Since you want Mathematica to interpret A^2 as MatrixPower[A, 2], this definitely involves overloading standard definitions which is generally not good.

The approach I suggest aslo slightly modifies standard definitions but feels more acceptable:

```
OverHat[x_] := operator[x]
Format[operator[x_]] := OverscriptBox[x, "^"] // DisplayForm
Times[o_operator, oRest__operator] ^:=
operator[Dot @@ Identity @@@ Hold[o, oRest]]
Plus[o_operator, oRest__operator] ^:=
operator[Plus @@ Identity @@@ Hold[o, oRest]]
Times[n_?NumberQ, operator[m_?MatrixQ]] ^:=
operator[Times[n, m]]
Plus[n_?NumberQ, operator[m_?MatrixQ]] ^:=
operator[Plus[Times[n, IdentityMatrix[Length[m]]], m]]
Power[operator[m_?MatrixQ], n_] ^:=
operator[MatrixPower[m, n]]
```

`operator`

homomorphically maps algebra of Matrices (in the sense of Mathematica) to algebra of some abstract operators. Since it acts homomorphically w.r.t. `Plus`

, `Times`

and `Power`

, you can easily apply polynomials to operators.

Operator corresponding to expression A will be printed as Â. You can also input operators this way, i.e., “A, Ctrl+&, “^”, Ctrl+Space”. **The Unicode char Â that I use here and below is not the same as Mathematica's OverHat[A].**

Now you can do things like

```
x^2 + 3 x - 3 /. x -> Â
```

for symbolical operators. Or perform calculations with coordinates:

```
In[1]:= A = {{2, -20, -10}, {0, 4, 1}, {0, -6, -1}};
In[2]:= x^3 - 5 x^2 + 8 x - 4 /. x -> Â
```

which will eveluate to zero operator (this is charateristic polynomial for ). Please note that it will be a zero operator, not a zero matrix, although it will look almost like one, but with a hat over it, which in turn would look like a hat over the middle zero. (This bug can be fixed.)

The definition

```
operator[m_?MatrixQ][v_List] := m.v
```

makes it possible then to apply operators (as well as polynomials applied to operators) to vectors:

```
In[3]:= Â[{0, -1, 2}]
Out[3]= {0, -2, 4}
```

(eigenvector corresponding to eigenvalue 2)

```
In[4]:= (Â - 2)[{0, -1, 2}]
Out[4]= {0, 0, 0}
```

I haven't implemented solid error-checking but I hope you got the idea and will be able to make improvements if you like it.

`A^2`

and have Mathematica understand this? – Codie CodeMonkey Jun 30 '13 at 19:38`Unprotect`

to allow changes to an operator, and`;/`

to specify conditions for a definition. The use something like`m_^n_ := MatrixPower[m,n];/MatchQ[Dimension[m], {n_, n_}]`

... or something like that. This is all from distant memory, so take only the flavor of how it's done, don't trust the specifics! When I get back I'll see if it's still unanswered and if not, I'll make it work. – Codie CodeMonkey Jun 30 '13 at 19:49