Add to ORKGAbstract. In this paper1 we present a direct application of the theory of infinite-dimensional projected dynamical systems (PDS) related to the well-known obstacle prob-lem, i.e., the problem of determining the shape of an elastic string stretched over a body (obstacle). While the obstacle problem is static in nature and is solved via the variational inequalities theory, we show here that the dynamic problem of describing the vibration movement of the string around the obstacle is solved via the infinite-dimensional theory of projected dynamical systems. KEY WORDS: Infinite-dimensional projected dynamical systems and variational inequalities, Sobolev Hilbert space 1
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Abstract In this paper, we make explicit the connection between projected dynamical systems on Hilbe...
The aim of this work is to highlight the interest of a by now classical methodology, commonly called...
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AbstractThe motion of a vibrating string constrained to remain above a material concave obstacle is ...
In this paper, we consider the absolute value variational inequalities. We propose and analyze the p...
We address three problems arising in the theory of infinite-dimensional dynamical systems. First, w...
AbstractIn this paper, we use the variational inequality theory coupled with finite difference techn...
In this paper, we establish the equivalence between the solutions to an evolutionary variational ine...
International audienceWe give an explicit formula which describes the solution of the problem of the...
In this paper, we establish the equivalence between the solutions to an evolutionary variational ine...
The notion of projected dynamical systems is relatively new, being introduced in the mathematical li...
In this paper we identify a set of two-dimensional variational inequalities that model an obstacle p...
We introduce the notion of mild supersolution for an obstacle problem in an infinite dimensional Hil...
International audienceHere we study the motion of a vibrating string in the presence of an arbitrary...
International audienceThe free vibration response of an ideal string impacting a distributed parabol...
Abstract In this paper, we make explicit the connection between projected dynamical systems on Hilbe...
The aim of this work is to highlight the interest of a by now classical methodology, commonly called...
AbstractWe consider the small transverse vibrations of a string that is constrained to stay on one s...
AbstractThe motion of a vibrating string constrained to remain above a material concave obstacle is ...
In this paper, we consider the absolute value variational inequalities. We propose and analyze the p...
We address three problems arising in the theory of infinite-dimensional dynamical systems. First, w...