I need to create a 3 by 3 real orthonormal symbolic matrix in Mathematica. How can I do so?

  • 2
    What kind of matrix? Mathematica has built in functions for rotation and reflection matrices, both are orthonormal. – Niki Dec 8 '11 at 14:25
  • I want to build a symbolic matrix, such that the matrix will always be treated as an orthonormal matrix, in successive computations. The command RotationMatrix in mathematica DOES NOT do this. – marcellus Dec 8 '11 at 15:25
  • There is a related question on the scientific computing stackexchange scicomp.stackexchange.com/questions/74/… – MRocklin Mar 21 '12 at 15:55

Not that I recommend this, but...

m = Array[a, {3, 3}];
{q, r} = QRDecomposition[m];
q2 = Simplify[q /. Conjugate -> Identity]

So q2 is a symbolic orthogonal matrix (assuming we work over reals).

  • Daniel, thanks for your answer. Do you see any way to "directly" impose the six conditions of orthonormality and the condition of det=1, without involving QRDecomposition? Thanks. Marcello – marcellus Dec 8 '11 at 16:04

You seem to want some SO(3) group parametrization in Mathematica I think. You will only have 3 independent symbols (variables), since you have 6 constraints from mutual orthogonality of vectors and the norms equal to 1. One way is to construct independent rotations around the 3 axes, and multiply those matrices. Here is the (perhaps too complex) code to do that:

makeOrthogonalMatrix[p_Symbol, q_Symbol, t_Symbol] :=
  Module[{permute, matrixGeneratingFunctions},
    permute =  Function[perm, Permute[Transpose[Permute[#, perm]], perm] &];
    matrixGeneratingFunctions = 
       Function /@ FoldList[
            permute[#2][#1] &,
            {{Cos[#], 0, Sin[#]}, {0, 1, 0}, {-Sin[#], 0, Cos[#]}},
            {{2, 1, 3}, {3, 2, 1}}];
    #1.#2.#3 & @@  MapThread[Compose, {matrixGeneratingFunctions, {p, q, t}}]];

Here is how this works:

In[62]:= makeOrthogonalMatrix[x,y,z]
{{Cos[x] Cos[z]+Sin[x] Sin[y] Sin[z],Cos[z] Sin[x] Sin[y]-Cos[x] Sin[z],Cos[y] Sin[x]},
 {Cos[y] Sin[z],Cos[y] Cos[z],-Sin[y]},
 {-Cos[z] Sin[x]+Cos[x] Sin[y] Sin[z],Cos[x] Cos[z] Sin[y]+Sin[x] Sin[z],Cos[x] Cos[y]}}

You can check that the matrix is orthonormal, by using Simplify over the various column (or row) dot products.

  • Leonid, Thanks for your answer. I actually want to define a generic symbolic SO(3) matrix, without starting from the Euler angles as you do. Basically I want to set a generic matrix (e.g. using mat = Table[Subscript[m, i, j], {i, 3}, {j, 3}]) and impose that the elements of this matrix will be treated always as satisfying the orthonormality conditions and the determinant = 1 condition, without the need of specifying this later on. Marcello – marcellus Dec 8 '11 at 15:29
  • @user1087909 Then, Daniel's answer should be the way to go. – Leonid Shifrin Dec 8 '11 at 15:37
  • 1
    Strangely enough, in responding to the comment/question under mine, I was going to say that Leonid's was the appropriate way. – Daniel Lichtblau Dec 8 '11 at 16:24
  • @Daniel Indeed amusing. I actually looked at my code again and realized that instead of the complicated stuff with FoldList etc, I should have just listed all 3 matrices explicitly - my code is very confusing for no good reason. Will change to this version soon. – Leonid Shifrin Dec 8 '11 at 16:30

I have found a "direct" way to impose special orthogonality. See below.

MinorMatrix[m_List?MatrixQ] := Map[Reverse, Minors[m], {0, 1}] 
CofactorMatrix[m_List?MatrixQ] := MapIndexed[#1 (-1)^(Plus @@ #2) &, MinorMatrix[m], {2}] 
UpperTriangle[ m_List?MatrixQ] := {m[[1, 1 ;; 3]], {0, m[[2,   2]], m[[2, 3]]}, {0, 0, m[[3, 3]]}}; 
FlatUpperTriangle[m_List?MatrixQ] := Flatten[{m[[1, 1 ;; 3]], m[[2, 2 ;; 3]], m[[3, 3]]}];
Orthogonalityconditions[m_List?MatrixQ] := Thread[FlatUpperTriangle[m.Transpose[m]] == FlatUpperTriangle[IdentityMatrix[3]]]; 
Selfadjunctconditions[m_List?MatrixQ] := Thread[FlatUpperTriangle[CofactorMatrix[m]] == FlatUpperTriangle[Transpose[m]]]; 
SO3conditions[m_List?MatrixQ] := Flatten[{Selfadjunctconditions[m], Orthogonalityconditions[m]}]; 

(*Building of an SO(3) matrix*) 
mat = Table[Subscript[m, i, j], {i, 3}, {j, 3}]; 
$Assumptions = SO3conditions[mat]



gives 1;...and


gives the identity matrix; ...finally

MatrixForm[Simplify[CofactorMatrix[mat] - Transpose[mat]]]

gives a Zero matrix.


This is what I was looking for when I asked my question! However, let me know your thought on this method.



Marcellus, you have to use some parametrization of SO(3), since your general matrix has to reflect the RP3 topology of the group. No single parametrization will cover the whole group without either multivaluedness or singular points. Wikipedia has a nice page about the various charts on SO(3).

Maybe one of the conceptually simplest is the exponential map from the Lie algebra so(3). Define an antisymmetric, real A (which spans so(3))

A = {{0, a, -c},
     {-a, 0, b},
     {c, -b, 0}};

Then MatrixExp[A] is an element of SO(3). We can check that this is so, using

Transpose[MatrixExp[A]].MatrixExp[A] == IdentityMatrix[3] // Simplify

If we write t^2 = a^2 + b^2 + c^2, we can simplify the matrix exponential down to

{{   b^2 + (a^2 + c^2) Cos[t]  , b c (1 - Cos[t]) + a t Sin[t], a b (1 - Cos[t]) - c t Sin[t]}, 
 {b c (1 - Cos[t]) - a t Sin[t],    c^2 + (a^2 + b^2) Cos[t]  , a c (1 - Cos[t]) + b t Sin[t]}, 
 {a b (1 - Cos[t]) + c t Sin[t], a c (1 - Cos[t]) - b t Sin[t],    a^2 + (b^2 + c^2) Cos[t]}} / t^2

Note that this is basically the same parametrization as RotationMatrix gives. Compare with the output from

RotationMatrix[s, {b, c, a}] // ComplexExpand // Simplify[#, Trig -> False] &;
% /. a^2 + b^2 + c^2 -> 1
  • Explicit but true – acl Dec 10 '11 at 1:18
  • Excellent answer. However, I prefer to define a matrix satisfying the SO(3) conditions more directly...see my answer above, and let me know what you think. Marcellus – marcellus Dec 10 '11 at 9:45

Although I really like the idea of Marcellus' answer to his own question, it's not completely correct. Unfortunately, the conditions he arrives at also result in

Simplify[Transpose[mat] - mat]

evaluating to a zero matrix! This is clearly not right. Here's an approach that's both correct and more direct:

OrthogonalityConditions[m_List?MatrixQ] := Thread[Flatten[m.Transpose[m]] == Flatten[IdentityMatrix[3]]];
SO3Conditions[m_List?MatrixQ] := Flatten[{OrthogonalityConditions[m], Det[m] == 1}];

i.e. multiplying a rotation matrix by its transpose results in the identity matrix, and the determinant of a rotation matrix is 1.

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