- Weak solvability of a fractional viscoelastic frictionless contact problem
- Siegfried Carl - Google Scholar Citations
Subjects Primary: 49J Variational methods including variational inequalities [See also 47J20] 49K Sensitivity, stability, well-posedness [See also 90C31] 90C Sensitivity, stability, parametric optimization. Keywords hemivariational inequality well-posedness approximating sequence inclusion problem. Well-posedness of Hemivariational Inequalities and Inclusion Problems.
Weak solvability of a fractional viscoelastic frictionless contact problem
Taiwanese J. Abstract Article info and citation First page References Abstract In the present paper, we generalize the concept of well-posedness to a hemivariational inequality, give some metric characterizations of the wellposed hemivariational inequality, and derive some conditions under which the hemivariational inequality is strongly well-posed in the generalized sense. Article information Source Taiwanese J. Export citation.
Export Cancel. References L. Anh, P. Khanh, D.
All these results fit in a unitary scheme giving the structure of this work. The book is mainly addressed to researchers and scholars in Pure and Applied Mathematics, Mechanics, Physics and Engineering. We are greatly indebted to Viorica Venera Motreanu for the careful reading of the manuscript and helpful The present monograph is constructed on the results o This book focuses on nonlinear boundary value problems and the aspects of nonlinear analysis which are necessary to their study.
The authors first give a comprehensive introduction to the many different classical methods from nonlinear analysis, variational principles, and Morse theory.
They then provide a rigorous and detailed treatment of the relevant areas of nonlinear analysis with new applications to nonlinear boundary value problems for both ordinary and partial differential equations. Recent results on the existence and multiplicity of critical points for both smooth and nonsmooth The authors first giv Fundamental theoretical results and Boundary value problems which have variational expressions in form of inequal- ities can be divided into two main classes.
Siegfried Carl - Google Scholar Citations
The class of boundary value prob- lems BVPs leading to variational inequalities and the class of BVPs leading to hemivariational inequalities. The first class is related to convex energy functions and has being studied over the last forty years and the second class is related to nonconvex energy functions and has a shorter research "life" beginning with the works of the second author of the present book in the year Nevertheless a variety of important results have The class of boundary value With parallel treatment of smooth and non-smooth problems, this text on non-linear boundary value problems and related analysis has new material on Neumann problems involving non-homogeneous differential operators, seen here for the first time in book form.
With parallel treatment of smooth and non-smooth problems, this text on non-linear boundary value problems and related analysis has new material on Ne
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