic curvature. A variety of results, with properties, on HM{sub n} is presented in a fair order. Harmonic manifolds are then touched upon manifolds with recurrent Ricci curvature, biRicci-recurrent curvature and recurrent conformal curvature, and, in consequence, a sequence of theorems are deduced. (author). 21 refs.
Citation Formats
Rahman, M S, and Weihuan, Chen.
Some theorems on a class of harmonic manifolds.
IAEA: N. p.,
1993.
Web.
Rahman, M S, & Weihuan, Chen.
Some theorems on a class of harmonic manifolds.
IAEA.
Rahman, M S, and Weihuan, Chen.
1993.
"Some theorems on a class of harmonic manifolds."
IAEA.
@misc{etde_10113165,
title = {Some theorems on a class of harmonic manifolds}
author = {Rahman, M S, and Weihuan, Chen}
abstractNote = {A class of harmonic n-manifold, denoted by HM{sub n}, is, in fact, focussed on a Riemannian manifold with harmonic curvature. A variety of results, with properties, on HM{sub n} is presented in a fair order. Harmonic manifolds are then touched upon manifolds with recurrent Ricci curvature, biRicci-recurrent curvature and recurrent conformal curvature, and, in consequence, a sequence of theorems are deduced. (author). 21 refs.}
place = {IAEA}
year = {1993}
month = {Aug}
}
title = {Some theorems on a class of harmonic manifolds}
author = {Rahman, M S, and Weihuan, Chen}
abstractNote = {A class of harmonic n-manifold, denoted by HM{sub n}, is, in fact, focussed on a Riemannian manifold with harmonic curvature. A variety of results, with properties, on HM{sub n} is presented in a fair order. Harmonic manifolds are then touched upon manifolds with recurrent Ricci curvature, biRicci-recurrent curvature and recurrent conformal curvature, and, in consequence, a sequence of theorems are deduced. (author). 21 refs.}
place = {IAEA}
year = {1993}
month = {Aug}
}