Add to ORKGAbstract. Let S be a complete surface of constant curvature K = ±1, i.e. S2 or L2, and Ω ⊂ S a bounded convex subset. If S = S2, assume also diameter(Ω) < pi 2. It is proved that the length of any steepest descent curve of a quasi-convex function in Ω is less than or equal to the perimeter of Ω. This upper bound is actually proved for the class of G-curves, a family of curves that naturally includes all steepest descent curves. In case S = S2, it is also proved the existence of G-curves, whose length is equal to the perimeter of their convex hull, showing that the above estimate is indeed optimal. The results generalize theorems by Manselli and Pucci on steepest descent curves in the Euclidean plane. 1
AbstractThe curvature of the intersection of a minimal surface S with parallel planes {z = t}, betwe...
Abstract. We prove a long standing conjecture concerning the fencing problem in the plane: among pla...
This paper contains four main ideas. First, it shows global existence for the steepest descent in th...
Let S be a complete surface of constant curvature K = +/- 1, i.e. S^2 or H^2, and D \subset S a...
Let S be a complete surface of constant curvature K = +/- 1, i.e. S^2 or H^2, and D \subset S a...
Let S be a complete surface of constant curvature K = +/- 1, i.e. S^2 or H^2, and D \subset S a...
Two-dimensional steepest descent curves (SDC) for a quasiconvex family are considered; the problem o...
We investigate a geometric inequality that states that in R2, the mean curvature of a closed curve γ...
104 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2000.We consider extremal problems...
We show that for every simple closed curve α, the extremal length and the hyperbolic length of α are...
International audienceThe second named author studied in 1988 the possible relations between the len...
International audienceThe second named author studied in 1988 the possible relations between the len...
AbstractWe consider all planar oriented curves that have the following property depending on a fixed...
AbstractIn this paper we derive admissible curvature continuous areas for monotonically increasing c...
International audienceWe show that for every simple closed curve alpha, the extremal length and the ...
AbstractThe curvature of the intersection of a minimal surface S with parallel planes {z = t}, betwe...
Abstract. We prove a long standing conjecture concerning the fencing problem in the plane: among pla...
This paper contains four main ideas. First, it shows global existence for the steepest descent in th...
Let S be a complete surface of constant curvature K = +/- 1, i.e. S^2 or H^2, and D \subset S a...
Let S be a complete surface of constant curvature K = +/- 1, i.e. S^2 or H^2, and D \subset S a...
Let S be a complete surface of constant curvature K = +/- 1, i.e. S^2 or H^2, and D \subset S a...
Two-dimensional steepest descent curves (SDC) for a quasiconvex family are considered; the problem o...
We investigate a geometric inequality that states that in R2, the mean curvature of a closed curve γ...
104 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2000.We consider extremal problems...
We show that for every simple closed curve α, the extremal length and the hyperbolic length of α are...
International audienceThe second named author studied in 1988 the possible relations between the len...
International audienceThe second named author studied in 1988 the possible relations between the len...
AbstractWe consider all planar oriented curves that have the following property depending on a fixed...
AbstractIn this paper we derive admissible curvature continuous areas for monotonically increasing c...
International audienceWe show that for every simple closed curve alpha, the extremal length and the ...
AbstractThe curvature of the intersection of a minimal surface S with parallel planes {z = t}, betwe...
Abstract. We prove a long standing conjecture concerning the fencing problem in the plane: among pla...
This paper contains four main ideas. First, it shows global existence for the steepest descent in th...