# How to efficiently set matrix's minor in Mathematica?

While looking at the belisarius's question about generation of non-singular integer matrices with uniform distribution of its elements, I was studying a paper by Dana Randal, "Efficient generation of random non-singular matrices". The algorithm proposed is recursive, and involves generating a matrix of lower dimension and assigning it to a given minor. I used combinations of `Insert` and `Transpose` to do it, but there are must be more efficient ways of doing it. How would you do it?

The following is the code:

``````Clear[Gen];
Gen[p_, 1] := {{{1}}, RandomInteger[{1, p - 1}, {1, 1}]};
Gen[p_, n_] := Module[{v, r, aa, tt, afr, am, tm},
While[True,
v = RandomInteger[{0, p - 1}, n];
r = LengthWhile[v, # == 0 &] + 1;
If[r <= n, Break[]]
];
afr = UnitVector[n, r];
{am, tm} = Gen[p, n - 1];
{Insert[
Transpose[
Insert[Transpose[am], RandomInteger[{0, p - 1}, n - 1], r]], afr,
1], Insert[
Transpose[Insert[Transpose[tm], ConstantArray[0, n - 1], r]], v,
r]}
]

NonSingularRandomMatrix[p_?PrimeQ, n_] := Mod[Dot @@ Gen[p, n], p]
``````

It does generate a non-singular matrix, and has uniform distribution of matrix elements, but requires p to be prime:

The code is also not every efficient, which is, I suspect due to my inefficient matrix constructors:

``````In[10]:= Timing[NonSingularRandomMatrix[101, 300];]

Out[10]= {0.421, Null}
``````

EDIT So let me condense my question. The minor matrix of a given matrix `m` can be computed as follows:

``````MinorMatrix[m_?MatrixQ, {i_, j_}] :=
Drop[Transpose[Drop[Transpose[m], {j}]], {i}]
``````

It is the original matrix with `i`-th row and `j`-th column deleted.

I now need to create a matrix of size `n` by `n` that will have the given minor matrix `mm` at position `{i,j}`. What I used in the algorithm was:

``````ExpandMinor[minmat_, {i_, j_}, v1_,
v2_] /; {Length[v1] - 1, Length[v2]} == Dimensions[minmat] :=
Insert[Transpose[Insert[Transpose[minmat], v2, j]], v1, i]
``````

Example:

``````In[31]:= ExpandMinor[
IdentityMatrix[4], {2, 3}, {1, 2, 3, 4, 5}, {2, 3, 4, 4}]

Out[31]= {{1, 0, 2, 0, 0}, {1, 2, 3, 4, 5}, {0, 1, 3, 0, 0}, {0, 0, 4,
1, 0}, {0, 0, 4, 0, 1}}
``````

I am hoping this can be done more efficiently, which is what I am soliciting in the question.

Per blisarius's suggestion I looked into implementing `ExpandMinor` via `ArrayFlatten`.

``````Clear[ExpandMinorAlt];
ExpandMinorAlt[m_, {i_ /; i > 1, j_}, v1_,
v2_] /; {Length[v1] - 1, Length[v2]} == Dimensions[m] :=
ArrayFlatten[{
{Part[m, ;; i - 1, ;; j - 1], Transpose@{v2[[;; i - 1]]},
Part[m, ;; i - 1, j ;;]},
{{v1[[;; j - 1]]}, {{v1[[j]]}}, {v1[[j + 1 ;;]]}},
{Part[m, i ;;, ;; j - 1], Transpose@{v2[[i ;;]]}, Part[m, i ;;, j ;;]}
}]

ExpandMinorAlt[m_, {1, j_}, v1_,
v2_] /; {Length[v1] - 1, Length[v2]} == Dimensions[m] :=
ArrayFlatten[{
{{v1[[;; j - 1]]}, {{v1[[j]]}}, {v1[[j + 1 ;;]]}},
{Part[m, All, ;; j - 1], Transpose@{v2}, Part[m, All, j ;;]}
}]

In[192]:= dim = 5;
mm = RandomInteger[{-5, 5}, {dim, dim}];
v1 = RandomInteger[{-5, 5}, dim + 1];
v2 = RandomInteger[{-5, 5}, dim];

In[196]:=
Table[ExpandMinor[mm, {i, j}, v1, v2] ==
ExpandMinorAlt[mm, {i, j}, v1, v2], {i, dim}, {j, dim}] //
Flatten // DeleteDuplicates

Out[196]= {True}
``````
-
Sorry, I'm lazy today :). Minor is like this en.wikipedia.org/wiki/Minor_(linear_algebra)#Example, isn't it? – Dr. belisarius Apr 24 '11 at 16:58
@belisarius The minor at that page is the determinant of what I am talking about. I will edit my post to explain more. – Sasha Apr 24 '11 at 17:14
The problem you face here is immutability of most Mathematica built-ins like `Insert` etc, which create a copy. For larger matrices especially, it is this copying that makes the code inefficient. Your only friend is `Part`, used in vectorized fashion to modify a matrix in place. For the case at hand, I posted a solution below. Whether or not some generic functions can be extracted from it to perform a general task that you request, I don't yet know, but it seems quite possible. – Leonid Shifrin Apr 24 '11 at 20:07
Sasha, congratulations on 2000 rep! – Mr.Wizard Apr 25 '11 at 10:09

It took me a while to get here, but since I spent a good part of my postdoc generating random matrices, I could not help it, so here goes. The main inefficiency in the code comes from the necessity to move matrices around (copy them). If we could reformulate the algorithm so that we only modify a single matrix in place, we could win big. For this, we must compute the positions where the inserted vectors/rows will end up, given that we will typically insert in the middle of smaller matrices and thus shift the elements. This is possible. Here is the code:

``````gen = Compile[{{p, _Integer}, {n, _Integer}},
Module[{vmat = Table[0, {n}, {n}],
rs = Table[0, {n}],(* A vector of r-s*)
amatr = Table[0, {n}, {n}],
tmatr = Table[0, {n}, {n}],
i = 1,
v = Table[0, {n}],
r = n + 1,
rsc = Table[0, {n}], (* recomputed r-s *)
matstarts = Table[0, {n}], (* Horizontal positions of submatrix starts at a given step *)
remainingShifts = Table[0, {n}]
(*
** shifts that will be performed after a given row/vector insertion,
** and can affect the real positions where the elements will end up
*)
},
(*
** Compute the r-s and vectors v all at once. Pad smaller
** vectors v with zeros to fill a rectangular matrix
*)
For[i = 1, i <= n, i++,
While[True,
v = RandomInteger[{0, p - 1}, i];
For[r = 1, r <= i && v[[r]] == 0, r++];
If[r <= i,
rs[[i]] = r;
Break[]]
]];
(*
** We must recompute the actual r-s, since the elements will
** move due to subsequent column insertions.
** The code below repeatedly adds shifts to the
** r-s on the left, resulting from insertions on the right.
** For example, if vector of r-s
** is {1,2,1,3}, it will become {1,2,1,3}->{2,3,1,3}->{2,4,1,3},
** and the end result shows where
** in the actual matrix the columns (and also rows for the case of
** tmatr) will be inserted
*)
rsc = rs;
For[i = 2, i <= n, i++,
remainingShifts = Take[rsc, i - 1];
For[r = 1, r <= i - 1, r++,
If[remainingShifts[[r]] == rsc[[i]],
Break[]
]
];
If[ r <= n,
rsc[[;; i - 1]] += UnitStep[rsc[[;; i - 1]] - rsc[[i]]]
]
];
(*
** Compute the starting left positions of sub-
** matrices at each step (1x1,2x2,etc)
*)
matstarts = FoldList[Min, First@rsc, Rest@rsc];
(* Initialize matrices - this replaces the recursion base *)
amatr[[n, rsc[[1]]]] = 1;
tmatr[[rsc[[1]], rsc[[1]]]] = RandomInteger[{1, p - 1}];
(* Repeatedly perform insertions  - this replaces recursion *)
For[i = 2, i <= n, i++,
amatr[[n - i + 2 ;; n, rsc[[i]]]] = RandomInteger[{0, p - 1}, i - 1];
amatr[[n - i + 1, rsc[[i]]]] = 1;
tmatr[[n - i + 2 ;; n, rsc[[i]]]] = Table[0, {i - 1}];
tmatr[[rsc[[i]],
Fold[# + 1 - Unitize[# - #2] &,
matstarts[[i]] + Range[0, i - 1], Sort[Drop[rsc, i]]]]] =
vmat[[i, 1 ;; i]];
];
{amatr, tmatr}
],
{{FoldList[__], _Integer, 1}}, CompilationTarget -> "C"];

NonSignularRanomMatrix[p_?PrimeQ, n_] := Mod[Dot @@ Gen[p, n],p];
NonSignularRanomMatrixAlt[p_?PrimeQ, n_] := Mod[Dot @@ gen[p, n],p];
``````

Here is the timing for the large matrix:

``````In[1114]:= gen [101, 300]; // Timing

Out[1114]= {0.078, Null}
``````

For the histogram, I get the identical plots, and the 10-fold efficiency boost:

``````In[1118]:=
Histogram[Table[NonSignularRanomMatrix[11, 5][[2, 3]], {10^4}]]; // Timing

Out[1118]= {7.75, Null}

In[1119]:=
Histogram[Table[NonSignularRanomMatrixAlt[11, 5][[2, 3]], {10^4}]]; // Timing

Out[1119]= {0.687, Null}
``````

I expect that upon careful profiling of the above compiled code, one could further improve the performance. Also, I did not use runtime Listable attribute in Compile, while this should be possible. It may also be that the parts of the code which perform assignment to minors are generic enough so that the logic can be factored out of the main function - I did not investigate that yet.

-
@Leonid Note that `ConstantArray` is not supported inside `Compile` and generated a call to evaluator. When replaced with equivalent `Table` call the code gains in speed about 5%. I will study the code in details. Please update the code at your convenience, and also update definitions `NonSignularRanomMatrix` and `NonSignularRanomMatrixAlt` with `Mod` calls I added in my edit, since I missed that. Thank you. – Sasha Apr 25 '11 at 0:15
@belisarius The article talked about generation in finite field, and I forgot the final modular reduction. Once it is applied, and I updated my original code, the matrix elements are indeed uniformly distributed. Now with Leonid's high performance code, you could consider using this for your filtering algorithm. – Sasha Apr 25 '11 at 1:08
@Leonid Really nice piece of work! – Sasha Apr 25 '11 at 3:51
@Sasha Yep. I'll surely give it a try the next time I have to re-run my filters. BTW Did you notice that you managed to get Leonid to write nested loops? :) – Dr. belisarius Apr 25 '11 at 7:04
@Sasha Thanks. I am sure one can perform more optimizations though (including the one you mentioned) - I just posted the first decently working version. I will update the code soon with the modifications you mentioned. – Leonid Shifrin Apr 25 '11 at 7:11

For the first part of your question (which I hope I understand properly) can `MinorMatrix` be written as follows?

``````MinorMatrixAlt[m_?MatrixQ, {i_, j_}] := Drop[mat, {i}, {j}]
``````
-
Yes, it can be. – Sasha Apr 24 '11 at 18:59