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A necessary and sufficient condition for the nirenberg problem

✍ Scribed by Wenxiong Chen; Congming Li

Publisher
John Wiley and Sons
Year
1995
Tongue
English
Weight
493 KB
Volume
48
Category
Article
ISSN
0010-3640

No coin nor oath required. For personal study only.

✦ Synopsis

We seek metrics conformal to the standard ones on S" having prescribed Gaussian curvature in case n = 2 (the Nirenberg Problem), or prescribed scalar curvature for n t 3 (the Kazdan-Warner problem). There are well-known Kazdan-Warner and Bourguignon-Ezin necessary conditions for a function R(x) to be the scalar curvature of some conformally related metric. Are those necessary conditions also sufficient? This problem has been open for many years.

In a previous paper, we answered the question negatively by providing a family of counter examples.

In this paper, we obtain much stronger results. We show that, in all dimensions, if R(x) is rotationally symmetric and monotone in the region where it is positive, then the problem has no solution at all. It follows that, on S2, for a non-degenerate, rotationally symmetric function RW), a necessary and sufficient condition for the problem to have a solution is that R' changes signs in the region where it is positive. This condition, however, is still not sufficient to guarantee the existence of a rotationally symmetric solution, as will be shown in this paper. We also consider similar necessary conditions for non-symmetric functions. @ 1995 John Wiley & Sons, Inc.

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