http://imechanica.org/taxonomy/term/2468 Comments for "tetrakaidecahedral foams" en http://imechanica.org/node/3354#comment-7823 <p> Hi Prasanna, </p> <p> I&#39;m afraid that I don&#39;t know enough about Abaqus to say anything useful here.&nbsp; But there are quite a few others on this forum and on the Abaqus Yahoo group who use the software and will be able to help you.&nbsp; My own preference would be to just use Abaqus directly for creating the geometry because the foam geometry is relatively simple. </p> <p> -- Biswajit&nbsp; </p> <br class="clear" /> Wed, 18 Jun 2008 23:07:24 -0400 Biswajit Banerjee comment 7823 at http://imechanica.org http://imechanica.org/node/3354#comment-7814 <p> Thanks a lot biswajit... I indeed found the info in &#39;wikipedia&#39; very informative... </p> <p> Now I have a trivial modelling question...Please dont mind my asking it... </p> <p> &nbsp;I modelled one unit cell&nbsp; from the data I had in Pro-e and I tried to import it into abaqus.. I wanted it to be a wire because I wanted to model every strut as a beam (open-foam)....&nbsp; </p> <p> However abaqus imports it as one single object... That is, all the wireframe edges are imported as one single object. Do you know if there is any way I can import this as a bunch of lines. </p> <p> &nbsp;Thanks a tonne. </p> <p> -Prasanna&nbsp; </p> <br class="clear" /> Tue, 17 Jun 2008 12:35:26 -0400 pthiyaga comment 7814 at http://imechanica.org http://imechanica.org/node/3354#comment-7800 <p> Dear Prasanna, </p> <p> I&#39;m sure you&#39;ve already looked at <a href="http://books.google.co.nz/books?id=IySUr5sn4N8C&amp;printsec=frontcover&amp;dq=gibson+cellular&amp;client=firefox-a&amp;sig=LaL5Y5-uVQkLKCx0_Md3j3hJMIs#PPA31,M1" target="_blank">Gibson and Ashby</a> for some pointers.&nbsp; That&#39;s of course the first place to go to for information on simple foam models. </p> <p> The periodicity of tetrakaidodecahedra (more commonly called <a href="http://en.wikipedia.org/wiki/Tetradecahedron" target="_blank">tetradecahedra</a> - or 14 sided) is a fascinating subject.&nbsp; After seeing you post I looked at Wikipedia and there&#39;s a wealth of information there.&nbsp; I hadn&#39;t realized that there was a complete list of possible forms of 14-faced objects.&nbsp; The most familiar one (to me) is the the Kelvin cell or <a href="http://en.wikipedia.org/wiki/Truncated_octahedron" target="_blank">Truncated octahedron</a>. </p> <p> <img src="http://upload.wikimedia.org/wikipedia/commons/2/20/Truncatedoctahedron.jpg" alt="Truncated octahedron" width="200" height="170" /> </p> <p> &nbsp;<br /> This element can be used to tile space leading to the <a href="http://en.wikipedia.org/wiki/Bitruncated_cubic_honeycomb" target="_blank">bitruncated cubic honeycomb.</a>&nbsp; The unit cell for that tiling is a subset of the image below </p> <p> <img src="http://upload.wikimedia.org/wikipedia/commons/9/93/Truncated_octahedra.jpg" alt="tiling" width="256" height="256" /> </p> <p> This is the repeating pattern that you&#39;re looking for.&nbsp; From this figure you should be able to figure out which faces and corners need to be assigned periodicity.&nbsp; It won&#39;t be as simple as a hex or a cube but it&#39;ll be much more fun.&nbsp; For a start you can just take the first 9 cells (any corner region in the figure) and apply standard periodic boundary conditions to the edges of the cube in which they are contained. </p> <p> -- Biswajit&nbsp; </p> <br class="clear" /> Tue, 17 Jun 2008 00:33:22 -0400 Biswajit Banerjee comment 7800 at http://imechanica.org