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Optimization of a functionally graded circular plate with inner rigid thin obstacles. I. Continuous problems
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SYSNO ASEP 0368347 Druh ASEP J - Článek v odborném periodiku Zařazení RIV J - Článek v odborném periodiku Poddruh J Článek ve WOS Název Optimization of a functionally graded circular plate with inner rigid thin obstacles. I. Continuous problems Tvůrce(i) Hlaváček, Ivan (MU-W) RID, SAI
Lovíšek, J. (SK)Zdroj.dok. ZAMM-Zeitschrift fur Angewandte Mathematik und Mechanik. - : Wiley - ISSN 0044-2267
Roč. 91, č. 9 (2011), s. 711-723Poč.str. 13 s. Jazyk dok. eng - angličtina Země vyd. DE - Německo Klíč. slova functionally graded plate ; optimal design Vědní obor RIV BA - Obecná matematika CEP IAA100190803 GA AV ČR - Akademie věd CEZ AV0Z10190503 - MU-W (2005-2011) UT WOS 000295068600003 EID SCOPUS 80051720070 DOI 10.1002/zamm.201000119 Anotace Optimal control problems are considered for a functionally graded circular plate with inner rigid obstacles. Axisymmetric bending and stretching of the plate is studied using the classical Kirchhoff theory. The plate material is assumed to vary according to a power-law distribution in terms of the volume fractions of the constituents. Four optimal design problems are considered for the elastic circular plate. The state problem is represented by a variational inequality with a monotone operator and the design variables (i.e., the thickness and the exponent of the power-law) influence both the coefficients and the set of admissible state functions. We prove the existence of a solution to the above-mentioned optimal design problems. Pracoviště Matematický ústav Kontakt Jarmila Štruncová, struncova@math.cas.cz, library@math.cas.cz, Tel.: 222 090 757 Rok sběru 2012
Počet záznamů: 1