AbstractUsing a gradient flow approach initiated by S. Brendle, we generalize the existence theorem for the prescribing Q-curvature equation on S2 (Gauss curvature) by M. Struwe (2005) [14] and on S4 by Malchiodi and Struwe (2006) [12] to Sn for all even n with the similar assumption on the prescribed curvature candidate f
We study graphical mean curvature flow of complete solutions defined on subsets of Euclidean space. ...
AbstractThis is the first part of a series devoting to the study of the prescribing scalar curvature...
AbstractOnSn, there is a naturally metric definednth order conformal invariant operatorPn. Associate...
AbstractUsing a gradient flow approach initiated by S. Brendle, we generalize the existence theorem ...
AbstractIn this paper, we study the Q-curvature flow on the standard sphere S4. We show that the flo...
We study a natural counterpart of the Nirenberg problem, namely to prescribe the Q-curvature of a c...
In this dissertation, we seek to understand prescribed scalar curvature through the gradient flow of...
AbstractIn this paper we prescribe a fourth order curvature – the Q-curvature on the standard n-sphe...
In this note, we study the curvature flow to the Nirenberg problem on S(2) with non-negative nonline...
Given a compact four dimensional smooth Riemannian manifold (M, g) with smooth boundary, we con-side...
AbstractLet (Sn, g0) be the standard n-sphere. The following question was raised by L. Nirenberg. Wh...
AbstractBy using the equivalent integral form for the Q-curvature equation, we generalize the well-k...
Mean curvature flow is the gradient flow of the area functional and constitutes a natural geometric ...
[[abstract]]Let the Paneitz operator P-0 be strictly positive on a closed 3-manifold M with a fixed ...
AbstractThis is the second part of a series devoting to the study of the prescribing scalar curvatur...
We study graphical mean curvature flow of complete solutions defined on subsets of Euclidean space. ...
AbstractThis is the first part of a series devoting to the study of the prescribing scalar curvature...
AbstractOnSn, there is a naturally metric definednth order conformal invariant operatorPn. Associate...
AbstractUsing a gradient flow approach initiated by S. Brendle, we generalize the existence theorem ...
AbstractIn this paper, we study the Q-curvature flow on the standard sphere S4. We show that the flo...
We study a natural counterpart of the Nirenberg problem, namely to prescribe the Q-curvature of a c...
In this dissertation, we seek to understand prescribed scalar curvature through the gradient flow of...
AbstractIn this paper we prescribe a fourth order curvature – the Q-curvature on the standard n-sphe...
In this note, we study the curvature flow to the Nirenberg problem on S(2) with non-negative nonline...
Given a compact four dimensional smooth Riemannian manifold (M, g) with smooth boundary, we con-side...
AbstractLet (Sn, g0) be the standard n-sphere. The following question was raised by L. Nirenberg. Wh...
AbstractBy using the equivalent integral form for the Q-curvature equation, we generalize the well-k...
Mean curvature flow is the gradient flow of the area functional and constitutes a natural geometric ...
[[abstract]]Let the Paneitz operator P-0 be strictly positive on a closed 3-manifold M with a fixed ...
AbstractThis is the second part of a series devoting to the study of the prescribing scalar curvatur...
We study graphical mean curvature flow of complete solutions defined on subsets of Euclidean space. ...
AbstractThis is the first part of a series devoting to the study of the prescribing scalar curvature...
AbstractOnSn, there is a naturally metric definednth order conformal invariant operatorPn. Associate...
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