Here is code in Mathematica. Documentation about the individual commands can be found in the Mathematica documentation center.

```
digitReplacements[num3_, n_, k_] :=
Module[{len, num, num3T},
len = Max[{n, IntegerLength[num3]}];
num = List /@ IntegerDigits[num3, 3, len];
Flatten[
ParallelTable[
num3T = num;
num3T[[ss]] = num3T[[ss]] /. {{0} -> {1, 2}, {1} -> {0, 2}, {2} -> {0, 1}};
IntegerString[FromDigits[#], 10, len] & /@ Tuples[num3T],
{ss, Subsets[Range[len], {k}]}
], 1
]
]
```

A dissection of this code:

```
len = Max[{n, IntegerLength[num3]}];
num = List /@ IntegerDigits[num3, 3, len];
```

Assuming you want to include numbers with leading zeros the function gets the number of digits (n) as an argument. If you don't do this the splitting of the number in its individual digits won't generate n digits if it has leading zero's. The second line converts a number like 2110 to a list {{2},{1},{1},{0}}. `IntegerDigits`

does the splitting and `List /@`

maps `List`

over the resulting digits, placing the extra curly brackets that we will need later.

```
num3T = num;
num3T[[ss]] = num3T[[ss]] /. {{0} -> {1, 2}, {1} -> {0, 2}, {2} -> {0, 1}};
```

Some of these sublists will be replaced (/. is the replacement operator, which replacements take part is determined by the list of positions in ss) by the set of complementary base 3 digits so that the command `Tuples`

can make all possibles sets from them. For example `Tuples[{{1,2},{3},{4,5}}]-==> {{1, 3, 4}, {1, 3, 5}, {2, 3, 4}, {2, 3, 5}}`

```
IntegerString[FromDigits[#], 10, len] & /@ Tuples[num3T],
```

The `Tuples`

is at the end of the line. The first part is a pure function that acts on the result of the `Tuples`

function to turn it in a number again with `FromDigits`

and to take care of leading zeros using `IntegerString`

(the result is a string therefore, to allow for leading zeros).

The heart is the generation of the table of these tuples based on finding all possible replacement positions. This is done with the line `Subsets[Range[len], {k}]`

which generates all subsets of a list {1,2,...,n} made by picking k numbers. The `ParallelTable`

cycles over this list using the generated positions to replace all applicable digits at these positions to lists of possible counterparts. Generating this list of digit-change position seems a natural approach to parallelize the problem as you can dedicate pieces of the list to various cores. `ParallelTable`

is a parallel computing variant of Mathematica's standard `Table`

function which takes care of this parallelization automatically.

Since every set of positions that ss takes generates a list of resulting numbers the end result is a list of lists. `Flatten`

flattens this out to one list of numbers.

```
digitReplacements[120, 3, 1]
==> {"010", "210", "100", "120", "111", "112"}
digitReplacements[2012, 5, 2]
==>{"10112", "11112", "20112", "21112", "12012", "12212", \
"22012", "22212", "12102", "12122", "22102", "22122", "12110", \
"12111", "22110", "22111", "00012", "00212", "01012", "01212", \
"00102", "00122", "01102", "01122", "00110", "00111", "01110", \
"01111", "02002", "02022", "02202", "02222", "02010", "02011", \
"02210", "02211", "02100", "02101", "02120", "02121"}
digitReplacements[1220101012201010, 16, 6] // Length // Timing
==> {0.671, 512512}
```

So, we find half a million sets in 0.671 seconds. If I change `ParallelTable`

in `Table`

it takes 3.463 seconds which is about 5 times slower. A bit surprising as I only have 4 cores, and usually parallel overhead eats up a considerable portion of potential speed gains.