Add to ORKGThe goal of the present paper is to investigate the algebraic structure of global conformal invariants of submanifolds. These are defined to be conformally invariant integrals of geometric scalars of the tangent and normal bundle. A famous example of a global conformal invariant is the Willmore energy of a surface. In codimension one we classify such invariants, showing that under a structural hypothesis (more precisely we assume the integrand depends separately on the intrinsic and extrinsic curvatures, and not on their derivatives) the integrand can only consist of an intrinsic scalar conformal invariant, an extrinsic scalar conformal invariant and the Chern-Gauss-Bonnet integrand. In particular, for codimension one surfaces, we show that...
We show, that higher analogs of the Willmore functional, defined on the space of immersions M"2...
For a surface in 3-sphere, by identifying the conformal round 3-sphere as the projectivized positive...
Conformal geometry has occupied an important position in mathematics and physics since early last ce...
The goal of the present paper is to investigate the algebraic structure of global conformal invarian...
ABSTRACT. The goal of the present paper is to investigate the algebraic structure of global conforma...
The Willmore energy, alias bending energy or rigid string action, and its variation-the Wil...
The Willmore energy of a surface is a conformal measure of its failure to be conformally spherical. ...
AbstractThis is the fourth in a series of papers where we prove a conjecture of Deser and Schwimmer ...
The invariant theory for conformal hypersurfaces is studied by treating these as the confor...
tions on a Riemannian manifold Mn with scalar curvature s, is a conformally invariant operator. In t...
AbstractContinuing our study of global conformal invariants for Riemannian manifolds, we find new cl...
For a hypersurface in a conformal manifold, by following the idea of Fefferman and Graham's work, we...
AbstractThe purpose of this paper is to study the conformally invariant functionals of hypersurfaces...
International audienceWe provide the full classification, in arbitrary even and odd dimensions, of g...
We consider the integral of (the square of) the length of the normal curvature tensor for immersions...
We show, that higher analogs of the Willmore functional, defined on the space of immersions M"2...
For a surface in 3-sphere, by identifying the conformal round 3-sphere as the projectivized positive...
Conformal geometry has occupied an important position in mathematics and physics since early last ce...
The goal of the present paper is to investigate the algebraic structure of global conformal invarian...
ABSTRACT. The goal of the present paper is to investigate the algebraic structure of global conforma...
The Willmore energy, alias bending energy or rigid string action, and its variation-the Wil...
The Willmore energy of a surface is a conformal measure of its failure to be conformally spherical. ...
AbstractThis is the fourth in a series of papers where we prove a conjecture of Deser and Schwimmer ...
The invariant theory for conformal hypersurfaces is studied by treating these as the confor...
tions on a Riemannian manifold Mn with scalar curvature s, is a conformally invariant operator. In t...
AbstractContinuing our study of global conformal invariants for Riemannian manifolds, we find new cl...
For a hypersurface in a conformal manifold, by following the idea of Fefferman and Graham's work, we...
AbstractThe purpose of this paper is to study the conformally invariant functionals of hypersurfaces...
International audienceWe provide the full classification, in arbitrary even and odd dimensions, of g...
We consider the integral of (the square of) the length of the normal curvature tensor for immersions...
We show, that higher analogs of the Willmore functional, defined on the space of immersions M"2...
For a surface in 3-sphere, by identifying the conformal round 3-sphere as the projectivized positive...
Conformal geometry has occupied an important position in mathematics and physics since early last ce...