# Special Operators Definition in Mathematica

How do you define a special operator in Mathematica, for example a special type of additive or multiplicative operator? I did that in the past but I can't recall where I put the code. I tried defining this filled small circle operator on two matrices :

``````A_\[FilledSmallCircle] B_ :=
Which[(MatrixQ[A] || VectorQ[A]) && (MatrixQ[B] || VectorQ[B]),
A.B, ! (MatrixQ[A] || VectorQ[A]) && (MatrixQ[B] || VectorQ[B]),
A@B, (MatrixQ[A] || VectorQ[A]) && ! (MatrixQ[B] || VectorQ[B]),
Transpose[B@Transpose[A]]];
``````

But it does not work. What am I doing wrong?

-
The left hand side is being interpreted (if you put a space between `A_` and the `\[FilledSmallCircle]`) as `Times[\[FilledSmallCircle], Pattern[A, Blank[]], Pattern[B, Blank[]]]`. You need to create an infix notation. See the various answers below. – Simon Jul 20 '11 at 1:12

So you are trying to make an operator with an infix action. If you compare it to the built-in infix operators `+`, `*`, `**`, `\[CircleTimes]`, etc... you'' see that they are all interpreted into their `FullForm`: `Plus`, `Times`, `NonCommutativeMultiply`, `CircleTimes`, respectively.

``````BigDot[A_, B_] := Which[
(MatrixQ[A] || VectorQ[A]) &&  (MatrixQ[B] || VectorQ[B]), A.B,
!(MatrixQ[A] || VectorQ[A]) &&  (MatrixQ[B] || VectorQ[B]), A@B,
(MatrixQ[A] || VectorQ[A]) && !(MatrixQ[B] || VectorQ[B]), Transpose[B@Transpose[A]],
True, HoldForm[BigDot[A, B]]];
``````

Note that I added the last line as a catch-all for when neither A nor B are a matrix or a vector.

Then create the infix notation part. The hard way would be to make some `MakeExpression` and `MakeBoxes` definitions. The easy way is to use the NotationPackage

``````Needs["Notation`"]
InfixNotation[ParsedBoxWrapper["\[FilledSmallCircle]"], BigDot]
``````
-
much better than mine – acl Jul 20 '11 at 1:31
@acl: Thanks :) – Simon Jul 20 '11 at 2:05
seems I submitted an incomplete comment above... a comma before `True` is missing in your code (cut and paste problem probably) – acl Jul 20 '11 at 13:15
@acl: So my answer is not better than yours? :( Anyway thanks for picking up the typo, it was a cut and paste problem - the default for `BigDot` was an afterthought and added after the rest of the post. Normally I check the code in a fresh notebook before posting... – Simon Jul 20 '11 at 13:43
actually the comment was "much better than mine, but...", I just didn't paste the "but" part! Anyway, your answer's so much less clunky than mine it's funny. – acl Jul 20 '11 at 14:13

Try (just cut and paste this):

``````Needs["Notation`"]

Notation[ParsedBoxWrapper[
RowBox[{"A_", " ", "\[FilledSmallCircle]", " ",
"B_"}]] \[DoubleLongLeftRightArrow] ParsedBoxWrapper[
RowBox[{"Which", "[",
RowBox[{
RowBox[{
RowBox[{"(",
RowBox[{
RowBox[{"MatrixQ", "[", "A_", "]"}], "||",
RowBox[{"VectorQ", "[", "A_", "]"}]}], ")"}], "&&",
RowBox[{"(",
RowBox[{
RowBox[{"MatrixQ", "[", "B_", "]"}], "||",
RowBox[{"VectorQ", "[", "B_", "]"}]}], ")"}]}], ",",
RowBox[{"A_", " ", ".", "B_"}], ",",
RowBox[{
RowBox[{"!",
RowBox[{"(",
RowBox[{
RowBox[{"MatrixQ", "[", "A_", "]"}], "||",
RowBox[{"VectorQ", "[", "A_", "]"}]}], ")"}]}], "&&",
RowBox[{"(",
RowBox[{
RowBox[{"MatrixQ", "[", "B_", "]"}], "||",
RowBox[{"VectorQ", "[", "B_", "]"}]}], ")"}]}], ",",
RowBox[{"A_", "[", "B_", "]"}], ",",
RowBox[{
RowBox[{"(",
RowBox[{
RowBox[{"MatrixQ", "[", "A_", "]"}], "||",
RowBox[{"VectorQ", "[", "A_", "]"}]}], ")"}], "&&",
RowBox[{"!",
RowBox[{"(",
RowBox[{
RowBox[{"MatrixQ", "[", "B_", "]"}], "||",
RowBox[{"VectorQ", "[", "B_", "]"}]}], ")"}]}]}], ",",
RowBox[{"Transpose", "[",
RowBox[{"B_", "[",
RowBox[{"Transpose", "[", "A_", "]"}], "]"}], "]"}]}], "]"}]]]
``````

Now I've entered this with the `Notation` palette, so actually it looks like this on screen: (the palette inserts various boxes where necessary). It just looks horrible when I cut and paste due to the explicit string representation of everything.

EDIT: That is: type `"Needs["Notation`"]`, causing a palette to appear. Click on the first button, whereupon this

appears. Inside the first yellow box type `A_ \[FilledSmallCircle] B_`, and in the second,

``````Which[(MatrixQ[A_]||VectorQ[A_])&&(MatrixQ[B_]||VectorQ[B_]),A_ .B_,!(MatrixQ[A_]||VectorQ[A_])&&(MatrixQ[B_]||VectorQ[B_]),A_[B_],(MatrixQ[A_]||VectorQ[A_])&&!(MatrixQ[B_]||VectorQ[B_]),Transpose[B_[Transpose[A_]]]]
``````

The result looks like this

and, when evaluated, defines what you want. Alternatively, after the `Needs` bit, just cut and paste what I gave above.

-
Thanks. I tried that and it gives the error message: Notation::notapatu: Warning: The pattern A_. is being interpreted as a notation and not a pattern. Use an embedded NotationPatternTag TemplateBox wrapper if you want this pattern to be treated as a genuine pattern. >> – Phil Jul 20 '11 at 14:25
@Phil Sorry for that, try again (cut and paste again the last piece of code); I've added a space between `A_` and `.` that somehow was missing. – acl Jul 20 '11 at 14:37
tried again:same error message – Phil Jul 20 '11 at 14:49
@Phil well, it works here by cut and pasting. Since Simon's answer works, though, it doesn't really matter. – acl Jul 20 '11 at 14:51
OK I wonder what's going on i am using mma 8 without the latest update. anyway, thanks. – Phil Jul 20 '11 at 15:00

Mathematica has some operators without builtin definitions like CirclePlus and CircleTimes that you can define. I'm iPhoning now so I can't check, but I assume FilledSmallCircle is just a character and not an operator. It's less trivial to define that as an operator, but you might want to check the Notation package.

-
yes: check the Notations package – acl Jul 19 '11 at 20:24
@sjoerd: I know FilledSmallCircle is just a character and not an operator. I Here I want to provide a definition to that character.Mathematica has some operators without builtin definitions like CirclePlus and CircleTimes that you can define. My question is how to implement a particular def in mathematica – Phil Jul 19 '11 at 20:45
– acl Jul 19 '11 at 20:46
@Phil: I think that Sjoerd's point was that it won't accept the infix definition without some `MakeBoxes` and `MakeExpression` definitions. The Notation package simplifies this for you. – Simon Jul 20 '11 at 0:53
Wow! We could create a new meme ... IPhoned == Not Checked – Dr. belisarius Jul 20 '11 at 3:13