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
For the problem of finding a geometry on S-n, for n >= 3, with a prescribed scalar curvature, the...
AbstractThis is the second part of a series devoting to the study of the prescribing scalar curvatur...
In this article we study the nonlocal equation \[ (−∆)^{n/2} u = (n-1)! e^{bu} in \mathbb{R}^n,...
AbstractUsing a gradient flow approach initiated by S. Brendle, we generalize the existence theorem ...
AbstractOnSn, there is a naturally metric definednth order conformal invariant operatorPn. Associate...
AbstractIn this paper we prescribe a fourth order curvature – the Q-curvature on the standard n-sphe...
AbstractBy using the equivalent integral form for the Q-curvature equation, we generalize the well-k...
AbstractIn this paper, we study the Q-curvature flow on the standard sphere S4. We show that the flo...
AbstractThis is the first part of a series devoting to the study of the prescribing scalar curvature...
We study a natural counterpart of the Nirenberg problem, namely to prescribe the Q-curvature of a c...
AbstractWorking in a given conformal class, we prove existence of constant Q-curvature metrics on co...
AbstractLet Pn be the n-th order Paneitz operator on Sn, n⩾3. We consider the following prescribing ...
In this paper we study some fourth order elliptic equation involving the critical Sobolev exponent,...
In this paper we consider Riemannian manifolds (M-n, g) of dimension n >= 5 with semi-positive Q-...
AbstractLet (Sn, g0) be the standard n-sphere. The following question was raised by L. Nirenberg. Wh...
For the problem of finding a geometry on S-n, for n >= 3, with a prescribed scalar curvature, the...
AbstractThis is the second part of a series devoting to the study of the prescribing scalar curvatur...
In this article we study the nonlocal equation \[ (−∆)^{n/2} u = (n-1)! e^{bu} in \mathbb{R}^n,...
AbstractUsing a gradient flow approach initiated by S. Brendle, we generalize the existence theorem ...
AbstractOnSn, there is a naturally metric definednth order conformal invariant operatorPn. Associate...
AbstractIn this paper we prescribe a fourth order curvature – the Q-curvature on the standard n-sphe...
AbstractBy using the equivalent integral form for the Q-curvature equation, we generalize the well-k...
AbstractIn this paper, we study the Q-curvature flow on the standard sphere S4. We show that the flo...
AbstractThis is the first part of a series devoting to the study of the prescribing scalar curvature...
We study a natural counterpart of the Nirenberg problem, namely to prescribe the Q-curvature of a c...
AbstractWorking in a given conformal class, we prove existence of constant Q-curvature metrics on co...
AbstractLet Pn be the n-th order Paneitz operator on Sn, n⩾3. We consider the following prescribing ...
In this paper we study some fourth order elliptic equation involving the critical Sobolev exponent,...
In this paper we consider Riemannian manifolds (M-n, g) of dimension n >= 5 with semi-positive Q-...
AbstractLet (Sn, g0) be the standard n-sphere. The following question was raised by L. Nirenberg. Wh...
For the problem of finding a geometry on S-n, for n >= 3, with a prescribed scalar curvature, the...
AbstractThis is the second part of a series devoting to the study of the prescribing scalar curvatur...
In this article we study the nonlocal equation \[ (−∆)^{n/2} u = (n-1)! e^{bu} in \mathbb{R}^n,...
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