<div dir="ltr">Hi Frank,<div><br></div><div>While I could use sor, it seems quite a dip into the past as it was used in the really old days of NR. Now one would hope that more modern and efficient and faster tools are available.</div><div><br></div><div>Which brings me to ask: what elliptic solvers are part and parcel of ET nowadays? I seem to remember but can not confirm that Erik had created some meta thing for solving elliptics of the for m delsqr(phi) + M*phi + N = 0. What can you tell me about this topic?</div><div><br>Thanks for your help.</div><div><br></div><div>Comer</div></div><div class="gmail_extra"><br><div class="gmail_quote">On Wed, May 27, 2015 at 12:10 PM, Frank Loeffler <span dir="ltr"><<a href="mailto:knarf@cct.lsu.edu" target="_blank">knarf@cct.lsu.edu</a>></span> wrote:<br><blockquote class="gmail_quote" style="margin:0 0 0 .8ex;border-left:1px #ccc solid;padding-left:1ex"><span class="">On Wed, May 27, 2015 at 11:30:46AM -0400, Comer Duncan wrote:<br>
> Error: Thorn bam_elliptic not found<br>
><br>
> Is bam_elliptic existent and if so does it work with the current flavors of<br>
> ET?<br>
<br>
</span>BAM_Elliptic probably still exists somewhere, but I have not heard of<br>
someone using it in quite a while and would not count on it still<br>
working. BAM is used as an elliptic solver here, but there are<br>
alternatives (sor or petsc). There doesn't seem to be a test case for<br>
either (there should at least be one for sor), but there is a par file<br>
in the par/ directory of IDBrillData. If what you are interested in is a<br>
test, and you prepare one using sor (it might not take a lot given how<br>
fast that one runs), we would be interested in it to add to the toolkit.<br>
<span class="HOEnZb"><font color="#888888"><br>
Frank<br>
<br>
</font></span></blockquote></div><br></div>