Add to ORKGThe notions of Legendrian and Gaussian towers are defined and indagated. Then applications in the context of one-dimensional geometric variational problems with the energy involving the curvature and its derivatives are provided. Particular attention is paid to the case when the functional is defined on smooth boundaries of plane sets
We introduce a notion of solution to the 1-harmonic flow –i.e., the formal gradient flow of the tota...
In this thesis, we are interested in two topics of geometric analysis. The first one is concerned wi...
We extend here results for escapes in any given direction of the configuration space of a mechanical...
Let γ : [a, b] → R1+k be Lipschitz and H >= 2 be an integer number. Then a sufficient condition, exp...
The energy and volume of a mapping of Riemannian manifolds are linked by a discrete family of functi...
We study integralgeometric representations of variations of general sets A ⊂ Rn without any regulari...
We analyze the lower semicontinuous envelope of the curvature functional of Cartesian surfaces in co...
We consider the total curvature of graphs of curves in high codimension Euclidean space. We introdu...
Thesis (Ph.D.)--University of Washington, 2021Understanding the geometry of rectifiable sets and mea...
Let phi : R-n --> [0, +infinity] be a given positively one-homogeneous convex function, and let W-ph...
Let p be a given positively one-homogeneous convex function, and let W be the corresponding unit bal...
The theory of curvature-dimension bounds for nonsmooth spaces has several motivations: the study of ...
In this paper we consider variational problems involving 1-dimensional connected sets in the Euclide...
In this PhD thesis, we present some developments in the theory of sets of finite perimeter, weak int...
This thesis contains the author's results on the evolution of convex hypersurfaces by positive power...
We introduce a notion of solution to the 1-harmonic flow –i.e., the formal gradient flow of the tota...
In this thesis, we are interested in two topics of geometric analysis. The first one is concerned wi...
We extend here results for escapes in any given direction of the configuration space of a mechanical...
Let γ : [a, b] → R1+k be Lipschitz and H >= 2 be an integer number. Then a sufficient condition, exp...
The energy and volume of a mapping of Riemannian manifolds are linked by a discrete family of functi...
We study integralgeometric representations of variations of general sets A ⊂ Rn without any regulari...
We analyze the lower semicontinuous envelope of the curvature functional of Cartesian surfaces in co...
We consider the total curvature of graphs of curves in high codimension Euclidean space. We introdu...
Thesis (Ph.D.)--University of Washington, 2021Understanding the geometry of rectifiable sets and mea...
Let phi : R-n --> [0, +infinity] be a given positively one-homogeneous convex function, and let W-ph...
Let p be a given positively one-homogeneous convex function, and let W be the corresponding unit bal...
The theory of curvature-dimension bounds for nonsmooth spaces has several motivations: the study of ...
In this paper we consider variational problems involving 1-dimensional connected sets in the Euclide...
In this PhD thesis, we present some developments in the theory of sets of finite perimeter, weak int...
This thesis contains the author's results on the evolution of convex hypersurfaces by positive power...
We introduce a notion of solution to the 1-harmonic flow –i.e., the formal gradient flow of the tota...
In this thesis, we are interested in two topics of geometric analysis. The first one is concerned wi...
We extend here results for escapes in any given direction of the configuration space of a mechanical...