An extremal curve of the simplest variational problem is a continuously differentiable function. Hilbert’s differentiability theorem provides a condition that guarantees the existence of the second derivative of an extremal curve. It is desirable to have a simple example in which the condition of Hilbert’s theorem fails to hold true and an extremal curve is not twice differentiable. In this paper, we analyse a cubic variational problem with the following properties. The functional of the problem is neither bounded from above nor bounded from below. There exists an extremal curve of this problem that is obtained by pasting together two different extremal curves, and that is not twice differentiable at the sewing point. Despite this un...
Abstract. Steepest descent is central in variational mathematics. We present a new transpar-ent exis...
Variational calculus studies methods for finding maximum and minimum values of functional. It has i...
The paper conducts a second-order variational analysis for an important class of nonpolyhedral conic...
In variational calculus, the minimality of a given functional under arbitrary deformations with fixe...
Structure permeates both theory and practice in modern optimization. To make progress, optimizers of...
Let Hd,g denote the Hilbert scheme of locally Cohen–Macaulay curves of degree d and genus g in proj...
Abstract. In this paper we develop new extremal principles in variational analysis that deal with fi...
AbstractThe variational principle states that if a differentiable functional F attains its minimum a...
summary:Given a family of curves constituting the general solution of a system of ordinary different...
F. S. Macaulay gave necessary and sufficient conditions on the growth of a nonnegative integer-value...
summary:The criteria of extremality for classical variational integrals depending on several functio...
AbstractWe discuss the Siciak–Zaharjuta extremal function of a real convex body in Cn, a solution of...
AbstractConsider the minimization of a possibly noncoercive Gâteaux differentiable functional F:X→R....
AbstractA variational principle for a class of Hamiltonian boundary value problems is formulated. Co...
This paper addresses both necessary and relevant sufficient extremum conditions for a variational pr...
Abstract. Steepest descent is central in variational mathematics. We present a new transpar-ent exis...
Variational calculus studies methods for finding maximum and minimum values of functional. It has i...
The paper conducts a second-order variational analysis for an important class of nonpolyhedral conic...
In variational calculus, the minimality of a given functional under arbitrary deformations with fixe...
Structure permeates both theory and practice in modern optimization. To make progress, optimizers of...
Let Hd,g denote the Hilbert scheme of locally Cohen–Macaulay curves of degree d and genus g in proj...
Abstract. In this paper we develop new extremal principles in variational analysis that deal with fi...
AbstractThe variational principle states that if a differentiable functional F attains its minimum a...
summary:Given a family of curves constituting the general solution of a system of ordinary different...
F. S. Macaulay gave necessary and sufficient conditions on the growth of a nonnegative integer-value...
summary:The criteria of extremality for classical variational integrals depending on several functio...
AbstractWe discuss the Siciak–Zaharjuta extremal function of a real convex body in Cn, a solution of...
AbstractConsider the minimization of a possibly noncoercive Gâteaux differentiable functional F:X→R....
AbstractA variational principle for a class of Hamiltonian boundary value problems is formulated. Co...
This paper addresses both necessary and relevant sufficient extremum conditions for a variational pr...
Abstract. Steepest descent is central in variational mathematics. We present a new transpar-ent exis...
Variational calculus studies methods for finding maximum and minimum values of functional. It has i...
The paper conducts a second-order variational analysis for an important class of nonpolyhedral conic...