Results 161 to 170 of about 9,689,661 (201)
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The Well-Posedness for Multiobjective Generalized Games
Journal of Optimization Theory and Applications, 2011zbMATH Open Web Interface contents unavailable due to conflicting licenses.
J. W. Peng, S. Y. Wu
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On well‐posedness and conditioning in optimization
ZAMM - Journal of Applied Mathematics and Mechanics / Zeitschrift für Angewandte Mathematik und Mechanik, 2004AbstractWe survey some results dealing with well‐posedness of scalar optimization problems, with applications to the optimal control of ordinary differential equations under plant perturbations. Then we deal with the definition of a condition number for optimization problems.
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Well-Posedness of Mixed Formulations in Elasticity
ZAMM, 1999The authors use the Hilbert space theory to obtain existence and uniqueness theorems for a mixed boundary value problem of linear elastostatics in which the elastic compliance is singular, and a linear constraint is imposed on the strain fields. The theorems are illustrated by problems on: (i) an elastic plate resting on a finite number of elastic ...
ROMANO G. +2 more
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Well Posedness and Optimization Problems
2007This contribution is in the field of Game Theory and Nash equilibria. The property of Tihkonov well posedness is analyzed in relation to other well posedeness properties which are ordinal, a very important property for games because it emphasizes the fact that players’ decisions are expressed by preferences and not by a special choice of utility ...
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Approximations and Well-Posedness in Multicriteria Games
Annals of Operations Research, 2005zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Well-Posedness and Optimization under Perturbations
Annals of Operations Research, 2001zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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1999
Mathematical modeling of soil venting leads to a system of partial differential equations. Before starting all computations, one must do the qualitative and quantitative analysis of solutions for corresponding problems (at least in simple situations as the study cases).
Horst H. Gerke +4 more
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Mathematical modeling of soil venting leads to a system of partial differential equations. Before starting all computations, one must do the qualitative and quantitative analysis of solutions for corresponding problems (at least in simple situations as the study cases).
Horst H. Gerke +4 more
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Well-posedness of Nonconvex Integral Functionals
Proceedings of the 44th IEEE Conference on Decision and Control, 2004Multiple integrals of the calculus of variations with vector-valued unknown are considered. Strong Tikhonov well-posedness within \(W^{1,1}_0\) of the corresponding minimum problems is proved assuming strict convexity of the integrand at the gradient of the minimizer.
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2010
We recall the concept of porosity [10, 26, 27, 84, 97, 98, 112]. Let (Y, d) be a complete metric space. We denote by Bd(y, r) the closed ball of center \(y\ \in\ Y,\) and radius r > 0. A subset \(E \subset Y\) is called porous with respect to d (or just porous if the metric is understood) if there exist \(\alpha \in\) (0, 1] and r0 > 0 such that for ...
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We recall the concept of porosity [10, 26, 27, 84, 97, 98, 112]. Let (Y, d) be a complete metric space. We denote by Bd(y, r) the closed ball of center \(y\ \in\ Y,\) and radius r > 0. A subset \(E \subset Y\) is called porous with respect to d (or just porous if the metric is understood) if there exist \(\alpha \in\) (0, 1] and r0 > 0 such that for ...
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