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1

Global existence and dynamic structure of solutions for damped wave equation involving the fractional Laplacian

Bidi Younes, Beniani Abderrahmane, Zennir Khaled, Himadan Ahmed

Demonstratio Mathematica

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2021

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Vol. 54, nr 1

245--258

EN

We consider strong damped wave equation involving the fractional Laplacian with nonlinear source. The results of global solution under necessary conditions on the critical exponent are established. The existence is proved by using the Galerkin approximations combined with the potential well theory. Moreover, we showed new decay estimates of global solution.

2

Re-derivation of Laplace operator on curvilinear coordinates used for the computation of force acting in solenoid valves

Goraj R.

Journal of Applied Mathematics and Computational Mechanics

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2016

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Vol. 15, nr 1

25--38

EN

This article presents two mathematical methods of derivation of the Laplace operator in a given curvilinear co-ordinate system. This co-ordinate system is defined in the area between the armature and the yoke of a high-speed solenoid valve (HSV). The Laplace operator can further be used for the numerical solving of the Laplace’s equation in order to determine the electromagnetic force acting on the armature of the HSV. In further steps the author derived an expression for the gradient and the vector surface element of the armature side surface in this co-ordinate system. The solution of the derivation was compared with one other solution derived in the past for the computational investigations on HSVs.

3

Lokalizacja uszkodzeń w zadanym obszarze z wykorzystaniem teorii spektralnej

Brzęk M., Mitkowski W.

Pomiary Automatyka Kontrola

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2014

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R. 60, nr 1

53--55

PL

W literaturze naukowej problem lokalizacji uszkodzeń istnieje od dziesiątków lat. Polega on na rozwiązaniu zadania odwrotnego, czyli przybliżonego określenia lokalizacji uszkodzenia na podstawie funkcji i wartości własnych operatora w zadanym obszarze [1]. Algorytmy, przy pomocy których określa się położenie uszkodzenia wymagają skomplikowanych obliczeń [2]. Autorzy niniejszego artykułu chcieli w bezpośredni sposób, przy użyciu wartości własnych operatora Laplace’a dla kwadratu [0,1]×[0,1] znaleźć przybliżone miejsce w którym jest uszkodzenie.

EN

In the following article we will try to find the dependence between the location of imperfections in a square measured [0,1]×[0,1] and the spectrum of the Laplace operator for this square. In theoretical considerations concerning the problem of the location of the imperfection for the fixe bounded domain we will take advantage of spectra theory results and, more precisely, the conclusion of the spectra thorem for compact and self-adjoint operators, which says that all eigenvalues of the Laplace operator on the bounded Ω⊆R^2 domain are positive have finite multiplicities and +∞ is the limit point of eigenvalues. These eigenvalues are dependent on location and size of the imperfection. However, we are interested in the inverse task which consists in localizing the imperfection of the domain on a basis of the spectrum of the operator. In the practical part we will determine the spectrum of 81 samples whose imperfection is placed in different points of domain. On a basis of numerical studies we will hypothesize about the dependence between the spectrum of the Laplace operator of the [0,1]×[0,1] square and the location of the imperfection.