# product of three matrices ends up an odd block matrix?

In the following bit of mathematica code

``````a1 = {{0, -I}, {I, 0}}
a2 = {{0, 1}, {1, 0}}
a3 = {{1, 0}, {0, -1}}
c = I*a1*a2 // MatrixForm
d = c*a3 // MatrixForm
``````

The display of d shows up as a two by two matrix, where the 1,1 and 2,2 elements are themselves 2x2 matrixes, whereas I expect it to be a plain old 2x2 matrix of scalars?

-

``````use () to protect expression from MatrixFrom which is a wrapper.
use '.' for matrix multiplication. Not '*'

a1 = {{0, -I}, {I, 0}}
a2 = {{0, 1}, {1, 0}}
a3 = {{1, 0}, {0, -1}}
(c = I a1.a2) // MatrixForm
(d = c.a3) // MatrixForm
``````

This is the output I get for d:

``````(1  0
0  1)
``````
-
You beat me by "---" that much! (Also, there is no need to sign your posts in SO, I've removed your signature.) –  Simon Jun 15 '11 at 2:33

This is one of the classic gotchas in Mathematica.

The `MatrixForm` display wrapper has a higher precedence than the `Set` operator (`=`).

Assuming (based on your tag selection) that you meant to use matrix multiplication `Dot` (`.`) instead of Times (`*`), I would write

``````a1 = {{0, -I}, {I, 0}}
a2 = {{0, 1}, {1, 0}}
a3 = {{1, 0}, {0, -1}}
(c = I a1.a2) // MatrixForm
(d = c.a3) // MatrixForm
``````

which returns for `c` and `d` respectively:

``````(1  0
0  -1)

(1  0
0  1)
``````

Edit:
I forgot to mention if you do enter

``````c = I a1.a2 // MatrixForm
``````

Then a quick look at the `FullForm` of `c` will show you what the problem is:

``````In[6]:= FullForm[c]
Out[6]//FullForm= MatrixForm[List[List[1,0],List[0,-1]]]
``````

You can see that it has the `Head[c] == MatrixForm` and so it won't play nice with the other matrices.

-
@Peeter The `FullForm` importance can't be emphasized enough. You will find yourself using it whenever you need to understand any unexpected result –  belisarius Jun 15 '11 at 3:08
@belisarius: Except in the version 8 `Graph` objects. Where `FullForm` acts more like python's `__repr__(self)` method, it gives you an output which will let you recreate the object. :( –  Simon Jun 15 '11 at 3:25
@Simon Yeah. If WRI is going that way, many tasks will become tough :) –  belisarius Jun 15 '11 at 3:29
"output which will let you recreate the object" -- I seem to recall WReach (I think) writing even that is not true, as it can/does give output that is not valid input. –  Mr.Wizard Jun 15 '11 at 7:26
@Mr.Wizard: You mean this answer? Anyway, this probably isn't the right place to have a whinge about the new `Graph` objects! –  Simon Jun 15 '11 at 7:45