Abstract
Suppose that (M,g) and (N,h) are compact smooth Riemannian manifolds without boundaries. For m = dim M {>=}3, and {Phi}: (M,g) {yields} (N,h) is exponentially harmonic, there exists a smooth metric g-tilde conformally equivalent to g such that {Phi}: (M,g-tilde) {yields} (N,h) is harmonic. (author). 7 refs.
Citation Formats
Minchun, Hong.
On the conformal equivalence of harmonic maps and exponentially harmonic maps.
IAEA: N. p.,
1991.
Web.
Minchun, Hong.
On the conformal equivalence of harmonic maps and exponentially harmonic maps.
IAEA.
Minchun, Hong.
1991.
"On the conformal equivalence of harmonic maps and exponentially harmonic maps."
IAEA.
@misc{etde_10105540,
title = {On the conformal equivalence of harmonic maps and exponentially harmonic maps}
author = {Minchun, Hong}
abstractNote = {Suppose that (M,g) and (N,h) are compact smooth Riemannian manifolds without boundaries. For m = dim M {>=}3, and {Phi}: (M,g) {yields} (N,h) is exponentially harmonic, there exists a smooth metric g-tilde conformally equivalent to g such that {Phi}: (M,g-tilde) {yields} (N,h) is harmonic. (author). 7 refs.}
place = {IAEA}
year = {1991}
month = {Jun}
}
title = {On the conformal equivalence of harmonic maps and exponentially harmonic maps}
author = {Minchun, Hong}
abstractNote = {Suppose that (M,g) and (N,h) are compact smooth Riemannian manifolds without boundaries. For m = dim M {>=}3, and {Phi}: (M,g) {yields} (N,h) is exponentially harmonic, there exists a smooth metric g-tilde conformally equivalent to g such that {Phi}: (M,g-tilde) {yields} (N,h) is harmonic. (author). 7 refs.}
place = {IAEA}
year = {1991}
month = {Jun}
}