Rodríguez, Ransés AlfonsoBravo Castillero, JuliánBrenner, RenaldGuinovart Sanjuán, DavidGuinovart Díaz, RaúlRodríguez Ramos, Reinaldo2019-09-192019-09-19http://hdl.handle.net/11349/21838Based on the Asymptotic Homogenization Method, the electromechanical global behavior of a two-phase piezoelectric unidirectional periodic fibrous composite is investigated. The composite is made of homogeneous and linear transversely isotropic piezoelectric materials that belong to the symmetry crystal class 622. The cross-sections of the fibers are circular and are centered in a periodic array of rectangular cells. The composite state is anti-plane shear piezoelectric. Local problems that arise from the two-scale analysis using the Asymptotic Homogenization Method are solved by means of a complex variable, leading to an infinite system of algebraic linear equations. This infinite system is solved here using different truncation orders, allowing a numerical study of the effective properties. Some numerical examples are shown.application/pdftext/htmlDerechos de autor 2014 Visión Electrónica: algo más que un estado sólidoPeriodic compositesasymptotic homogenization methodeffective propertiesinfinite systems.info:eu-repo/semantics/article