I spend a lot of time looking at larger matrices (10x10, 20x20, etc) which usually have some structure, but it is difficult to quickly determine the structure of them as they get larger. Ideally, I'd like to have Mathematica automatically generate some representation of a matrix that will highlight its structure. For instance,

```
(A = {{1, 2 + 3 I}, {2 - 3 I, 4}}) // StructureForm
```

would give

```
{{a, b}, {Conjugate[b], c}}
```

or even

```
{{a, b + c I}, {b - c I, d}}
```

is acceptable. A somewhat naive implementation

```
StructureForm[M_?MatrixQ] :=
MatrixForm @ Module[
{pos, chars},
pos = Reap[
Map[Sow[Position[M, #1], #1] &, M, {2}], _,
Union[Flatten[#2, 1]] &
][[2]]; (* establishes equality relationship *)
chars = CharacterRange["a", "z"][[;; Length @ pos ]];
SparseArray[Flatten[Thread /@ Thread[pos -> chars] ], Dimensions[M]]
]
```

works only for real numeric matrices, e.g.

```
StructureForm @ {{1, 2}, {2, 3}} == {{a, b}, {b, c}}
```

Obviously, I need to define what relationships I think may exist (equality, negation, conjugate, negative conjugate, etc.), but I'm not sure how to establish that these relationships exist, at least in a clean manner. And, once I have the relationships, the next question is how to determine which is the simplest, in some sense? Any thoughts?

One possibility that comes to mind is for each pair of elements generate a triple relating their positions, like `{{1,2}, Conjugate, {2,1}}`

for `A`

, above, then it becomes amenable to graph algorithms.

**Edit**: Incidentally, my inspiration is from the Matrix Algorithms series (1, 2) by Stewart.

`HermitianMatrixQ`

and`SymmetricMatrixQ`

are nice, and would be useful in displaying matrices with only those types of symmetry. Unfortunately, as is often the case, the matrices I work with usually have more complicated symmetries, in addition to be Hermitian, and I'd like a tool that can display such structure. Definitely not a simple request. – rcollyer Apr 1 '11 at 16:07`MatrixPlot`

and`ArrayPlot`

are sometimes useful, but they don't reveal the structure of symbolic matrices, and it is difficult to use them to determine hermiticity. Ideally, I'd like to perform one test to more clearly reveal the structure, and the current tools require multiple tests. – rcollyer Apr 1 '11 at 16:11numerical similaritythat does not necessarily imply they are part of the samestructure, does it? See RotationMatrix[a] // structureForm ==> {{"a", "b"}, {-"b", "a"}}, whereas RotationMatrix[[Pi]/4] // structureForm ==> {{"a", -"a"}, {"a", "a"}} and RotationMatrix[[Pi]/8] // structureForm ==> {{"a", "b"}, {-"b", "a"}} – Sjoerd C. de Vries Apr 3 '11 at 22:54