Add to ORKGand univalent in the unit disc U. One of the most powerful methods used to study extremal problems in the class S is the variational method. The basic idea is to construct "neighboring functions " fe(z)-- f(z) + eg(z) + o(e) that also belong to S. If f maximizes Re L(f) where L is a linear (or more generally G•teaux differentiable
There is considered the problem of extremum of the mixed type nonlocal functional J(u) = ∫ t1 t0 dt ...
From its origins in the minimization of integral functionals, the notion of 'variations' has evolved...
Variational calculus studied methods for finding maximum and minimum values of functional. It has it...
“Using variational formulae for solving extremal problems in linearly‐invariant classes”Mathematical...
1.1. We let Udenote the unit disc, lzl=1, and gtheusualclass of univalent functions, i.e., those fun...
The basic problem of the Calculus of Variations is that of finding a point in function space at whic...
A new class of optimization problems arising in fluid mechanics can be characterized mathematically ...
Abstract. The paper is devoted to a class of functions analytic and univalent in the unit disk that ...
Derivatives and integrals of fractional order have recently gained more attention due to their succe...
Building on fundamental results in variational analysis, this monograph presents new and recent deve...
The paper concerns new applications of advanced methods of variational analysis and generalized diff...
Using the variational analysis technique, in terms of the epi-coderivative, we provide Lagrange mult...
In variational calculus, the minimality of a given functional under arbitrary deformations with fixe...
Methods to solve variational problems, the tasks for the study for maximum and minimum of functional...
For an elliptic, semilinear differential operator of the form S(u) = A : D2u + b(x, u, Du), consider...
There is considered the problem of extremum of the mixed type nonlocal functional J(u) = ∫ t1 t0 dt ...
From its origins in the minimization of integral functionals, the notion of 'variations' has evolved...
Variational calculus studied methods for finding maximum and minimum values of functional. It has it...
“Using variational formulae for solving extremal problems in linearly‐invariant classes”Mathematical...
1.1. We let Udenote the unit disc, lzl=1, and gtheusualclass of univalent functions, i.e., those fun...
The basic problem of the Calculus of Variations is that of finding a point in function space at whic...
A new class of optimization problems arising in fluid mechanics can be characterized mathematically ...
Abstract. The paper is devoted to a class of functions analytic and univalent in the unit disk that ...
Derivatives and integrals of fractional order have recently gained more attention due to their succe...
Building on fundamental results in variational analysis, this monograph presents new and recent deve...
The paper concerns new applications of advanced methods of variational analysis and generalized diff...
Using the variational analysis technique, in terms of the epi-coderivative, we provide Lagrange mult...
In variational calculus, the minimality of a given functional under arbitrary deformations with fixe...
Methods to solve variational problems, the tasks for the study for maximum and minimum of functional...
For an elliptic, semilinear differential operator of the form S(u) = A : D2u + b(x, u, Du), consider...
There is considered the problem of extremum of the mixed type nonlocal functional J(u) = ∫ t1 t0 dt ...
From its origins in the minimization of integral functionals, the notion of 'variations' has evolved...
Variational calculus studied methods for finding maximum and minimum values of functional. It has it...