000014208 001__ 14208
000014208 005__ 20161115100144.0
000014208 04107 $$aeng
000014208 046__ $$k2016-08-21
000014208 100__ $$aMcArthur, Dan
000014208 24500 $$aA circular inclusion with inhomogeneous imperfect interface in harmonic materials
000014208 24630 $$n24.$$p24th International Congress of Theoretical and Applied Mechanics - Book of Papers
000014208 260__ $$bInternational Union of Theoretical and Applied Mechanics, 2016
000014208 506__ $$arestricted
000014208 520__ $$2eng$$aComplex variable methods have been employed extensively to model inclusions in linear elasticity but have not yet seen a similar degree of success in the finite regime. With the advent of Fritz’s harmonic materials [I] and more recently the work of Ru [2], a concise framework has been established for approaching inclusion problems using complex variable techniques in finite elasticity. From these foundations, a number of inclusion problems in finite elasticity have been studied in recent years including but not exclusive to; elliptical inclusions with uniform stress fields, partially de-bonded circular inclusions, three phase circular inclusions, and a circular inclusion with homogeneously imperfect interface. Of these works, none have incorporated the concept of a circumferentially inhomogeneous imperfect interface. This is an important distinction because in general, interfacial damage does not occur homogeneously and it is thought that this could have a significant impact on the stress fields within the inclusion.
000014208 540__ $$aText je chráněný podle autorského zákona č. 121/2000 Sb.
000014208 653__ $$a
000014208 7112_ $$a24th International Congress of Theoretical and Applied Mechanics$$cMontreal (CA)$$d2016-08-21 / 2016-08-26$$gICTAM2016
000014208 720__ $$aMcArthur, Dan
000014208 8560_ $$ffischerc@itam.cas.cz
000014208 8564_ $$s151848$$uhttps://invenio.itam.cas.cz/record/14208/files/PO.SM04-1.14.228.pdf$$yOriginal version of the author's contribution as presented on CD, page 1970, code PO.SM04-1.14.228
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000014208 962__ $$r13812
000014208 980__ $$aPAPER
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