I am looking for an efficient way to solve the following problem.

List 1 is a list of records that are identified by a primitive triplet:

```
X | Y | Z
```

List 2 is a list of records that are identified by three sets. One Xs, one Ys, one Zs. The X, Y, Zs are of the same 'type' as those in list one so are directly comparable with one another.

```
Set(X) | Set(Y) | Set(Z)
```

For an item in list 1 I need to find all the items in list 2 where the X, Y, Z from list 1 all occur in their corresponding sets in list 2. This is best demonstrated by an example:

**List 1:**

```
X1, Y1, Z1
```

**List 2:**

```
(X1, X2) | (Y1) | (Z1, Z3)
(X1) | (Y1, Y2) | (Z1, Z2, Z3)
(X3) | (Y1, Y3) | (Z2, Z3)
```

In the above, the item in list 1 would match the first two items in list 2. The third item would not be matched as X1 does not occur in the X set, and Z1 does not occur in the Z set.

I have written a functionally correct version of the algorithm but am concerned about performance on larger data sets. Both lists are very large so iterating over list 1 and then performing an iteration over list 2 per item is going to be very inefficient.

I tried to build an index by de-normalizing each item in list 2 into a map, but the number of index entries in the index per item is proportional to the size of the item's subsets. As such this uses a very high level of memory and also requires some significant resource to build.

Can anyone suggest to me an optimal way of solving this. I'm happy to consider both memory and CPU optimal solutions but striking a balance would be nice!