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authorJohannes Ranke <jranke@uni-bremen.de>2015-11-13 11:01:49 +0100
committerJohannes Ranke <jranke@uni-bremen.de>2015-11-13 11:20:59 +0100
commit6f596ecec2c54d7d91cf3ca16b8643b64b903e57 (patch)
tree57425adb3cff023b3996602aa4f0a6110e98aa3c /vignettes/compiled_models.html
parentba07744bf3933402d4ef815cf5c2575253b1fd7e (diff)
Add plots to compiled_models vignette, rebuild staticdocs
Diffstat (limited to 'vignettes/compiled_models.html')
-rw-r--r--vignettes/compiled_models.html85
1 files changed, 48 insertions, 37 deletions
diff --git a/vignettes/compiled_models.html b/vignettes/compiled_models.html
index 7722d95a..c7f4fbea 100644
--- a/vignettes/compiled_models.html
+++ b/vignettes/compiled_models.html
@@ -10,7 +10,7 @@
<meta name="author" content="Johannes Ranke" />
-<meta name="date" content="2015-11-09" />
+<meta name="date" content="2015-11-13" />
<title>Performance benefit by using compiled model definitions in mkin</title>
@@ -65,7 +65,7 @@ img {
<div id="header">
<h1 class="title">Performance benefit by using compiled model definitions in mkin</h1>
<h4 class="author"><em>Johannes Ranke</em></h4>
-<h4 class="date"><em>2015-11-09</em></h4>
+<h4 class="date"><em>2015-11-13</em></h4>
</div>
<div id="TOC">
@@ -89,28 +89,36 @@ SFO_SFO &lt;- mkinmod(
<pre><code>## Successfully compiled differential equation model from auto-generated C code.</code></pre>
<p>We can compare the performance of the Eigenvalue based solution against the compiled version and the R implementation of the differential equations using the microbenchmark package.</p>
<pre class="r"><code>library(&quot;microbenchmark&quot;)
+library(&quot;ggplot2&quot;)
mb.1 &lt;- microbenchmark(
- mkinfit(SFO_SFO, FOCUS_2006_D, solution_type = &quot;deSolve&quot;, use_compiled = FALSE,
- quiet = TRUE),
- mkinfit(SFO_SFO, FOCUS_2006_D, solution_type = &quot;eigen&quot;, quiet = TRUE),
- mkinfit(SFO_SFO, FOCUS_2006_D, solution_type = &quot;deSolve&quot;, quiet = TRUE),
+ &quot;deSolve, not compiled&quot; = mkinfit(SFO_SFO, FOCUS_2006_D,
+ solution_type = &quot;deSolve&quot;,
+ use_compiled = FALSE, quiet = TRUE),
+ &quot;Eigenvalue based&quot; = mkinfit(SFO_SFO, FOCUS_2006_D,
+ solution_type = &quot;eigen&quot;, quiet = TRUE),
+ &quot;deSolve, compiled&quot; = mkinfit(SFO_SFO, FOCUS_2006_D,
+ solution_type = &quot;deSolve&quot;, quiet = TRUE),
times = 3, control = list(warmup = 1))
-smb.1 &lt;- summary(mb.1)[-1]
-rownames(smb.1) &lt;- c(&quot;deSolve, not compiled&quot;, &quot;Eigenvalue based&quot;, &quot;deSolve, compiled&quot;)
-print(smb.1)</code></pre>
-<pre><code>## min lq mean median uq
-## deSolve, not compiled 9442.5119 9447.2060 9458.3420 9451.9001 9466.2571
-## Eigenvalue based 868.6312 872.4552 895.3422 876.2792 908.6977
-## deSolve, compiled 691.9663 697.5653 701.1004 703.1643 705.6674
-## max neval cld
-## deSolve, not compiled 9480.6141 3 c
-## Eigenvalue based 941.1163 3 b
-## deSolve, compiled 708.1706 3 a</code></pre>
-<p>We see that using the compiled model is by a factor of 13.4 faster than using the R version with the default ode solver, and it is even faster than the Eigenvalue based solution implemented in R which does not need iterative solution of the ODEs:</p>
-<pre class="r"><code>smb.1[&quot;median&quot;]/smb.1[&quot;deSolve, compiled&quot;, &quot;median&quot;]</code></pre>
+
+smb.1 &lt;- summary(mb.1)
+print(mb.1)</code></pre>
+<pre><code>## Unit: milliseconds
+## expr min lq mean median uq
+## deSolve, not compiled 9538.4007 9570.3211 9605.6503 9602.2416 9639.2752
+## Eigenvalue based 881.9438 885.9337 901.1558 889.9236 910.7618
+## deSolve, compiled 692.0913 695.6109 697.9629 699.1304 700.8987
+## max neval cld
+## 9676.3087 3 c
+## 931.5999 3 b
+## 702.6669 3 a</code></pre>
+<pre class="r"><code>autoplot(mb.1)</code></pre>
+<p><img src="data:image/png;base64,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" title alt width="672" /></p>
+<p>We see that using the compiled model is by a factor of 13.7 faster than using the R version with the default ode solver, and it is even faster than the Eigenvalue based solution implemented in R which does not need iterative solution of the ODEs:</p>
+<pre class="r"><code>rownames(smb.1) &lt;- smb.1$expr
+smb.1[&quot;median&quot;]/smb.1[&quot;deSolve, compiled&quot;, &quot;median&quot;]</code></pre>
<pre><code>## median
-## deSolve, not compiled 13.441951
-## Eigenvalue based 1.246194
+## deSolve, not compiled 13.734549
+## Eigenvalue based 1.272901
## deSolve, compiled 1.000000</code></pre>
</div>
<div id="benchmark-for-a-model-that-can-not-be-solved-with-eigenvalues" class="section level2">
@@ -121,24 +129,27 @@ print(smb.1)</code></pre>
m1 = mkinsub( &quot;SFO&quot;))</code></pre>
<pre><code>## Successfully compiled differential equation model from auto-generated C code.</code></pre>
<pre class="r"><code>mb.2 &lt;- microbenchmark(
- mkinfit(FOMC_SFO, FOCUS_2006_D, use_compiled = FALSE, quiet = TRUE),
- mkinfit(FOMC_SFO, FOCUS_2006_D, quiet = TRUE),
+ &quot;deSolve, not compiled&quot; = mkinfit(FOMC_SFO, FOCUS_2006_D,
+ use_compiled = FALSE, quiet = TRUE),
+ &quot;deSolve, compiled&quot; = mkinfit(FOMC_SFO, FOCUS_2006_D, quiet = TRUE),
times = 3, control = list(warmup = 1))
-smb.2 &lt;- summary(mb.2)[-1]
-rownames(smb.2) &lt;- c(&quot;deSolve, not compiled&quot;, &quot;deSolve, compiled&quot;)
-print(smb.2)</code></pre>
-<pre><code>## min lq mean median uq
-## deSolve, not compiled 20.444632 20.48824 20.557595 20.531857 20.614077
-## deSolve, compiled 1.251733 1.25179 1.275227 1.251846 1.286973
-## max neval cld
-## deSolve, not compiled 20.6963 3 b
-## deSolve, compiled 1.3221 3 a</code></pre>
+smb.2 &lt;- summary(mb.2)
+print(mb.2)</code></pre>
+<pre><code>## Unit: seconds
+## expr min lq mean median uq
+## deSolve, not compiled 20.475764 20.494740 20.507391 20.513716 20.523205
+## deSolve, compiled 1.244022 1.244327 1.261983 1.244631 1.270963
+## max neval cld
+## 20.532695 3 b
+## 1.297295 3 a</code></pre>
<pre class="r"><code>smb.2[&quot;median&quot;]/smb.2[&quot;deSolve, compiled&quot;, &quot;median&quot;]</code></pre>
-<pre><code>## median
-## deSolve, not compiled 16.40126
-## deSolve, compiled 1.00000</code></pre>
-<p>Here we get a performance benefit of a factor of 16.4 using the version of the differential equation model compiled from C code using the inline package!</p>
-<p>This vignette was built with mkin 0.9.41 on</p>
+<pre><code>## median
+## 1 NA
+## 2 NA</code></pre>
+<pre class="r"><code>autoplot(mb.2)</code></pre>
+<p><img 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" title alt width="672" /></p>
+<p>Here we get a performance benefit of a factor of 16.5 using the version of the differential equation model compiled from C code using the inline package!</p>
+<p>This vignette was built with mkin 0.9.41.9000 on</p>
<pre><code>## R version 3.2.2 (2015-08-14)
## Platform: x86_64-pc-linux-gnu (64-bit)
## Running under: Debian GNU/Linux 8 (jessie)</code></pre>

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