Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

We are using XPath in a Java app and I was wondering: How do I select a set of nodes where the "terminating point" is a node not belonging to the same kind as it's siblings.

For example, I want to get two sets of <a> tags of size 3 and 2 from the example below:

<sample>
   <a />
   <a />
   <a />
   <terminating />
   <a />
   <a />   
</sample>
share|improve this question
    
I can't see your example. Please post a complete (or complete within itself) XML file. –  TahoeWolverine Jul 30 '09 at 0:39
    
Post fixed. @ola_user: Have a look at the editor help box on the right side of the screen for your next post. :) –  Tomalak Jul 30 '09 at 9:49

2 Answers 2

up vote 1 down vote accepted

First of all, the result of an XPath expression is always either an atomic value, or a single node-set (or sequence in XPath 2.0). You cannot get a list of node-sets.

That said, for your specific example with just two groups and one terminator, you can just use preceding-sibling and following-sibling:

/sample/terminating/preceding-sibling::a
/sample/terminating/following-sibling::a
share|improve this answer

Extending on Pavel Minaev's answer - I would write a loop, like this ("i" being the loop index):

  • find all the <terminating> nodes with the help of
    /sample/terminating
  • for each of them, find all the
    ./preceding-sibling::a[count(preceding-sibling::terminating) = {i}]
  • for the last <terminating> node, also find the
    ./following-sibling::a
share|improve this answer
1  
I think it could be done even easier - given $i, it would be just /sample/a[count(preceding-sibling::terminating) = $i - 1] to get all a in $ith group. –  Pavel Minaev Jul 30 '09 at 17:11
    
You are right, this would give the same result. Complexity is about the same, though. –  Tomalak Jul 31 '09 at 14:03

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.