000012501 001__ 12501
000012501 005__ 20160816141449.0
000012501 04107 $$aeng
000012501 046__ $$k2016-05-09
000012501 100__ $$aŠulc, S.
000012501 24500 $$aMECHANICAL RESPONSE OF COMPOSITES WITH RESPECT TO INCLUSION INTERACTION

000012501 24630 $$n22.$$pEngineering Mechanics 2016
000012501 260__ $$bInstitute of Thermomechanics AS CR, v.v.i., Praha
000012501 506__ $$arestricted
000012501 520__ $$2eng$$aThis paper presents the major features of the µMECH micromechanical library, which gives the analytical solutions to micromechanical fields within media comprising ellipsoidal inclusions. The solutions are based on Eshelby´s stress-free eigenstrains and the equivalent inclusion method. Unlike the case of a single inclusion in an infinite matrix, for which the analytical solution is known, a fast and yet robust approach to the problem of multiple inclusions and their mutual interactions is still missing.

000012501 540__ $$aText je chráněný podle autorského zákona č. 121/2000 Sb.
000012501 653__ $$aMicromechanics, Eshelby´s solution, Polynomial eigenstrains, Multiple inclusion problem.

000012501 7112_ $$aEngineering Mechanics 2016$$cSvratka, CZ$$d2016-05-09 / 2016-05-12$$gEM2016
000012501 720__ $$aŠulc, S.$$iJanda, T.$$iNovák, J.
000012501 8560_ $$ffischerc@itam.cas.cz
000012501 8564_ $$s739854$$uhttps://invenio.itam.cas.cz/record/12501/files/131bo_o_sol.pdf$$yOriginal version of the author's contribution as presented on CD, id 131, section SOL.
000012501 962__ $$r12369
000012501 980__ $$aPAPER