<?xml version="1.0" encoding="UTF-8"?><xml><records><record><source-app name="Biblio" version="7.x">Drupal-Biblio</source-app><ref-type>17</ref-type><contributors><authors><author><style face="normal" font="default" size="100%">M MASMOUDI</style></author><author><style face="normal" font="default" size="100%">W KADDOURI</style></author><author><style face="normal" font="default" size="100%">Kanit, Toufik</style></author><author><style face="normal" font="default" size="100%">S MADANI</style></author><author><style face="normal" font="default" size="100%">S RAMTANI</style></author><author><style face="normal" font="default" size="100%">Imad, Abdellatif</style></author></authors></contributors><titles><title><style face="normal" font="default" size="100%">Modeling of the effect of the void shape on effective ultimate tensile strength of porous materials: Numerical homogenization versus experimental results</style></title><secondary-title><style face="normal" font="default" size="100%">International Journal of Mechanical Sciences</style></secondary-title></titles><dates><year><style  face="normal" font="default" size="100%">2017</style></year></dates><urls><web-urls><url><style face="normal" font="default" size="100%">https://www.sciencedirect.com/science/article/abs/pii/S002074031630710X</style></url></web-urls></urls><publisher><style face="normal" font="default" size="100%">Elsevier</style></publisher><volume><style face="normal" font="default" size="100%">130</style></volume><pages><style face="normal" font="default" size="100%">497-507</style></pages><isbn><style face="normal" font="default" size="100%">0020-7403</style></isbn><language><style face="normal" font="default" size="100%">eng</style></language><abstract><style face="normal" font="default" size="100%">&lt;p style=&quot;text-align: justify;&quot;&gt;
	A numerical&amp;nbsp;&lt;a href=&quot;https://www.sciencedirect.com/topics/engineering/homogenisation&quot; title=&quot;Learn more about homogenization from ScienceDirect's AI-generated Topic Pages&quot;&gt;homogenization&lt;/a&gt;&amp;nbsp;technique and morphological analysis based on the finite element method are used to compute mechanical properties of porous materials. This is achieved by considering two–dimensional matrix containing random distribution of identical non–overlapping circular or elliptical voids. Several microstructure configurations are obtained by varying the voids morphology and the porosity of the matrix. The notion of the&amp;nbsp;&lt;a href=&quot;https://www.sciencedirect.com/topics/engineering/representative-volume-element&quot; title=&quot;Learn more about representative volume element from ScienceDirect's AI-generated Topic Pages&quot;&gt;representative volume element&lt;/a&gt;&amp;nbsp;is used for numerical simulations in order to estimate the morphology effects of the voids on the effective ultimate tensile strength of the called&amp;nbsp;&lt;em&gt;Lotus&lt;/em&gt;–&lt;em&gt;Type Porous Metals&lt;/em&gt;. A confrontation of the obtained numerical results of the representative microstructures for different morphologies of voids and different porosities to an analytical model and experimental data is performed. Finally, a formula improving the Boccaccini model is proposed to estimate effective tensile strength of porous metals taking into account the voids morphology.
&lt;/p&gt;
</style></abstract></record></records></xml>