As the title suggests this is a question about an implementation detail from HashMap#resize - that's when the inner array is doubled in size. It's a bit wordy, but I've really tried to prove that I did my best understanding this...

This happens at a point when entries in this particular bucket/bin are stored in a Linked fashion - thus having an exact order and in the context of the question this is important.

Generally the resize could be called from other places as well, but let's look at this case only.

Suppose you put these strings as keys in a HashMap (on the right there's the hashcode after HashMap#hash - that's the internal re-hashing.) Yes, these are carefully generated, not random.

 DFHXR - 11111
 YSXFJ - 01111 
 TUDDY - 11111 
 AXVUH - 01111 
 RUTWZ - 11111
 DEDUC - 01111
 WFCVW - 11111
 ZETCU - 01111
 GCVUR - 11111 

There's a simple pattern to notice here - the last 4 bits are the same for all of them - which means that when we insert 8 of these keys (there are 9 total), they will end-up in the same bucket; and on the 9-th HashMap#put, the resize will be called.

So if currently there are 8 entries (having one of the keys above) in the HashMap - it means there are 16 buckets in this map and the last 4 bits of they key decided where the entries end-up.

We put the nine-th key. At this point TREEIFY_THRESHOLD is hit and resize is called. The bins are doubled to 32 and one more bit from the keys decides where that entry will go (so, 5 bits now).

Ultimately this piece of code is reached (when resize happens):

 Node<K,V> loHead = null, loTail = null;
 Node<K,V> hiHead = null, hiTail = null;
 Node<K,V> next;
 do {
     next = e.next;
     if ((e.hash & oldCap) == 0) {
          if (loTail == null)
               loHead = e;
               loTail.next = e;
          loTail = e;
     else {
        if (hiTail == null)
            hiHead = e;
            hiTail.next = e;
        hiTail = e;
 } while ((e = next) != null);

 if (loTail != null) {
     loTail.next = null;
     newTab[j] = loHead;
 if (hiTail != null) {
     hiTail.next = null;
     newTab[j + oldCap] = hiHead;

It's actually not that complicated... what it does it splits the current bin into entries that will move to other bins and to entries that will not move to other bins - but will remain into this one for sure.

And it's actually pretty smart how it does that - it's via this piece of code:

 if ((e.hash & oldCap) == 0) 

What this does is check if the next bit (the 5-th in our case) is actually zero - if it is, it means that this entry will stay where it is; if it's not it will move with a power of two offset in the new bin.

And now finally the question: that piece of code in the resize is carefully made so that it preserves the order of the entries there was in that bin.

So after you put those 9 keys in the HashMap the order is going to be :

DFHXR -> TUDDY -> RUTWZ -> WFCVW -> GCVUR (one bin)

YSXFJ -> AXVUH -> DEDUC -> ZETCU (another bin)

Why would you want to preserve order of some entries in the HashMap. Order in a Map is really bad as detailed here or here.

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    hey, the comment already said that: "a power of two offset in the new table". – holi-java Jul 30 '17 at 20:55
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    @Nicolai to be honest the java-8 and java-9 tags are here just because I really hope to get the attention of some particular users that might know the answer... – Eugene Jul 31 '17 at 7:46
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    @Nicolai and also this is specific to java-8 and onwards for HashMap – Eugene Jul 31 '17 at 7:47
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    @Eugene By that logic every question that discusses something that was not removed in Java 9 could be tagged with java-9. This would make the tag useless as a marker for features introduced in Java 9. If you still disagree, we might want to discuss this in the chat. – Nicolai Jul 31 '17 at 9:45
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    @Nicolai yeah, that makes sense probably. Ill edit – Eugene Jul 31 '17 at 9:53

There are two common reasons for maintaining order in bins implemented as a linked list:

One is that you maintain order by increasing (or decreasing) hash-value. That means when searching a bin you can stop as soon as the current item is greater (or less, as applicable) than the hash being searched for.

Another approach involves moving entries to the front (or nearer the front) of the bucket when accessed or just adding them to the front. That suits situations where the probability of an element being accessed is high if it has just been accessed.

I've looked at the source for JDK-8 and it appears to be (at least for the most part) doing the later passive version of the later (add to front):


While it's true that you should never rely on iteration order from containers that don't guarantee it, that doesn't mean that it can't be exploited for performance if it's structural. Also notice that the implementation of a class is in a privilege position to exploit details of its implementation in a formal way that a user of that class should not.

If you look at the source and understand how its implemented and exploit it, you're taking a risk. If the implementer does it, that's a different matter!

Note: I have an implementation of an algorithm that relies heavily on a hash-table called Hashlife. That uses this model, have a hash-table that's a power of two because (a) you can get the entry by bit-masking (& mask) rather than a division and (b) rehashing is simplified because you only every 'unzip' hash-bins.

Benchmarking shows that algorithm gaining around 20% by actively moving patterns to the front of their bin when accessed.

The algorithm pretty much exploits repeating structures in cellular automata, which are common so if you've seen a pattern the chances of seeing it again are high.

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  • I don't get this That means when searching a bucket you can stop as soon as the current item is greater; internally what is being done is actually (n - 1) & hash or a negative safe modulo for power-of-two-bins. If I'm missing something plz provide an example of that actually means. – Eugene Aug 2 '17 at 12:31
  • Also this That suits situations where the probability of an element being accessed is high if it has just been accessed do you mean the if you just added EntryA and read it afterwards - it will make the reading faster? How come? it will the be last in the linked bucket – Eugene Aug 2 '17 at 12:33
  • of course this also : rehashing is simplified because you only every 'unzip' hash-bins makes very little sense to me; what re-hashing? The Maps rehashing is actually XOR-ing the first 16 bits and last 16 bits; or is it about other re-hashing? And the last: we have already established that keeping the order via that code or doing newTab[(n - 1) & hash] would do the same thing - still keep the order. But why explicitly mention that... – Eugene Aug 2 '17 at 12:38
  • Ans 1: Sorry, I've mixed terminology. I normally call the collection of entries with (entry.hash%table.size) equal a bucket. So if you're look for an entry e. You go to the bucket with index e.hash%table.size and there you find a (possibly empty) bin (or bucket). If that is sorted in hash order you then search it linearly until the current item c has a hash>e.hash in which case you know that e isn't present. It makes failing to find e quick. As a bonus you've also stopped searching exactly where you should insert e! – Persixty Aug 2 '17 at 12:44
  • Ans 2: You add new items to the front (head) of the list. So if you come to that bin you will find it first. Lots of applications have the statistical feature (and/or can be tuned to have the feature) that entries are more likely than other entries to be re-accessed soon. – Persixty Aug 2 '17 at 12:46

Order in a Map is really bad [...]

It's not bad, it's (in academic terminology) whatever. What Stuart Marks wrote at the first link you posted:

[...] preserve flexibility for future implementation changes [...]

Which means (as I understand it) that now the implementation happens to keep the order, but in the future if a better implementation is found, it will be used either it keeps the order or not.

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    please read the comments as this does not answer the question IMO – Eugene Aug 2 '17 at 11:13
  • Do you mean that there is a better impl, therefore my answer is wrong? (or are you referring to other comments, there are a lot of comments...) – MaanooAk Aug 2 '17 at 11:48
  • it's not wrong - anyone is free to up vote it for example; but I don't find it answers my question – Eugene Aug 2 '17 at 11:49
  • Ok no problem, but you think that does not answer the question because there is better impl, correct? (so I understand you) (EDIT: I may sound aggressive, but I'm not, just to be clear) – MaanooAk Aug 2 '17 at 11:51
  • Edited based on @Eugene observation – MaanooAk Aug 2 '17 at 14:21

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