Add to ORKGIn this paper we consider Newton’s problem of finding a convex body of least resistance. This problem could equivalently be written as a variational problem over concave functions in R2. We propose two different methods for solving it numerically. First, we discretize this problem by writing the concave solution function as a infimum over a finite number of affine functions. The discretized problem could be solved by standard optimization software efficiently. Second, we conjecture that the optimal body has a certain structure. We exploit this structure and obtain a variational problem in R1. Deriving its Euler-Lagrange equation yields a program with two unknowns, which can be solved quickly.
In [L] Legendre discusses the set of admissible functions for Newton's variational problem of minima...
Newton's problem of the body of minimal aerodynamic resistance is traditionally stated in the class ...
In [4] Legendre discusses the set of admissible functions for Newton's variational problem of minim...
We consider the following problem: minimize the functional f (∇u(x)) dx in the class of concave func...
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 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 investigate the minima of functionals of the form ¿gWƒ(u), where O 2 is a bounded domain and ƒ a ...
We investigate the minima of functionals of the form ¿gWƒ(u), where O 2 is a bounded domain and ƒ a ...
We investigate the minima of functionals of the form ¿gWƒ(u), where O 2 is a bounded domain and ƒ a ...
ABSTRACT. – We study the minima of the functional f (∇u). The function f is not convex, the set is...
We investigate the minima of functionals of the form ¿gWƒ(u), where O 2 is a bounded domain and ƒ a ...
We investigate the minima of functionals of the form ¿gWƒ(u), where O 2 is a bounded domain and ƒ a ...
In [L] Legendre discusses the set of admissible functions for Newton's variational problem of minima...
Newton's problem of the body of minimal aerodynamic resistance is traditionally stated in the class ...
In [4] Legendre discusses the set of admissible functions for Newton's variational problem of minim...
We consider the following problem: minimize the functional f (∇u(x)) dx in the class of concave func...
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 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 investigate the minima of functionals of the form ¿gWƒ(u), where O 2 is a bounded domain and ƒ a ...
We investigate the minima of functionals of the form ¿gWƒ(u), where O 2 is a bounded domain and ƒ a ...
We investigate the minima of functionals of the form ¿gWƒ(u), where O 2 is a bounded domain and ƒ a ...
ABSTRACT. – We study the minima of the functional f (∇u). The function f is not convex, the set is...
We investigate the minima of functionals of the form ¿gWƒ(u), where O 2 is a bounded domain and ƒ a ...
We investigate the minima of functionals of the form ¿gWƒ(u), where O 2 is a bounded domain and ƒ a ...
In [L] Legendre discusses the set of admissible functions for Newton's variational problem of minima...
Newton's problem of the body of minimal aerodynamic resistance is traditionally stated in the class ...
In [4] Legendre discusses the set of admissible functions for Newton's variational problem of minim...