I don't know if I interpreted your question correctly but suppose your list is something like

```
list = Sort /@ RandomInteger[10, {20, 3}]
(*
{{3, 9, 9}, {0, 5, 6}, {3, 4, 8}, {4, 6, 10}, {3, 6, 9}, {1, 4, 8},
{0, 6, 10}, {2, 9, 10}, {3, 5, 9}, {6, 7, 9}, {0, 9, 10}, {1, 7, 10},
{4, 5, 10}, {0, 2, 5}, {0, 6, 7}, {1, 8, 10}, {1, 8, 10}}
*)
```

then you could do something like

```
ReplaceList[Sort[list],
{___, p:{a_, b_, _}, ___, q:{a_, c_, _}, ___, r:{b_, c_, _}, ___} :> {p, q, r}]
(* Output:
{{{0, 2, 5}, {0, 9, 10}, {2, 9, 10}}, {{3, 4, 8}, {3, 5, 9},
{4, 5, 10}}, {{3, 4, 8}, {3, 6, 9}, {4, 6, 10}}}
*)
```

Note that this works since it is given that for any element `{x,y,z}`

in the original list we have `x<=y`

. Therefore, for a triple `{{a,b,_}, {a,c,_}, {b,c,_}} \[Subset] list`

we know that `a<=b<=c`

. This means that the three elements `{a,b,_}`

, `{a,c,_}`

, and `{b,c,_}`

will appear in that order in `Sort[list]`

.

`To detect at least one triple of the type {a,b,.}, {b,c,.} and {a,c,.}?`

– belisarius Sep 22 '11 at 17:52