I found this problem quite interesting, so I ended up spending some time with it. :)

A couple of observations:

- The same combinations are performed for each row, so the problem can be simplified to combining the columns of one row, and then apply the same method for each row.
- It seems that you are not looking for
*all* permutations, but for the subset where the columns are combined with later columns in the array. I.e. you don't want both `ab`

& `ba`

, just `ab`

.
- The result should consist of combinations of 2..n-1 columns (where n is the number of columns). I.e. you seem to
*not* want only 1 column (the original columns) or n columns (the combination of all columns).

Finding a solution is much simpler if we divide the problem according to the observations:

Find all combinations of the columns in a single row. This problem can be divided in two as well:

a) Iterate from 2..n-1 (number of columns to combine) - i called this for the `level`

. Perhaps not the best name, but it made sense to me.

b) Find all combinations for the current `level`

and add these to the result.

Apply this to each row in the array to produce the final resulting array.

If these observations have given you some ideas, you may want to stop reading here and try for it yourself. It is much more fun to solve these kinds of problems yourself rather than look at a finished solution. However, if you are stuck -- or you have already solved and want to look at another (possibly different) solution, read ahead.

**The algorithm**

*Step 1: Combine columns in one row.*

a) Iterate over the levels 2..n-1. The level indicates the number of columns to combine.

b) Find the value of the combined columns.

Note that the first column is chose from the range 0..n-level. The second from the range c1+1..n-level+1 (where c1 is the index of the first chosen column). The third from the range c2+2..n-level+2. And so on, until we have added the correct number of columns.

c) Add the value of the combined columns to the result.

*Step 2: Apply step 1 to each row in the input array.*

a) Iterate over each row in the input array.

b) Apply step 1 to the row.

c) Add resulting row to output array.

**The implementation**

*Step 1: *`RowCombine`

```
import java.util.ArrayList;
import java.util.List;
public class RowCombine {
String[] row;
List<String> result = new ArrayList<String>();
public RowCombine(String[] row) {
this.row = row;
}
public String[] combine() {
if (result.isEmpty()) {
for (int level = 2; level < row.length; level++) {
combine(level, 0, row.length - level, "");
}
}
return result.toArray(new String[result.size()]);
}
private void combine(int level, int lower, int upper, String value) {
if (level > 0) {
for (int c = lower; c <= upper; c++) {
combine(level - 1, c + 1, upper + 1, value + row[c]);
}
} else {
result.add(value);
}
}
}
```

*Step 2: *`ArrayCombine`

```
public class ArrayCombine {
String[][] input;
String[][] output;
public ArrayCombine(String[][] input) {
this.input = input;
}
public String[][] combineColumns() {
if (output == null) {
output = new String[input.length][];
for (int i = 0; i < input.length; i++) {
RowCombine rowCombine = new RowCombine(input[i]);
output[i] = rowCombine.combine();
}
}
return output;
}
public void print() {
combineColumns();
for (String[] row : output) {
for (String value : row) {
System.out.print(value + ' ');
}
System.out.println();
}
}
}
```

**Testing**

Running

```
new ArrayCombine(new String[][]{
{ "a", "b", "c", "d"},
{ "1", "3", "9", "6"},
{ "4", "2", "7", "1"},
}).print();
```

produces

```
ab ac ad bc bd cd abc abd acd bcd
13 19 16 39 36 96 139 136 196 396
42 47 41 27 21 71 427 421 471 271
```

It also works for higher dimensions, e.g:

```
new ArrayCombine(new String[][]{
{ "a", "b", "c", "d", "e"},
{ "1", "3", "9", "6", "5"},
{ "4", "2", "7", "1", "1"},
}).print();
```

produces

```
ab ac ad ae bc bd be cd ce de abc abd abe acd ace ade bcd bce bde cde abcd abce abde acde bcde
13 19 16 15 39 36 35 96 95 65 139 136 135 196 195 165 396 395 365 965 1396 1395 1365 1965 3965
42 47 41 41 27 21 21 71 71 11 427 421 421 471 471 411 271 271 211 711 4271 4271 4211 4711 2711
```