Difference between revisions of "User:Skilgannon/Free Code"

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m (that made no sense. this should be better.)
m (Using <syntaxhighlight>.)
 
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This is a neat method that I made up. It takes array of 'indexes' (be it guess factors, or indexes where you are logging hits) between 0 and max and returns a double between 0 and 1 of how 'clustered' your array is. 1 if all the values are the same, and 0 if there are infinite values spread perfectly evenly. Note, this is very different from a standard deviation calculation. In this code there can be as many 'dense' points on the graph as you want, and it won't try to accommodate them all from one mean. Instead, it relies on the fact that  
 
This is a neat method that I made up. It takes array of 'indexes' (be it guess factors, or indexes where you are logging hits) between 0 and max and returns a double between 0 and 1 of how 'clustered' your array is. 1 if all the values are the same, and 0 if there are infinite values spread perfectly evenly. Note, this is very different from a standard deviation calculation. In this code there can be as many 'dense' points on the graph as you want, and it won't try to accommodate them all from one mean. Instead, it relies on the fact that  
<math> (d+k)^2 + (d-k)^2 > 2 \times d^2 > </math>
+
<math> (d+k)^2 + (d-k)^2 > 2 \times d^2  </math>
  
<pre>  
+
<syntaxhighlight>  
 
       public static double clustering(float[] indexes, float max){
 
       public static double clustering(float[] indexes, float max){
 
         float[] sorted = new float[indexes.length];
 
         float[] sorted = new float[indexes.length];
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       }
 
       }
</pre>
+
</syntaxhighlight>

Latest revision as of 09:38, 1 July 2010

This is a neat method that I made up. It takes array of 'indexes' (be it guess factors, or indexes where you are logging hits) between 0 and max and returns a double between 0 and 1 of how 'clustered' your array is. 1 if all the values are the same, and 0 if there are infinite values spread perfectly evenly. Note, this is very different from a standard deviation calculation. In this code there can be as many 'dense' points on the graph as you want, and it won't try to accommodate them all from one mean. Instead, it relies on the fact that <math> (d+k)^2 + (d-k)^2 > 2 \times d^2 </math>

 
       public static double clustering(float[] indexes, float max){
         float[] sorted = new float[indexes.length];
         System.arraycopy(indexes,0,sorted,0,indexes.length);
         java.util.Arrays.sort(sorted);
         
         double clustering = sorted[0] + max 
            - sorted[sorted.length - 1];
         clustering *= clustering;
         
         for(int i = 1; i < sorted.length; i++){
            double diff = sorted[i] - sorted[i-1];
            clustering += diff*diff;
         }      
         return clustering/(max*max);
      	
      }