ANGSD: Analysis of next generation Sequencing Data

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Thetas,Tajima,Neutrality tests: Difference between revisions

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This method will estimate different thetas (population scaled mutation rate) and can based on these thetas calculate Tajima's D and various other neutrality test statistics. Method is described in [[Korneliussen2013]].
This method will estimate different thetas (population scaled mutation rate) and can based on these thetas calculate Tajima's D and various other neutrality test statistics. Method is described in [[Korneliussen2013]].


* NB Information on this website is for version 0.551 or higher.
* NB Information on this website is for version 0.917-33-g6d2aec8 or higher.
* NB The [[Korneliussen2013]] covers two methods,  
* NB The [[Korneliussen2013]] covers two methods,  
#  using an ML method  
#  using an ML method  
#  using the emperical Bayes (EB) method. The information on this page relates to the EB method.
#  using the emperical Bayes (EB) method. The information on this page relates to the EB method.
For performing the ML method, you should the use the [[SFS estimation]] method and define the region af interest.
For performing the ML method, you should the use the [[SFS Estimation]] method and define the region af interest.
 
=Quick Example=
Below is a chain of commands used for caculating statistics. These are based on the test files that can be dowloaded on the [[Quick Start ]] page.


=Example=
Below is a chain of commands used for caculating statistics.
Its a 3 step procedure
Its a 3 step procedure
# Estimate an site frequency spectrum. Output is '''out.sfs''' file. This is what is being used as the '''-pest ''' argument in step2.
# Estimate an site frequency spectrum. Output is '''out.sfs''' file. This is what is being used as the '''-pest ''' argument in step2.
# Calculate per-site thetas. Output is a '''.thetas.gz''' file.
# Calculate per-site thetas. Output is a '''.thetas.idx/.thetas.gz''' files. This contains the binary persite estimates of the thetas.
# Calculate neutrality tests statistics. Output is a '''.thetas.gz.pestPG file.
# Calculate neutrality tests statistics. Output is a '''.thetas.idx.pestPG file.
==Full command list for below examples==
Here is the chain of commands required to do estimate the thetas, and perform neutrality test statistics. These different commands are described in great detail in the following '''step 1,... step 3b''' sub sections. If you do not have the ancestral state you can simply use the assembly you have mapped agains, but remember to add -fold 1 in the 'realSFS' and 'realSFS sf2theta' step.
<pre>
./angsd -bam bam.filelist -doSaf 1 -anc chimpHg19.fa -GL 1 -P 24 -out out
#for unfolded
./misc/realSFS out.saf.idx -P 24 > out.sfs
./misc/realSFS saf2theta out.saf.idx -outname out -sfs out.sfs
#for folded
./misc/realSFS out.saf.idx -P 24 -fold 1 > out.sfs
./misc/realSFS saf2theta out.saf.idx -outname out -sfs out.sfs -fold 1
#Estimate for every Chromosome/scaffold
./misc/thetaStat do_stat out.thetas.idx
#Do a sliding window analysis based on the output from the make_bed command.
./misc/thetaStat do_stat out.thetas.idx -win 50000 -step 10000  -outnames theta.thetasWindow.gz
</pre>


==Step 1: Finding a 'global estimate' of the SFS==


First estimate the site allele frequency likelihood
First estimate the site allele frequency likelihood
<div class="toccolours mw-collapsible mw-collapsed">
./angsd -bam bam.filelist -doSaf 1 -anc chimpHg19.fa -GL 1 -P 24 -out out
<pre class="mw-collapsible-content">
        -> Reading fasta: chimpHg19.fa
        -> Parsing 10 number of samples
        -> Printing at chr: 20 pos:14095817 chunknumber 3500
        -> Done reading data waiting for calculations to finish
        -> Calling destroy
        -> Done waiting for threads
        -> Output filenames:
                ->"out.arg"
                ->"out.saf"
                ->"out.saf.pos.gz"
        -> Mon Jun 30 12:02:58 2014
        -> Arguments and parameters for all analysis are located in .arg file
        [ALL done] cpu-time used =  47.19 sec
        [ALL done] walltime used =  43.00 sec
</pre>
</div>
Obtain the maximum likelihood estimate of the SFS using the '''realSFS''' program found in the misc subfolder. (See more here [[realSFS]])
<pre>
<pre>
./angsd -bam bam.filelist -doSaf 1 -anc chimpHg19.fa -GL 2 -P 24 -out out
./misc/realSFS out.saf.idx -P 24 > out.sfs
</pre>
</pre>
Or if want to calculate the folded spectrum.
<pre>
./misc/realSFS out.saf.idx -P 24 -fold 1 > out.sfs
</pre>
To plot the SFS in R :
<pre>
s<-scan('out.sfs')
s<-s[-c(1,length(s))]
s<-s/sum(s)
barplot(s,names=1:length(s),main='SFS')
</pre>


Obtain the maximum likelihood estimate of the SFS
==Step 2: Calculate the thetas for each site==
<pre>
<pre>
misc/emOptim2 out.saf 20 -P 24 > out.sfs
realSFS saf2theta out.saf.idx -sfs out.sfs -outname out
</pre>
</pre>
The output from the above command are two files out.thetas.gz and out.thetas.idx. A formal description of these files can be found in the doc/formats.pdf in the angsd package. It is possible to extract the logscale persite thetas using the ./thetaStat print program.


Calculate the thetas
<div class="toccolours mw-collapsible mw-collapsed">
<pre>
thetaStat print out.thetas.idx 2>/dev/null |head
./angsd -bam bam.filelist -out out -doThetas 1 -doSaf 1 -pest out.sfs -anc chimpHg19.fa -doSaf 1 -GL 2
<pre class="mw-collapsible-content">
#Chromo Pos Watterson Pairwise thetaSingleton thetaH thetaL
1 14000032 -10.339284 -12.069325 -9.000927 -15.852173 -12.739969
1 14000033 -10.437878 -12.185619 -9.080596 -16.001343 -12.856984
1 14000034 -10.373872 -12.110464 -9.028572 -15.905591 -12.781380
1 14000035 -10.528192 -12.290763 -9.154920 -16.133823 -12.962708
1 14000036 -10.322074 -12.051400 -8.985016 -15.834049 -12.722040
1 14000037 -10.304955 -12.028814 -8.973260 -15.800330 -12.699204
1 14000038 -10.108563 -11.791546 -8.819884 -15.486384 -12.460146
1 14000039 -10.542117 -12.306631 -9.166698 -16.153168 -12.978650
1 14000040 -10.688401 -12.473763 -9.290272 -16.358398 -13.146564
</pre>
</pre>
</div>
Per default the print command will also output the contents of the index file to the stderr.


Estimate Tajimas D
==Step 3a: Estimate Tajimas D and other statistics==
<pre>
<pre>
#create a binary version of thete.thetas.gz
misc/thetaStat make_bed theta.thetas.gz
#calculate Tajimas D
#calculate Tajimas D
misc/thetaStat do_stat theta.thetas.gz -nChr 20
./misc/thetaStat do_stat out.thetas.idx
</pre>
</pre>


Remember that you will need to supply the ancestral state for the [[SFS Estimation]], and you should try to remove the worst data by -minMapQ and -minQ.
<div class="toccolours mw-collapsible mw-collapsed">
cat out.thetas.idx.pestPG
<pre class="mw-collapsible-content">
## thetaStat VERSION: 0.01 build:(Jun 30 2014,12:06:12)
#(indexStart,indexStop)(firstPos_withData,lastPos_withData)(WinStart,WinStop)  Chr    WinCenter      tW      tP      tF      tH      tL      Tajima  fuf    fud    fayh    zeng    nSites
(0,98316)(14000032,14100082)(0,14100082)        1      7050041 51.002623      46.171402      64.683834      51.290955      48.731178      -0.392892      -0.647071      -0.595302      -0.099654      -0.048444      98316
(0,98474)(13999910,14100060)(0,14100060)        2      7050030 92.689100      88.806005      101.768262      122.422498      105.614255      -0.174701      -0.252477      -0.220588      -0.360944      0.152373        98474
(0,93269)(14000529,14100095)(0,14100095)        3      7050047 70.757874      76.248087      75.447438      68.354514      72.301301      0.322902        0.020330        -0.148419      0.110921        0.023794        93269
(0,96339)(13999912,14100064)(0,14100064)        4      7050032 99.748624      107.898618      94.265208      130.283528      119.091076      0.340878        0.247030        0.123956        -0.223386      0.211971        96339
(0,99659)(13999926,14100063)(0,14100063)        5      7050031 120.941697      132.667821      86.726667      163.908351      148.288088      0.404945        0.688320        0.639821        -0.257254      0.247395        99659
(0,99541)(13999918,14100103)(0,14100103)        6      7050051 96.666344      112.146685      69.740992      143.403712      127.775201      0.667988        0.792499        0.627735        -0.321842      0.351730        99541
(0,99786)(13999926,14100047)(0,14100047)        7      7050023 93.164548      92.023886      92.742574      142.413716      117.218807      -0.051058      -0.013928      0.010201        -0.538288      0.282133        99786
(0,98759)(13999923,14100082)(0,14100082)        8      7050041 133.567125      177.157879      72.197498      204.069028      190.613463      1.363708        1.425567        1.040517        -0.200700      0.467490        98759
(0,97855)(14001686,14100094)(0,14100094)        9      7050047 88.777475      102.853333      64.660948      104.749694      103.801516      0.660983        0.776148        0.611265        -0.021256      0.184875        97855
(0,98031)(13999906,14100096)(0,14100096)        10      7050048 129.583334      134.877160      88.135115      213.231615      174.054390      0.170681        0.654145        0.724072        -0.602284      0.375595        98031
(0,99220)(13999900,14100060)(0,14100060)        11      7050030 66.349155      79.423643      60.194045      68.903312      74.163477      0.819589        0.520022        0.207421        0.157614        0.128409        99220
(0,99861)(13999913,14100078)(0,14100078)        12      7050039 86.461303      81.630083      96.156392      110.974922      96.302507      -0.232902      -0.302980      -0.252190      -0.337701      0.124323        99861
(0,98258)(13999943,14100097)(0,14100097)        16      7050048 83.191170      99.392421      77.561510      106.148748      102.770584      0.811500        0.472922        0.152079        -0.080798      0.257008        98258
(0,99428)(13999902,14100095)(0,14100095)        17      7050047 90.254620      99.816352      65.610351      113.328929      106.572638      0.441707        0.683942        0.614609        -0.148988      0.197530        99428
(0,97118)(13999898,14100071)(0,14100071)        18      7050035 79.843256      75.282296      86.844252      67.720321      71.501308      -0.237958      -0.260778      -0.196888      0.094212        -0.114062      97118
(0,93783)(13999895,14100089)(0,14100089)        19      7050044 54.311523      49.839190      64.913940      72.868913      61.354048      -0.341795      -0.495649      -0.434079      -0.421111      0.141133        93783
(0,98938)(13999916,14100091)(0,14100091)        20      7050045 68.148147      63.323800      78.463736      56.040370      59.682084      -0.294508      -0.398845      -0.338673      0.106250        -0.135474      98938
</pre>
</div>


=Sliding Window example=
==Step 3b: Sliding Window example==
We can easily do a sliding window analysis by adding -win/-step arguments to the last command
We can easily do a sliding window analysis by adding -win/-step arguments to the last command. [[ thetaStat ]]
<pre>
<pre>
misc/thetaStat do_stat theta.thetas.gz -nChr 20 -win 50000 -step 10000  -outnames theta.thetasWindow.gz
thetaStat do_stat out.thetas.idx -win 50000 -step 10000  -outnames theta.thetasWindow.gz
</pre>
</pre>
This will calculate the test statistic using a window size of 50kb and a step size of 10kb.
This will calculate the test statistic using a window size of 50kb and a step size of 10kb.


=Example Output=
=Example Output=
==.thetas.gz is==
<pre>
- Output in the ./thetaStat print thetas.idx are the log scaled per site estimates of the thetas
- Output in the pestPG file are the sum of the per site estimates for a region
</pre>
==./thetaStat print angsdput.thetas.idx==
<pre>
<pre>
#Chromo Pos    Watterson      Pairwise        thetaSingleton  thetaH  thetaL
#Chromo Pos    Watterson      Pairwise        thetaSingleton  thetaH  thetaL
Line 77: Line 171:
;7. ThetaL
;7. ThetaL


==.thetas.gz.pestPG==
==.thetas.idx.pestPG==
The .pestPG file is a 14 column file (tab seperated). The first column contains information about the region. The second and third column is the reference name and the center of the window.
The .pestPG file is a 14 column file (tab seperated). The first column contains information about the region. The second and third column is the reference name and the center of the window.


Line 85: Line 179:


<pre>
<pre>
(59999,69999)(60000,70000)(60000,70000) chr1 65000  2349.039592    2008.865974    2791.401569    3817.828656    2913.347320    -0.545594       -0.626967       -0.486984       -0.617873       0.195337        10000
## thetaStat VERSION: 0.01 build:(Jun 30 2014,12:06:12)
(69999,79999)(70000,80000)(70000,80000) chr1  75000  2349.113388    1993.792014    2764.051812    3979.987797    2986.889940    -0.569871       -0.617112       -0.456779       -0.678388       0.220762       10000
#(indexStart,indexStop)(firstPos_withData,lastPos_withData)(WinStart,WinStop)  Chr    WinCenter      tW      tP      tF      tH      tL      Tajima fuf    fud    fayh    zeng    nSites
(79999,89999)(80000,90000)(80000,90000) chr1  85000  2349.154140    2035.577279    2649.132059    3902.254435    2968.915852    -0.502912      -0.491556      -0.330221       -0.637555      0.214522       10000
(0,98316)(14000032,14100082)(0,14100082)        1      7050041 51.002623      46.171402      64.683834      51.290955      48.731178      -0.392892       -0.647071       -0.595302       -0.099654       -0.048444      98316
(89999,99999)(90000,100000)(90000,100000)      chr1  95000  2349.462773    2048.143641    2533.193917    3881.554872    2964.849262    -0.483190      -0.388552      -0.202228      -0.626111       0.212980       10000
(0,98474)(13999910,14100060)(0,14100060)       2      7050030 92.689100      88.806005      101.768262      122.422498      105.614255      -0.174701       -0.252477       -0.220588       -0.360944       0.152373       98474
(99999,109999)(100000,110000)(100000,110000)   chr1  105000  2349.306947    2103.402129    2608.611593    3738.658529    2921.030347    -0.394355      -0.404727      -0.285429      -0.558478       0.197881       10000
(0,93269)(14000529,14100095)(0,14100095)       3      7050047 70.757874      76.248087      75.447438      68.354514      72.301301      0.322902        0.020330        -0.148419       0.110921        0.023794       93269
(109999,119999)(110000,120000)(110000,120000)   chr1  115000  2348.965451    1867.325681    2725.815492    4491.310734    3179.318214    -0.772512      -0.687843      -0.414876      -0.896283       0.287438       10000
(0,96339)(13999912,14100064)(0,14100064)       4       7050032 99.748624      107.898618      94.265208      130.283528      119.091076      0.340878        0.247030        0.123956        -0.223386       0.211971       96339
(119999,129999)(120000,130000)(120000,130000)   chr1  125000  2349.437816    2077.636124    2623.517860    3755.631838    2916.633993    -0.435861       -0.437286       -0.301676       -0.573043       0.196304       10000
(0,99659)(13999926,14100063)(0,14100063)       5      7050031 120.941697      132.667821      86.726667      163.908351      148.288088      0.404945        0.688320        0.639821        -0.257254       0.247395       99659
(0,99541)(13999918,14100103)(0,14100103)       6      7050051 96.666344      112.146685      69.740992      143.403712      127.775201      0.667988        0.792499        0.627735        -0.321842       0.351730       99541
(0,99786)(13999926,14100047)(0,14100047)       7      7050023 93.164548      92.023886      92.742574      142.413716      117.218807      -0.051058       -0.013928       0.010201        -0.538288      0.282133        99786
(0,98759)(13999923,14100082)(0,14100082)        8      7050041 133.567125      177.157879      72.197498       204.069028      190.613463      1.363708        1.425567        1.040517        -0.200700       0.467490       98759
 
</pre>
</pre>
Format is:
Format is:
Line 110: Line 208:


=Unknown ancestral state (folded sfs)=
=Unknown ancestral state (folded sfs)=
* Below is for version 0.556 and above


If you don't have the ancestral states, you can still calculate the Watterson and Tajima theta, which means you can perform the Tajima's D neutrality test statistic. But this requires you to use the folded sfs. The output files will have the same format, but only the thetaW and thetaD, and tajimas D is meaningful.
If you don't have the ancestral states, you can still calculate the Watterson and Tajima theta, which means you can perform the Tajima's D neutrality test statistic. But this requires you to use the folded sfs. The output files will have the same format, but only the thetaW and thetaD, and tajimas D is meaningful.


Below is an example based on the earlier example where we now base our analysis on the folded spectrum. Notice the -fold 1 and that the second parameter to the emOptim2 is now 20 instead for 40.
There was previously an example below that showed how to perform this analysis. This information has now been added to the examples above (notice the -fold 1) step in realSFS.
 
<pre>
#(estimate an SFS)
../angsd0.557/angsd -bam pop1.list -out bingo -doSaf 1 -fold 1
../angsd0.557/misc/emOptim2 bingo.saf 20 -P 24 >bingo.em.ml
#(calculate thetas)
../angsd0.557/angsd -bam pop1.list -out bongo -doThetas 1 -doSaf 1 -pest bingo.em.ml  -fold 1
#(calculate Tajimas.)
../angsd0.557/misc/thetaStat make_bed bongo.thetas.gz
../angsd0.557/misc/thetaStat do_stat bongo.thetas.gz -nChr 40
</pre>


=Citation=
=Citation=
[[Korneliussen2013]]
[[Korneliussen2013]]

Latest revision as of 13:40, 27 August 2020

This method will estimate different thetas (population scaled mutation rate) and can based on these thetas calculate Tajima's D and various other neutrality test statistics. Method is described in Korneliussen2013.

  • NB Information on this website is for version 0.917-33-g6d2aec8 or higher.
  • NB The Korneliussen2013 covers two methods,
  1. using an ML method
  2. using the emperical Bayes (EB) method. The information on this page relates to the EB method.

For performing the ML method, you should the use the SFS Estimation method and define the region af interest.

Quick Example

Below is a chain of commands used for caculating statistics. These are based on the test files that can be dowloaded on the Quick Start page.

Its a 3 step procedure

  1. Estimate an site frequency spectrum. Output is out.sfs file. This is what is being used as the -pest argument in step2.
  2. Calculate per-site thetas. Output is a .thetas.idx/.thetas.gz files. This contains the binary persite estimates of the thetas.
  3. Calculate neutrality tests statistics. Output is a .thetas.idx.pestPG file.

Full command list for below examples

Here is the chain of commands required to do estimate the thetas, and perform neutrality test statistics. These different commands are described in great detail in the following step 1,... step 3b sub sections. If you do not have the ancestral state you can simply use the assembly you have mapped agains, but remember to add -fold 1 in the 'realSFS' and 'realSFS sf2theta' step.

./angsd -bam bam.filelist -doSaf 1 -anc chimpHg19.fa -GL 1 -P 24 -out out 
#for unfolded
./misc/realSFS out.saf.idx -P 24 > out.sfs
./misc/realSFS saf2theta out.saf.idx -outname out -sfs out.sfs
#for folded
./misc/realSFS out.saf.idx -P 24 -fold 1 > out.sfs
./misc/realSFS saf2theta out.saf.idx -outname out -sfs out.sfs -fold 1
#Estimate for every Chromosome/scaffold
./misc/thetaStat do_stat out.thetas.idx
#Do a sliding window analysis based on the output from the make_bed command.
./misc/thetaStat do_stat out.thetas.idx -win 50000 -step 10000  -outnames theta.thetasWindow.gz

Step 1: Finding a 'global estimate' of the SFS

First estimate the site allele frequency likelihood

./angsd -bam bam.filelist -doSaf 1 -anc chimpHg19.fa -GL 1 -P 24 -out out


        -> Reading fasta: chimpHg19.fa
        -> Parsing 10 number of samples 
        -> Printing at chr: 20 pos:14095817 chunknumber 3500
        -> Done reading data waiting for calculations to finish
        -> Calling destroy
        -> Done waiting for threads
        -> Output filenames:
                ->"out.arg"
                ->"out.saf"
                ->"out.saf.pos.gz"
        -> Mon Jun 30 12:02:58 2014
        -> Arguments and parameters for all analysis are located in .arg file
        [ALL done] cpu-time used =  47.19 sec
        [ALL done] walltime used =  43.00 sec




Obtain the maximum likelihood estimate of the SFS using the realSFS program found in the misc subfolder. (See more here realSFS)

./misc/realSFS out.saf.idx -P 24 > out.sfs

Or if want to calculate the folded spectrum.

./misc/realSFS out.saf.idx -P 24 -fold 1 > out.sfs

To plot the SFS in R :

s<-scan('out.sfs')
s<-s[-c(1,length(s))]
s<-s/sum(s)
barplot(s,names=1:length(s),main='SFS')
 

Step 2: Calculate the thetas for each site

realSFS saf2theta out.saf.idx -sfs out.sfs -outname out

The output from the above command are two files out.thetas.gz and out.thetas.idx. A formal description of these files can be found in the doc/formats.pdf in the angsd package. It is possible to extract the logscale persite thetas using the ./thetaStat print program.

thetaStat print out.thetas.idx 2>/dev/null |head

#Chromo	Pos	Watterson	Pairwise	thetaSingleton	thetaH	thetaL
1	14000032	-10.339284	-12.069325	-9.000927	-15.852173	-12.739969
1	14000033	-10.437878	-12.185619	-9.080596	-16.001343	-12.856984
1	14000034	-10.373872	-12.110464	-9.028572	-15.905591	-12.781380
1	14000035	-10.528192	-12.290763	-9.154920	-16.133823	-12.962708
1	14000036	-10.322074	-12.051400	-8.985016	-15.834049	-12.722040
1	14000037	-10.304955	-12.028814	-8.973260	-15.800330	-12.699204
1	14000038	-10.108563	-11.791546	-8.819884	-15.486384	-12.460146
1	14000039	-10.542117	-12.306631	-9.166698	-16.153168	-12.978650
1	14000040	-10.688401	-12.473763	-9.290272	-16.358398	-13.146564

Per default the print command will also output the contents of the index file to the stderr.

Step 3a: Estimate Tajimas D and other statistics

#calculate Tajimas D
./misc/thetaStat do_stat out.thetas.idx

cat out.thetas.idx.pestPG

## thetaStat VERSION: 0.01 build:(Jun 30 2014,12:06:12)
#(indexStart,indexStop)(firstPos_withData,lastPos_withData)(WinStart,WinStop)   Chr     WinCenter       tW      tP      tF      tH      tL      Tajima  fuf     fud     fayh    zeng    nSites
(0,98316)(14000032,14100082)(0,14100082)        1       7050041 51.002623       46.171402       64.683834       51.290955       48.731178       -0.392892       -0.647071       -0.595302       -0.099654       -0.048444       98316
(0,98474)(13999910,14100060)(0,14100060)        2       7050030 92.689100       88.806005       101.768262      122.422498      105.614255      -0.174701       -0.252477       -0.220588       -0.360944       0.152373        98474
(0,93269)(14000529,14100095)(0,14100095)        3       7050047 70.757874       76.248087       75.447438       68.354514       72.301301       0.322902        0.020330        -0.148419       0.110921        0.023794        93269
(0,96339)(13999912,14100064)(0,14100064)        4       7050032 99.748624       107.898618      94.265208       130.283528      119.091076      0.340878        0.247030        0.123956        -0.223386       0.211971        96339
(0,99659)(13999926,14100063)(0,14100063)        5       7050031 120.941697      132.667821      86.726667       163.908351      148.288088      0.404945        0.688320        0.639821        -0.257254       0.247395        99659
(0,99541)(13999918,14100103)(0,14100103)        6       7050051 96.666344       112.146685      69.740992       143.403712      127.775201      0.667988        0.792499        0.627735        -0.321842       0.351730        99541
(0,99786)(13999926,14100047)(0,14100047)        7       7050023 93.164548       92.023886       92.742574       142.413716      117.218807      -0.051058       -0.013928       0.010201        -0.538288       0.282133        99786
(0,98759)(13999923,14100082)(0,14100082)        8       7050041 133.567125      177.157879      72.197498       204.069028      190.613463      1.363708        1.425567        1.040517        -0.200700       0.467490        98759
(0,97855)(14001686,14100094)(0,14100094)        9       7050047 88.777475       102.853333      64.660948       104.749694      103.801516      0.660983        0.776148        0.611265        -0.021256       0.184875        97855
(0,98031)(13999906,14100096)(0,14100096)        10      7050048 129.583334      134.877160      88.135115       213.231615      174.054390      0.170681        0.654145        0.724072        -0.602284       0.375595        98031
(0,99220)(13999900,14100060)(0,14100060)        11      7050030 66.349155       79.423643       60.194045       68.903312       74.163477       0.819589        0.520022        0.207421        0.157614        0.128409        99220
(0,99861)(13999913,14100078)(0,14100078)        12      7050039 86.461303       81.630083       96.156392       110.974922      96.302507       -0.232902       -0.302980       -0.252190       -0.337701       0.124323        99861
(0,98258)(13999943,14100097)(0,14100097)        16      7050048 83.191170       99.392421       77.561510       106.148748      102.770584      0.811500        0.472922        0.152079        -0.080798       0.257008        98258
(0,99428)(13999902,14100095)(0,14100095)        17      7050047 90.254620       99.816352       65.610351       113.328929      106.572638      0.441707        0.683942        0.614609        -0.148988       0.197530        99428
(0,97118)(13999898,14100071)(0,14100071)        18      7050035 79.843256       75.282296       86.844252       67.720321       71.501308       -0.237958       -0.260778       -0.196888       0.094212        -0.114062       97118
(0,93783)(13999895,14100089)(0,14100089)        19      7050044 54.311523       49.839190       64.913940       72.868913       61.354048       -0.341795       -0.495649       -0.434079       -0.421111       0.141133        93783
(0,98938)(13999916,14100091)(0,14100091)        20      7050045 68.148147       63.323800       78.463736       56.040370       59.682084       -0.294508       -0.398845       -0.338673       0.106250        -0.135474       98938

Step 3b: Sliding Window example

We can easily do a sliding window analysis by adding -win/-step arguments to the last command. thetaStat

thetaStat do_stat out.thetas.idx -win 50000 -step 10000  -outnames theta.thetasWindow.gz

This will calculate the test statistic using a window size of 50kb and a step size of 10kb.

Example Output

- Output in the ./thetaStat print thetas.idx are the log scaled per site estimates of the thetas
- Output in the pestPG file are the sum of the per site estimates for a region

./thetaStat print angsdput.thetas.idx

#Chromo Pos     Watterson       Pairwise        thetaSingleton  thetaH  thetaL
1       14000032        -9.457420       -10.372069      -8.319252       -13.025778      -10.997194
1       14000033        -9.463637       -10.379368      -8.324414       -13.035780      -11.004670
1       14000034        -9.463740       -10.379488      -8.324500       -13.035942      -11.004793
1       14000035        -9.463603       -10.379328      -8.324386       -13.035725      -11.004629
1       14000036        -9.323246       -10.218453      -8.204848       -12.826627      -10.840519
1       14000037        -9.179270       -10.048883      -8.086425       -12.596436      -10.666670
1       14000038        -9.004664       -9.845473       -7.941453       -12.328274      -10.458416
1       14000039        -9.327033       -10.222983      -8.207914       -12.833007      -10.845176
1       14000040        -9.621554       -10.557563      -8.461745       -13.262415      -11.185971
1       14000041        -9.617449       -10.552869      -8.458225       -13.256257      -11.181185
1       14000042        -7.337841       -8.161756       -204.045433     -5.457443       -6.085818
1       14000043        -9.570405       -10.502160      -8.415195       -13.197596      -11.129976
1       14000044        -9.511097       -10.434558      -8.364249       -13.110037      -11.061100
1       14000045        -9.563664       -10.494371      -8.409489       -13.187203      -11.122022
1       14000046        -9.617690       -10.555402      -8.456395       -13.265004      -11.184107
1       14000047        -9.563722       -10.494438      -8.409538       -13.187292      -11.122090
1       14000048        -9.856578       -10.819096      -8.669691       -13.587898      -11.451396
1. chromosome
2. position
3. ThetaWatterson
4. ThetaD (nucleotide diversity)
5. Theta? (singleton category)
6. ThetaH
7. ThetaL

.thetas.idx.pestPG

The .pestPG file is a 14 column file (tab seperated). The first column contains information about the region. The second and third column is the reference name and the center of the window.

We then have 5 different estimators of theta, these are: Watterson, pairwise, FuLi, fayH, L. And we have 5 different neutrality test statistics: Tajima's D, Fu&Li F's, Fu&Li's D, Fay's H, Zeng's E. The final column is the effetive number of sites with data in the window.

## thetaStat VERSION: 0.01 build:(Jun 30 2014,12:06:12)
#(indexStart,indexStop)(firstPos_withData,lastPos_withData)(WinStart,WinStop)   Chr     WinCenter       tW      tP      tF      tH      tL      Tajima  fuf     fud     fayh    zeng    nSites
(0,98316)(14000032,14100082)(0,14100082)        1       7050041 51.002623       46.171402       64.683834       51.290955       48.731178       -0.392892       -0.647071       -0.595302       -0.099654       -0.048444       98316
(0,98474)(13999910,14100060)(0,14100060)        2       7050030 92.689100       88.806005       101.768262      122.422498      105.614255      -0.174701       -0.252477       -0.220588       -0.360944       0.152373        98474
(0,93269)(14000529,14100095)(0,14100095)        3       7050047 70.757874       76.248087       75.447438       68.354514       72.301301       0.322902        0.020330        -0.148419       0.110921        0.023794        93269
(0,96339)(13999912,14100064)(0,14100064)        4       7050032 99.748624       107.898618      94.265208       130.283528      119.091076      0.340878        0.247030        0.123956        -0.223386       0.211971        96339
(0,99659)(13999926,14100063)(0,14100063)        5       7050031 120.941697      132.667821      86.726667       163.908351      148.288088      0.404945        0.688320        0.639821        -0.257254       0.247395        99659
(0,99541)(13999918,14100103)(0,14100103)        6       7050051 96.666344       112.146685      69.740992       143.403712      127.775201      0.667988        0.792499        0.627735        -0.321842       0.351730        99541
(0,99786)(13999926,14100047)(0,14100047)        7       7050023 93.164548       92.023886       92.742574       142.413716      117.218807      -0.051058       -0.013928       0.010201        -0.538288       0.282133        99786
(0,98759)(13999923,14100082)(0,14100082)        8       7050041 133.567125      177.157879      72.197498       204.069028      190.613463      1.363708        1.425567        1.040517        -0.200700       0.467490        98759

Format is:

(indexStart,indexStop)(posStart,posStop)(regStat,regStop) chrname wincenter tW tP tF tH tL tajD fulif fuliD fayH zengsE numSites

Most likely you are just interest in the wincenter (column 3) and the column 9 which is the Tajima's D statistic.

The first 3 columns relates to the region. The next 5 columns are 5 different estimators of theta, and the next 5 columns are neutrality test statistics. The final column is the number of sites with data in the region.


The first ()()() er mainly used for debugging the sliding window program. The interpretation is:

  • The posStart and posStop is the first physical position, and last physical postion of sites included in the analysis.
  • The regStat and regStop is the physical region for which the analysis is performed. Therefore the posStat and posStop is always included within the regStart and regStop
  • The indexStart and IndexStop is the position within the internal array.

Unknown ancestral state (folded sfs)

If you don't have the ancestral states, you can still calculate the Watterson and Tajima theta, which means you can perform the Tajima's D neutrality test statistic. But this requires you to use the folded sfs. The output files will have the same format, but only the thetaW and thetaD, and tajimas D is meaningful.

There was previously an example below that showed how to perform this analysis. This information has now been added to the examples above (notice the -fold 1) step in realSFS.

Citation

Korneliussen2013