We deal with irregular curves contained in smooth, closed, and compact surfaces. For curves with finite total intrinsic curvature, a weak notion of parallel transport of tangent vector fields is well-defined in the Sobolev setting. Also, the angle of the parallel transport is a function with bounded variation, and its total variation is equal to an energy functional that depends on the “tangential” component of the derivative of the tantrix of the curve. We show that the total intrinsic curvature of irregular curves agrees with such an energy functional. By exploiting isometric embeddings, the previous results are then extended to irregular curves contained in Riemannian surfaces. Finally, the relationship with the notion of displacement of...
AbstractIn this paper we derive admissible curvature continuous areas for monotonically increasing c...
In Riemannian (differential) geometry, the differences between Euclidean geometry, elliptic geometry...
This book is a posthumous publication of a classic by Prof. Shoshichi Kobayashi, who taught at U.C. ...
We report our recent results on the total curvature of graphs of curves in high codimension Euclidea...
In this thesis we consider geometric curvature energies, which are energies defined on curves, or mo...
We analyze the lower semicontinuous envelope of the curvature functional of Cartesian surfaces in co...
AbstractA variational problem closely related to the bending energy of curves contained in surfaces ...
Curvature is fundamental to the study of differential geometry. It describes different geometrical a...
There are two sets of contrasting perspectives in di erential geometry: local vs. global and intrins...
We study geodesics on surfaces in the setting of classical differential geometry. We define the curv...
AbstractThe flow of a curve or surface is said to be inextensible if, in the former case, the arclen...
The behavior of an elastic curve bound to a surface will reflect the geometry of its environment. Th...
We prove an equality for the curvature function of a simple and closed curve on the plane. This equa...
In this paper plane elastic curves are revisited from a viewpoint that emphasizes curvature properti...
We use a Riemannnian approximation scheme to define a notion of intrinsic Gaussian curvature for a E...
AbstractIn this paper we derive admissible curvature continuous areas for monotonically increasing c...
In Riemannian (differential) geometry, the differences between Euclidean geometry, elliptic geometry...
This book is a posthumous publication of a classic by Prof. Shoshichi Kobayashi, who taught at U.C. ...
We report our recent results on the total curvature of graphs of curves in high codimension Euclidea...
In this thesis we consider geometric curvature energies, which are energies defined on curves, or mo...
We analyze the lower semicontinuous envelope of the curvature functional of Cartesian surfaces in co...
AbstractA variational problem closely related to the bending energy of curves contained in surfaces ...
Curvature is fundamental to the study of differential geometry. It describes different geometrical a...
There are two sets of contrasting perspectives in di erential geometry: local vs. global and intrins...
We study geodesics on surfaces in the setting of classical differential geometry. We define the curv...
AbstractThe flow of a curve or surface is said to be inextensible if, in the former case, the arclen...
The behavior of an elastic curve bound to a surface will reflect the geometry of its environment. Th...
We prove an equality for the curvature function of a simple and closed curve on the plane. This equa...
In this paper plane elastic curves are revisited from a viewpoint that emphasizes curvature properti...
We use a Riemannnian approximation scheme to define a notion of intrinsic Gaussian curvature for a E...
AbstractIn this paper we derive admissible curvature continuous areas for monotonically increasing c...
In Riemannian (differential) geometry, the differences between Euclidean geometry, elliptic geometry...
This book is a posthumous publication of a classic by Prof. Shoshichi Kobayashi, who taught at U.C. ...