I'm relatively new to Mathematica and though I'm familiar with a lot of the coding conventions, I'm oblivious to the way Mathematica uses symbols like @, @@, #, %, and & in commands. Specifically, I'm looking for help in using `GatherBy`

to group the pairs containing an element `i`

from the list of pairs `cases`

.

I've been using `e = GatherBy[cases, MemberQ[#, i] &];`

which worked properly when I tested it outside the confines of my function, but when put into the function module, instead of searching through `cases`

, it was searching through some other list that I had declared within my function.

I think this is happening because I am misusing the `#`

symbol (and maybe the `&`

symbol as well).

Please help direct me to what I'm doing wrong and/or some sort of documentation to all of these symbols and their uses in Mathematica.

Thank you so much in advance for any and all help any of you may provide me.

Cheers!

EDIT

Here's more of an explanation of my function

```
distill[mono_] := Module[{cases, e, f, g, h, check, res},
cases = FactorList[mono];
cases = Cases[cases, {P[_Integer, _Integer], _}];
(*Flatten the list*)
cases = Flatten[cases];
(*Remove the extra 1s *)
cases = Cases[cases, P[_Integer, _Integer]];
cases = cases //. P[r_, q_] :> {r, q};
(*Create equivalance list on the points*)
```

(*Mapped values is a global array holding all possibly values in the pairs*)

```
For[i = mappedVals[[1]], i <= Length[mappedVals]/2, i++,
Print[i];
e = GatherBy[cases, MemberQ[#, i] &];
If[Position[e[[1]], i] == {}, f = Flatten[e[[2]]],
f = Flatten[e[[1]]]];
If[Position[e[[1]], i] == {}, check = 0, check = 1];
g = Union[f];
If[check == 0, h = e[[1]], h = e[[2]] ];
cases = Append[h, g];
];
cases
];
```

I'm looking to pass this function a monomial, -q P[41,42] P[41,43] P[42,43], for example, and ultimately create equivalence classes on the points. `P[a,b]`

means that in my model that I am depicting, there is a connection between node `a`

and node `b`

. In this example the equivalence class I want output is {41,42,43} since 41 is connected to 42, which is connected to 43. For more of a non-trivial example, I would like the pairs `P[41,42]P[41,43]P[42,43]P[44,45]P[44,45]`

to yield the equivalence classes {{41,42,43},{44,45}} since 44 and 45 are sort of on their own and not connected to any of the other values. I am creating these equivalence classes by making the monomial into a factor list, selecting only the pairs, converting the pairs to a more workable format, then start my algorithm for constructing the classes. Here's the gist of the algorithm...

-Start with the first possible value in the global list `mappedVals`

(containing all possible values within the pairs)

-Use `GatherBy`

to collect all points containing the tested value (sidenote: `GatherBy`

didn't always put the pairs containing the values as the first element in the returned list so I used the `PositionQ`

function to check which of the two elements contained pairs with the tested value)

-Form the union of all pairs containing the tested value and then replace all of the pairs with the union of the pairs

-Repeat this for all possible values until `cases`

contains all equivalence classes as defined by my aforementioned definition

My error reads `Set::partw: Part 41 of {-q^4 (1/q+q) (1/T+T),2 q^2 (1/q+q) (1/T+T),-q P[41,42] P[41,43] P[42,43],-q (1/T+T)^3,-q P[41,42] P[41,43] P[42,43],(1/q+q) (1/T+T)} does not exist. >>`

where 41 is the first value tested for since it is in `mappedVals[[1]]`

and that long, disgusting set is a global variable used elsewhere in my code.

I think my issue lies in the call to the function `e = GatherBy[cases, MemberQ[#, i] &];`

. I'm trying to search `cases`

which is of the form `{{42,41},{43,41},{43,42}}`

for pairs containing, for example, 41.

Sorry for being so verbose, but I'd really appreciate any help.

`mappedVals`

and can't run your code. – cormullion Jun 21 '13 at 8:18