I've got some symbols which should are non-commutative, but I don't want to have to remember which expressions have this behaviour whilst constructing equations.

I've had the thought to use MakeExpression to act on the raw boxes, and automatically uplift multiply to non-commutative multiply when appropriate (for instance when some of the symbols are non-commutative objects).

I was wondering whether anyone had any experience with this kind of configuration.

Here's what I've got so far:

```
(* Detect whether a set of row boxes represents a multiplication *)
Clear[isRowBoxMultiply];
isRowBoxMultiply[x_RowBox] := (Print["rowbox: ", x];
Head[ToExpression[x]] === Times)
isRowBoxMultiply[x___] := (Print["non-rowbox: ", x]; False)
(* Hook into the expression maker, so that we can capture any \
expression of the form F[x___], to see how it is composed of boxes, \
and return true or false on that basis *)
MakeExpression[
RowBox[List["F", "[", x___, "]"]], _] := (HoldComplete[
isRowBoxMultiply[x]])
(* Test a number of expressions to see whether they are automatically \
detected as multiplies or not. *)
F[a]
F[a b]
F[a*b]
F[a - b]
F[3 x]
F[x^2]
F[e f*g ** h*i j]
Clear[MakeExpression]
```

This appears to correctly identify expressions that are multiplication statements:

```
During evaluation of In[561]:= non-rowbox: a
Out[565]= False
During evaluation of In[561]:= rowbox: RowBox[{a,b}]
Out[566]= True
During evaluation of In[561]:= rowbox: RowBox[{a,*,b}]
Out[567]= True
During evaluation of In[561]:= rowbox: RowBox[{a,-,b}]
Out[568]= False
During evaluation of In[561]:= rowbox: RowBox[{3,x}]
Out[569]= True
During evaluation of In[561]:= non-rowbox: SuperscriptBox[x,2]
Out[570]= False
During evaluation of In[561]:= rowbox: RowBox[{e,f,*,RowBox[{g,**,h}],*,i,j}]
Out[571]= True
```

So, it looks like it's not out of the questions that I might be able to conditionally rewrite the boxes of the underlying expression; but how to do this reliably?

Take the expression `RowBox[{"e","f","*",RowBox[{"g","**","h"}],"*","i","j"}]`

, this would need to be rewritten as `RowBox[{"e","**","f","**",RowBox[{"g","**","h"}],"**","i","**","j"}]`

which seems like a non trivial operation to do with the pattern matcher and a rule set.

I'd be grateful for any suggestions from those more experienced with me.

I'm trying to find a way of doing this without altering the default behaviour and ordering of multiply.

Thanks! :)

Joe

`RowBox[{"e","f","*",RowBox[{"g","**","h"}],"*","i","j"}] /. "*" -> "**"`

, I can transform explicitly stated multiplation. But, I'm puzzling on how to insert a '**' between two non-operator strings. How can I detect the difference between an operator and a symbol, I wonder. – Dr Joe Dec 3 '11 at 13:07`Times`

parse as`NonCommutativeMultiply`

, but rather have the`NonCommutativeMultiply`

stay explicit. You can give it a nicer`StandardForm`

etc, by having it print and interpret as something like`CenterDot`

. – Simon Dec 4 '11 at 3:27`CenterDot`

can be entered using`⁝.⁝`

, which is a minimal effort. I made heavy use of this in arXiv:1102.3043 (Note, my implementation of anticommuting objects was slow and clumsy, but got the job done. ie I'm not proud of the code, but the results were nice!) – Simon Dec 4 '11 at 10:39