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I trying to improve search similar images pHashed in MySQL database. Right now I comparing pHash counting hamming distance like this:

SELECT * FROM images WHERE BIT_COUNT(hash ^ 2028359052535108275) <= 4

Results for selecting (engine MyISAM)

  • 20000 rows ; query time < 20ms
  • 100000 rows ; query time ~ 60ms # this was just fine, until its reached 150000 rows
  • 300000 rows ; query time ~ 150ms

So query time encrease depends of the number of rows in table.

I also try solutions found on stackoverflow Hamming distance on binary strings in SQL

BIT_COUNT(h1 ^ 11110011) + 
BIT_COUNT(h2 ^ 10110100) + 
BIT_COUNT(h3 ^ 11001001) + 
BIT_COUNT(h4 ^ 11010001) + 
BIT_COUNT(h5 ^ 00100011) + 
BIT_COUNT(h6 ^ 00010100) + 
BIT_COUNT(h7 ^ 00011111) + 
BIT_COUNT(h8 ^ 00001111) <= 4

rows 300000 ; query time ~ 240ms

I changed database engine to PostgreSQL. Translate this MySQL query to PyGreSQL Without success. rows 300000 ; query time ~ 18s

Is there any solution to optimize above queries? I mean optimization not depended of the number of rows.

I have limited ways (tools) to solve this problem. MySQL so far seemed to be the simplest solution but I can deploy code on every open source database engine that will work with Ruby on dedicated machine. There is some ready solutions for MsSQL (not tested). Maybe someone know how to translate it for MySQL or PostgreSQL.

Please, post answers based on some code or observations. We have a lot of theoretical issues about hamming distance on


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hey, i'm trying to do a similar image search just like you. but i returned always is 0? can you provide me sample code about related search with hash string ? – TomSawyer Oct 9 '13 at 8:53

When considering the efficiency of algorithms, computer scientists use the concept of the order denoted O(something) where something is a function of n, the number of things being computed, in this case rows. So we get, in increasing time:

  • O(1) - independent of the number of items
  • O(log(n)) - increases as the logarithm of the items
  • O(n) - increases in proportion of the items (what you have)
  • O(n^2) - increases as the square of the items
  • O(n^3) - etc
  • O(2^n) - increases exponentially
  • O(n!) - increases with the factorial of the number

The last 2 are effectively uncomputable for any reasonable number of n (80+).

Only the most significant term matters since this dominates for large n so n^2 and 65*n^2+787*n+4656566 are both O(n^2)

Bearing in mind that this is a mathematical construction and the time an algorithm takes with real software on real hardware using real data may be heavily influenced by other things (e.g. an O(n^2) memory operation may take less time than an O(n) disk operation).

For your problem, you need to run through each row and compute BIT_COUNT(hash ^ 2028359052535108275) <= 4. This is an O(n) operation.

The only way this could be improved is by utilizing an index since a b-tree index retrieval is an O(log(n)) operation.

However, because your column field is contained within a function, an index on that column cannot be used. You have 2 possibilities:

  1. This is an SQL server solution and I don't know if it is portable to MySQL. Create a persisted calculated column in your table with the formula BIT_COUNT(hash ^ 2028359052535108275) and put an index on it. This will not be suitable if you need to change the bit mask.
  2. Work out a way of doing the bitwise arithmetic without using the BIT_COUNT function.
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Solution 1 cannot be used, because of course bit mask needs to be changed on each request. Solution 2 too abstract - seems I have solution, but I can't tell it, because I want to make money :) – happy_marmoset Dec 8 '13 at 13:49
Writing postgres extensions can be a solution, if you know C well. Working project… – mateuszdw Feb 28 '14 at 11:08
FWIW, you can use a tree structure to speed this sort of query up. You use a BK-tree, which gives you O(log(n)) time (albeit with the distance affecting the value of n pretty significantly). In any event, you can reduce a full table scan to < 10% table scan for edit distances of <= 2, in many cases. – Fake Name Oct 9 '14 at 5:08

This solution made things a bit faster for me. It makes a derived table for each hash compare, and returns only the results that are less than the ham distance. This way, it's not doing the BIT_COUNT on a pHash that has already exceeded the ham. It returns all matches in about 2.25 seconds on 2.6 million records.

It's InnoDB, and I have very few indexes.

If somebody can make it faster, I'll appreciate you.

SELECT *, BIT_COUNT(pHash3 ^ 42597524) + BC2 AS BC3 
    SELECT *, BIT_COUNT(pHash2 ^ 258741369) + BC1 AS BC2 
    FROM ( 
        SELECT *, BIT_COUNT(pHash1 ^ 5678910) + BC0 AS BC1 
        FROM ( 
            SELECT `Key`, pHash0, pHash1, pHash2, pHash3, BIT_COUNT(pHash0 ^ 1234567) as BC0 
            FROM files 
            WHERE  BIT_COUNT(pHash0 ^ 1234567) <= 3 
        ) AS BCQ0 
        WHERE BIT_COUNT(pHash1 ^ 5678910) + BC0 <= 3 
    ) AS BCQ1 
    WHERE BIT_COUNT(pHash2 ^ 258741369) + BC1 <= 3 
    ) AS BCQ2 
WHERE BIT_COUNT(pHash3 ^ 42597524) + BC2 <= 3

This is the equivalent query, but without the derived tables. Its return time is almost 3 times as long.

SELECT `Key`, pHash0, pHash1, pHash2, pHash3 
FROM Files 
WHERE BIT_COUNT(pHash0 ^ 1234567) + BIT_COUNT(pHash1 ^ 5678910) + BIT_COUNT(pHash2 ^ 258741369) + BIT_COUNT(pHash3 ^ 42597524) <=3

Keeping in mind that the lower the ham value on the first one, the faster it will run.

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