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sql server - How to select similar sets in SQL

I have the following tables:

Order
----
ID (pk)

OrderItem
----
OrderID (fk -> Order.ID)
ItemID (fk -> Item.ID)
Quantity

Item
----
ID (pk)

How can I write a query that can select all Orders that are at least 85% similar to a specific Order?

I considered using the Jaccard Index statistic to calculate the similarity of two Orders. (By taking the intersection of each set of OrderItems divided by the union of each set of OrderItems)

However, I can't think of a way to do so without storing the computed Jaccard Index for each possible combination of two Orders. Is there another way?

Also, is there a way to include the difference in Quantity of each matched OrderItem into account?

Additional Info:


Total Orders: ~79k
Total OrderItems: ~1.76m
Avg. OrderItems per Order: 21.5
Total Items: ~13k

Note


The 85% similarity number is just a best guess at what the customer actually needs, it may change in the future. A solution that works for any similarity would be preferable.

See Question&Answers more detail:os

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How can I write a query that can select all orders that are at least 85% similar to a specific order?

This is an important simplification compared with 'all pairs of orders that are at least 85% similar to each other'.

We'll use some TDQD (Test-Driven Query Design) and some analysis to help us.

Preliminaries

To be remotely similar, the two orders must have at least one item in common. This query can be used to determine which orders have at least one item in common with a specified order:

SELECT DISTINCT I1.OrderID AS ID
  FROM OrderItem AS I1
  JOIN OrderItem AS I2 ON I2.ItemID = I1.ItemID AND I2.OrderID = <specified order ID>
 WHERE I1.OrderID != <specified order ID>

This prunes the list of other orders to be examined quite a lot, though if the specified order included one of your most popular items, it's likely that a lot of other orders also did so.

Instead of the DISTINCT, you could use:

SELECT I1.OrderID AS ID, COUNT(*) AS Num_Common
  FROM OrderItem AS I1
  JOIN OrderItem AS I2 ON I2.ItemID = I1.ItemID AND I2.OrderID = <specified order ID>
 WHERE I1.OrderID != <specified order ID>
 GROUP BY I1.OrderID

This gives you the number of items in an order that it has in common with the specified order. We also need the number of items in each order:

SELECT OrderID AS ID, COUNT(*) AS Num_Total
  FROM OrderItem
 GROUP BY OrderID;

Identical Orders

For 100% similarity, the two orders would have as many items in common as each has items. This would probably not find many pairs of orders, though. We can find the orders with exactly the same items as the specified order easily enough:

SELECT L1.ID
  FROM (SELECT OrderID AS ID, COUNT(*) AS Num_Total
          FROM OrderItem
         GROUP BY OrderID
       ) AS L1
  JOIN (SELECT I1.OrderID AS ID, COUNT(*) AS Num_Common
          FROM OrderItem AS I1
          JOIN OrderItem AS I2 ON I2.ItemID = I1.ItemID AND I2.OrderID = <specified order ID>
         WHERE I1.OrderID != <specified order ID>
         GROUP BY I1.OrderID
       ) AS L2 ON L1.ID = L2.ID AND L1.Num_Total = L2.Num_Common;

Edit: This turns out not to be stringent enough; for the orders to be identical, the number of items in the specified order must also be the same as the number in common:

SELECT L1.ID, L1.Num_Total, L2.ID, L2.Num_Common, L3.ID, L3.Num_Total
  FROM (SELECT OrderID AS ID, COUNT(*) AS Num_Total
          FROM OrderItem
         GROUP BY OrderID
       ) AS L1
  JOIN (SELECT I1.OrderID AS ID, COUNT(*) AS Num_Common
          FROM OrderItem AS I1
          JOIN OrderItem AS I2 ON I2.ItemID = I1.ItemID AND I2.OrderID = <specified order ID>
         WHERE I1.OrderID != <specified order ID>
         GROUP BY I1.OrderID
       ) AS L2 ON L1.ID = L2.ID AND L1.Num_Total = L2.Num_Common
  JOIN (SELECT OrderID AS ID, COUNT(*) AS Num_Total
          FROM OrderItem
         WHERE OrderID = <specified order ID>
         GROUP BY OrderID
       ) AS L3 ON L2.Num_Common = L3.Num_Total;

Similar Orders — Analyzing the Formula

Applying the Jaccard Similarity as defined at Wikipedia to two orders A and B, with |A| being the count of the number of items in order A, the Jaccard Similarity J(A,B) = |A∩B| ÷ |A∪B|, where |A∩B| is the number of items in common to the two orders and |A∪B| is the total number of different items ordered.

To meet an 85% Jaccard Similarity criterion, if the number of items in either order is less than some threshold, the orders must be identical. For example, if both orders A and B have 5 items, say, but there's one item different between the two, it gives you 4 items in common (|A∩B|) and 6 items in total (|A∪B|), so the Jaccard Similarity J(A,B) is only 66?%.

For 85% similarity when there are N items in each of the two orders and 1 item is different, (N-1) ÷ (N+1) ≥ 0.85, which means N > 12 (12? to be precise). For a fraction F = J(A,B), one item different means (N-1) ÷ (N+1) ≥ F which can be solved for N giving N ≥ (1 + F) ÷ (1 - F). As the similarity requirement goes up, the orders must be identical for increasingly large values of N.

Generalizing still further, let's suppose we have different size orders with N and M items (without loss of generality, N < M). The maximum value of |A∩B| is now N and the minimum value of |A∪B| is M (meaning all the items in the smaller order appear in the larger order). Let's define that M = N + ?, and that there are ? items present in the smaller order that are not present in the larger order. It follows that there are ?+? items present in the larger order that are not in the smaller order.

By definition, then, |A∩B| = N-?, and |A∪B| = (N-?) + ? + (N+?-(N-?)), where the three added terms represent (1) the number of items in common between the two orders, (2) the number of items only in the smaller order, and (3) the number of items only in the larger order. This simplifies to: |A∪B| = N+?+?.


Key Equation

For a similarity fraction F, we're interested in pairs of orders where J(A,B) ≥ F, so:

(N-?) ÷ (N+?+?) ≥ F

F ≤?(N-?) ÷ (N+?+?)


We can use a spreadsheet to graph the relationship between these. For a given number of items in the smaller order (x-axis), and for a given similarity, we can graph the maximum value of ? that gives us a similarity of F. The formula is:

? = (N(1-F) - F?) ÷ (1+F)

...plot of ? = (N(1-F) - F?) ÷ (1+F)...

This is a linear equation in N and ? for constant F; it is non-linear for different values of F. Clearly, ? has to be a non-negative integer.

Given F = 0.85, for orders that are the same size (?=0), for 1 ≤ N < 13, ? = 0; for 13 ≤ N < 25, ? ≤ 1; for 25 ≤ N < 37, ? ≤ 2, for 37 ≤ N < 50, ? ≤ 3.

For orders that differ by 1 (?=1), for 1 ≤ N < 18, ? = 0; for 18 ≤ N < 31, ? ≤ 1; for 31 ≤ N < 43, ? ≤ 2; etc. If ?=6, you need N=47 before the orders are still 85% similar with ?=1. That means the small order has 47 items, of which 46 are in common with the large order of 53 items.

Similar Orders — Applying the Analysis

So far, so good. How can we apply that theory to selecting the orders similar to a specified order?

First, we observe that the specified order could be the same size as a similar order, or larger, or smaller. This complicates things a bit.

The parameters of the equation above are:

  • N?– number of items in smaller order
  • ? — difference between number of items in larger order and N
  • F — fixed
  • ? — number of items in smaller order not matched in larger order

The values available using minor variations on the queries developed at the top:

  • NC — number of items in common
  • NA — number of items in specified order
  • NB — number of items in compared order

Corresponding queries:

SELECT OrderID AS ID, COUNT(*) AS NA
  FROM OrderItem
 WHERE OrderID = <specified order ID>
 GROUP BY OrderID;

SELECT OrderID AS ID, COUNT(*) AS NB
  FROM OrderItem
 WHERE OrderID != <specified order ID>
 GROUP BY OrderID;

SELECT I1.OrderID AS ID, COUNT(*) AS NC
  FROM OrderItem AS I1
  JOIN OrderItem AS I2 ON I2.ItemID = I1.ItemID AND I2.OrderID = <specified order ID>
 WHERE I1.OrderID != <specified order ID>
 GROUP BY I1.OrderID

For convenience, we want the values N and N+? (and hence ?) available, so we can use a UNION to arrange things appropriately, with:

  • NS = N — number of items in smaller order
  • NL = N + ??— number of items in larger order

and in the second version of the UNION query, with:

  • NC = N - ? — number of items in common

Both queries keep the two order ID numbers so that you can track back to the rest of the order information later.

SELECT v1.ID AS OrderID_1, v1.NA AS NS, v2.ID AS OrderID_2, v2.NB AS NL
  FROM (SELECT OrderID AS ID, COUNT(*) AS NA
          FROM OrderItem
         WHERE OrderID = <specified order ID>
         GROUP BY OrderID
       ) AS v1
  JOIN (SELECT OrderID AS ID, COUNT(*) AS NB
          FROM OrderItem
         WHERE OrderID != <specified order ID>
         GROUP BY OrderID
       ) AS v2
    ON v1.NA <= v2.NB
UNION
SELECT v2.ID AS OrderID_1, v2.NB AS NS, v1.ID AS OrderID_2, v1.NA AS NL
  FROM (SELECT OrderID AS ID, COUNT(*) AS NA
          FROM OrderItem
         WHERE OrderID = <specified order ID>
         GROUP BY OrderID
       ) AS v1
  JOIN (SELECT OrderID AS ID, COUNT(*) AS NB
          FROM OrderItem
         WHERE OrderID != <specified order ID>
         GROUP BY OrderID
       ) AS v2
    ON v1.NA > v2.NB

This gives us a table expression with columns OrderID_1, NS, OrderID_2, NL, where NS is the number of items in the 'smaller order and NL is the number of items in the larger order. Since there is no overlap in the order numbers generated by the v1 and v2 table expressions, there's no need to worry about 'reflexive' entries where the OrderID values are the same. Adding NC to this is most easily handled in the UNION query too:

SELECT v1.ID AS OrderID_1, v1.NA AS NS, v2.ID AS OrderID_2, v2.NB AS NL, v3.NC AS NC
  FROM (SELECT OrderID AS ID, COUNT(*) AS NA
          FROM OrderItem
         WHERE OrderID = <specified order ID>
         GROUP BY OrderID
       ) AS v1
  JOIN (SELECT OrderID AS ID, COUNT(*) AS NB
          FROM OrderItem
         WHERE OrderID != <specified order ID>
         GROUP BY OrderID
       ) AS v2
    ON v1.NA <= v2.NB
  JOIN (SELECT I1.OrderID AS ID, COUNT(*) AS NC
          FROM OrderItem AS I1
          JOIN OrderItem AS I2 ON I2.ItemID = I1.ItemID AND I2.OrderID = <specified order ID>
         WHERE I1.OrderID != <specified order ID>
         GROUP BY I1.OrderID
       ) AS v3
    ON v3.ID = v2.ID
UNION
SELECT v2.ID AS OrderID_1, v2.NB AS NS, v1.ID AS OrderID_2, v1.NA AS NL, v3.NC AS NC
  FROM (SELECT OrderID AS ID, COUNT(*) AS NA
          FROM OrderItem
         WHERE OrderID = <specified order ID>
         GROUP BY OrderID
       ) AS v1
  JOIN (SELECT OrderID AS ID, COUNT(*) AS NB
          FROM OrderItem
         WHERE OrderID != <specified order ID>
         GROUP BY OrderID
       ) AS v2
    ON v1.NA > v2.NB
  JOIN (SELECT I1.OrderID AS ID, COUNT(*) AS NC
          FROM OrderItem AS I1
          JOIN OrderItem AS I2 ON I2.ItemID = I1.ItemID AND I2.OrderID = <specified order ID>
         WHERE I1.OrderID != <specified order ID>
         GROUP BY I1.OrderID
       ) AS v3
    ON v3.ID = v1.ID

This gives us a table expression with columns OrderID_1, NS, OrderID_2, NL, NC, where NS is the number of items in the 'smaller order and NL is the number of items in the larger order, and NC is the number of items in common.

Given NS, NL, NC, we are looking for orders that satisfy:

(N-?) ÷ (N+?+?) ≥ F.

  • N?– number of items in smaller order
  • ? — diffe

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