We characterize the solution to the Newton minimal resistance problem in a class of radial q-concave profiles. We also give the corresponding result for one-dimensional profiles. Moreover, we provide a numerical optimization algorithm for the general nonradial case
ABSTRACT. – We study the minima of the functional f (∇u). The function f is not convex, the set is...
In this paper we consider Newton’s problem of finding a convex body of least resistance. This proble...
Newton's problem of minimal resistance is one of the first problems of optimal control: it was propo...
We characterize the solution to the Newton minimal resistance problem in a class of radial q-concave...
We characterize the solution to the Newton minimal resistance problem in a class of radial q-concave...
We characterize the solution to the Newton minimal resistance problem in a class of radial q-concave...
We study the minima of the functional $int_Omega f(nabla u)$. The function $f$ is not convex, the s...
We consider the following problem: minimize the functional f (∇u(x)) dx in the class of concave func...
A body moves in a rarefied medium composed of point particles at rest. The particles make elastic r...
International audienceWe characterize the solution to the Newton minimal resistance problem in a spe...
International audienceWe characterize the solution to the Newton minimal resistance problem in a spe...
International audienceWe characterize the solution to the Newton minimal resistance problem in a spe...
Newton's problem of the body of minimal aerodynamic resistance is traditionally stated in the class ...
We study the flat region of stationary points of the functional∫ Ω F (|∇u(x)|)dx under the constrain...
We consider the following problem stated in 1993 by Buttazzo and Kawohl (Math Intell 15:7–12, 1993):...
ABSTRACT. – We study the minima of the functional f (∇u). The function f is not convex, the set is...
In this paper we consider Newton’s problem of finding a convex body of least resistance. This proble...
Newton's problem of minimal resistance is one of the first problems of optimal control: it was propo...
We characterize the solution to the Newton minimal resistance problem in a class of radial q-concave...
We characterize the solution to the Newton minimal resistance problem in a class of radial q-concave...
We characterize the solution to the Newton minimal resistance problem in a class of radial q-concave...
We study the minima of the functional $int_Omega f(nabla u)$. The function $f$ is not convex, the s...
We consider the following problem: minimize the functional f (∇u(x)) dx in the class of concave func...
A body moves in a rarefied medium composed of point particles at rest. The particles make elastic r...
International audienceWe characterize the solution to the Newton minimal resistance problem in a spe...
International audienceWe characterize the solution to the Newton minimal resistance problem in a spe...
International audienceWe characterize the solution to the Newton minimal resistance problem in a spe...
Newton's problem of the body of minimal aerodynamic resistance is traditionally stated in the class ...
We study the flat region of stationary points of the functional∫ Ω F (|∇u(x)|)dx under the constrain...
We consider the following problem stated in 1993 by Buttazzo and Kawohl (Math Intell 15:7–12, 1993):...
ABSTRACT. – We study the minima of the functional f (∇u). The function f is not convex, the set is...
In this paper we consider Newton’s problem of finding a convex body of least resistance. This proble...
Newton's problem of minimal resistance is one of the first problems of optimal control: it was propo...
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