matrix: extract size dependant operations

2015-11-04 23:23:46 +11:00 · 2015-11-04 23:23:46 +11:00 · a73fb9307c
commit a73fb9307c
parent 2ca4a7e291
8 changed files with 487 additions and 226 deletions
--- a/Makefile.am
+++ b/Makefile.am
@ -153,6 +153,9 @@ UTIL_FILES   =			\
    maths.hpp			\
    maths.ipp			\
    matrix.cpp			\
    matrix2.cpp			\
    matrix3.cpp			\
    matrix4.cpp			\
    matrix.hpp			\
    matrix.ipp			\
    memory.cpp			\
--- a/matrix.cpp
+++ b/matrix.cpp
@ -25,15 +25,17 @@
 using namespace util;
-//-----------------------------------------------------------------------------
+///////////////////////////////////////////////////////////////////////////////
 template <size_t S, typename T>
 matrix<S,T>
 matrix<S,T>::transposed (void) const
 {
    matrix<S,T> m;
    for (size_t i = 0; i < S; ++i)
        for (size_t j = 0; j < S; ++j)
            m.values[i][j] = values[j][i];
    return m;
 }
@ -51,185 +53,87 @@ matrix<S,T>::transpose (void)
 }
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
 matrix<S,T>
 matrix<S,T>::inverse (void) const {
    static_assert (S == 4, "assuming 4x4 matrices");
    // GLM's implementation of 4x4 matrix inversion. Should allow use of
    // vector instructions.
    const auto &m = values;
    T Coef00 = m[2][2] * m[3][3] - m[3][2] * m[2][3];
    T Coef02 = m[1][2] * m[3][3] - m[3][2] * m[1][3];
    T Coef03 = m[1][2] * m[2][3] - m[2][2] * m[1][3];
    T Coef04 = m[2][1] * m[3][3] - m[3][1] * m[2][3];
    T Coef06 = m[1][1] * m[3][3] - m[3][1] * m[1][3];
    T Coef07 = m[1][1] * m[2][3] - m[2][1] * m[1][3];
    T Coef08 = m[2][1] * m[3][2] - m[3][1] * m[2][2];
    T Coef10 = m[1][1] * m[3][2] - m[3][1] * m[1][2];
    T Coef11 = m[1][1] * m[2][2] - m[2][1] * m[1][2];
    T Coef12 = m[2][0] * m[3][3] - m[3][0] * m[2][3];
    T Coef14 = m[1][0] * m[3][3] - m[3][0] * m[1][3];
    T Coef15 = m[1][0] * m[2][3] - m[2][0] * m[1][3];
    T Coef16 = m[2][0] * m[3][2] - m[3][0] * m[2][2];
    T Coef18 = m[1][0] * m[3][2] - m[3][0] * m[1][2];
    T Coef19 = m[1][0] * m[2][2] - m[2][0] * m[1][2];
    T Coef20 = m[2][0] * m[3][1] - m[3][0] * m[2][1];
    T Coef22 = m[1][0] * m[3][1] - m[3][0] * m[1][1];
    T Coef23 = m[1][0] * m[2][1] - m[2][0] * m[1][1];
    vector<4,T> Fac0(Coef00, Coef00, Coef02, Coef03);
    vector<4,T> Fac1(Coef04, Coef04, Coef06, Coef07);
    vector<4,T> Fac2(Coef08, Coef08, Coef10, Coef11);
    vector<4,T> Fac3(Coef12, Coef12, Coef14, Coef15);
    vector<4,T> Fac4(Coef16, Coef16, Coef18, Coef19);
    vector<4,T> Fac5(Coef20, Coef20, Coef22, Coef23);
    vector<4,T> Vec0(m[1][0], m[0][0], m[0][0], m[0][0]);
    vector<4,T> Vec1(m[1][1], m[0][1], m[0][1], m[0][1]);
    vector<4,T> Vec2(m[1][2], m[0][2], m[0][2], m[0][2]);
    vector<4,T> Vec3(m[1][3], m[0][3], m[0][3], m[0][3]);
    vector<4,T> Inv0(Vec1 * Fac0 - Vec2 * Fac1 + Vec3 * Fac2);
    vector<4,T> Inv1(Vec0 * Fac0 - Vec2 * Fac3 + Vec3 * Fac4);
    vector<4,T> Inv2(Vec0 * Fac1 - Vec1 * Fac3 + Vec3 * Fac5);
    vector<4,T> Inv3(Vec0 * Fac2 - Vec1 * Fac4 + Vec2 * Fac5);
    vector<4,T> SignA(+1, -1, +1, -1);
    vector<4,T> SignB(-1, +1, -1, +1);
    //matrix<T>   Inverse(Inv0 * SignA, Inv1 * SignB, Inv2 * SignA, Inv3 * SignB);
    matrix<4,T>   Inverse = { { { Inv0.x * SignA.x, Inv0.y * SignA.y, Inv0.z * SignA.z, Inv0.w * SignA.w },
                                { Inv1.x * SignB.x, Inv1.y * SignB.y, Inv1.z * SignB.z, Inv1.w * SignB.w },
                                { Inv2.x * SignA.x, Inv2.y * SignA.y, Inv2.z * SignA.z, Inv2.w * SignA.w },
                                { Inv3.x * SignB.x, Inv3.y * SignB.y, Inv3.z * SignB.z, Inv3.w * SignB.w } } };
    vector<4,T> Row0(Inverse.values[0][0], Inverse.values[1][0], Inverse.values[2][0], Inverse.values[3][0]);
    vector<4,T> Dot0(
        m[0][0] * Row0.x,
        m[0][1] * Row0.y,
        m[0][2] * Row0.z,
        m[0][3] * Row0.w
    );
    T Dot1 = (Dot0.x + Dot0.y) + (Dot0.z + Dot0.w);
    T OneOverDeterminant = static_cast<T>(1) / Dot1;
    return Inverse * OneOverDeterminant;
 }
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
 matrix<S,T>&
-matrix<S,T>::invert (void) {
+matrix<S,T>::invert (void)
 {
    return *this = inverse ();
 }
 //-----------------------------------------------------------------------------
-template <size_t S, typename T>
+//template <size_t S, typename T>
-matrix<S,T>
+//matrix<S,T>&
-matrix<S,T>::inverse_affine (void) const {
+//matrix<S,T>::invert_affine (void)
-    return matrix<S,T>(*this).invert_affine ();
+//{
-}
+//    CHECK (is_affine ());
-
+//
-
+//    // inv ([ M b ]  == [ inv(M) -inv(M).b ]
-//-----------------------------------------------------------------------------
+//    //      [ 0 1 ])    [     0       1    ]
-template <size_t S, typename T>
+//
-matrix<S,T>&
+//    // Invert the 3x3 M
-matrix<S,T>::invert_affine (void) {
+//    T A = (values[1][1] * values[2][2] - values[1][2] * values[2][1]);
-    CHECK (is_affine ());
+//    T B = (values[1][2] * values[2][0] - values[1][0] * values[2][2]);
-
+//    T C = (values[1][0] * values[2][1] - values[1][1] * values[2][0]);
-    // inv ([ M b ]  == [ inv(M) -inv(M).b ]
+//
-    //      [ 0 1 ])    [     0       1    ]
+//    T D = (values[0][2] * values[2][1] - values[0][1] * values[2][2]);
-
+//    T E = (values[0][0] * values[2][2] - values[0][2] * values[2][0]);
-    // Invert the 3x3 M
+//    T F = (values[2][0] * values[0][1] - values[0][0] * values[2][1]);
-    T A = (values[1][1] * values[2][2] - values[1][2] * values[2][1]);
+//
-    T B = (values[1][2] * values[2][0] - values[1][0] * values[2][2]);
+//    T G = (values[0][1] * values[1][2] - values[0][2] * values[1][1]);
-    T C = (values[1][0] * values[2][1] - values[1][1] * values[2][0]);
+//    T H = (values[0][2] * values[1][0] - values[0][0] * values[1][2]);
-
+//    T K = (values[0][0] * values[1][1] - values[0][1] * values[1][0]);
-    T D = (values[0][2] * values[2][1] - values[0][1] * values[2][2]);
+//
-    T E = (values[0][0] * values[2][2] - values[0][2] * values[2][0]);
+//    T d = values[0][0] * A + values[0][1] * B + values[0][2] * C;
-    T F = (values[2][0] * values[0][1] - values[0][0] * values[2][1]);
+//    CHECK_NEQ (d, 0.0);
-
+//
-    T G = (values[0][1] * values[1][2] - values[0][2] * values[1][1]);
+//    values[0][0] = A / d;
-    T H = (values[0][2] * values[1][0] - values[0][0] * values[1][2]);
+//    values[0][1] = D / d;
-    T K = (values[0][0] * values[1][1] - values[0][1] * values[1][0]);
+//    values[0][2] = G / d;
-
+//    values[1][0] = B / d;
-    T d = values[0][0] * A + values[0][1] * B + values[0][2] * C;
+//    values[1][1] = E / d;
-    CHECK_NEQ (d, 0.0);
+//    values[1][2] = H / d;
-
+//    values[2][0] = C / d;
-    values[0][0] = A / d;
+//    values[2][1] = F / d;
-    values[0][1] = D / d;
+//    values[2][2] = K / d;
-    values[0][2] = G / d;
+//
-    values[1][0] = B / d;
+//    // Multiply the b
-    values[1][1] = E / d;
+//    T b0 = - values[0][0] * values[0][3] - values[0][1] * values[1][3] - values[0][2] * values[2][3];
-    values[1][2] = H / d;
+//    T b1 = - values[1][0] * values[0][3] - values[1][1] * values[1][3] - values[1][2] * values[2][3];
-    values[2][0] = C / d;
+//    T b2 = - values[2][0] * values[0][3] - values[2][1] * values[1][3] - values[2][2] * values[2][3];
-    values[2][1] = F / d;
+//
-    values[2][2] = K / d;
+//    values[0][3] = b0;
-
+//    values[1][3] = b1;
-    // Multiply the b
+//    values[2][3] = b2;
-    T b0 = - values[0][0] * values[0][3] - values[0][1] * values[1][3] - values[0][2] * values[2][3];
+//
-    T b1 = - values[1][0] * values[0][3] - values[1][1] * values[1][3] - values[1][2] * values[2][3];
+//    return *this;
-    T b2 = - values[2][0] * values[0][3] - values[2][1] * values[1][3] - values[2][2] * values[2][3];
+//}
    values[0][3] = b0;
    values[1][3] = b1;
    values[2][3] = b2;
    return *this;
 }
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
 T
-matrix<S,T>::det (void) const {
+util::matrix<S,T>::determinant (void) const
-    return values[0][3] * values[1][2] * values[2][1] * values[3][0] -
+{
-           values[0][2] * values[1][3] * values[2][1] * values[3][0] -
+    return util::determinant (*this);
-           values[0][3] * values[1][1] * values[2][2] * values[3][0] +
+}
           values[0][1] * values[1][3] * values[2][2] * values[3][0] +
           values[0][2] * values[1][1] * values[2][3] * values[3][0] -
           values[0][1] * values[1][2] * values[2][3] * values[3][0] -
           values[0][3] * values[1][2] * values[2][0] * values[3][1] +
           values[0][2] * values[1][3] * values[2][0] * values[3][1] +
           values[0][3] * values[1][0] * values[2][2] * values[3][1] -
           values[0][0] * values[1][3] * values[2][2] * values[3][1] -
           values[0][2] * values[1][0] * values[2][3] * values[3][1] +
           values[0][0] * values[1][2] * values[2][3] * values[3][1] +
-           values[0][3] * values[1][1] * values[2][0] * values[3][2] -
+//-----------------------------------------------------------------------------
-           values[0][1] * values[1][3] * values[2][0] * values[3][2] -
+template <size_t S, typename T>
-           values[0][3] * values[1][0] * values[2][1] * values[3][2] +
+util::matrix<S,T>
-           values[0][0] * values[1][3] * values[2][1] * values[3][2] +
+util::matrix<S,T>::inverse (void) const
-           values[0][1] * values[1][0] * values[2][3] * values[3][2] -
+{
-           values[0][0] * values[1][1] * values[2][3] * values[3][2] -
+    return util::inverse (*this);
           values[0][2] * values[1][1] * values[2][0] * values[3][3] +
           values[0][1] * values[1][2] * values[2][0] * values[3][3] +
           values[0][2] * values[1][0] * values[2][1] * values[3][3] -
           values[0][0] * values[1][2] * values[2][1] * values[3][3] -
           values[0][1] * values[1][0] * values[2][2] * values[3][3] +
           values[0][0] * values[1][1] * values[2][2] * values[3][3];
 }
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
 matrix<S,T>
-matrix<S,T>::operator* (const matrix<S,T> &rhs) const {
+matrix<S,T>::operator* (const matrix<S,T> &rhs) const
 {
    matrix<S,T> m;
    for (unsigned row = 0; row < S; ++row) {
@ -248,41 +152,23 @@ matrix<S,T>::operator* (const matrix<S,T> &rhs) const {
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
 matrix<S,T>&
-matrix<S,T>::operator*=(const matrix<S,T> &rhs) {
+matrix<S,T>::operator*=(const matrix<S,T> &rhs)
 {
    return *this = *this * rhs;
 }
 ///////////////////////////////////////////////////////////////////////////////
 //template <size_t S, typename T>
 //vector<3,T>
 //matrix<S,T>::operator* (vector<3,T> v) const
 //{
 //    return (
 //        *this * v.template homog<S> ()
 //    ).template redim<3> ();
 //}
 //
 //
 ////-----------------------------------------------------------------------------
 //template <size_t S, typename T>
 //point<3,T>
 //matrix<S,T>::operator* (point<3,T> p) const
 //{
 //    return (*this * p.template homog<S> ()).template redim<3> ();
 //}
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
 vector<S,T>
-matrix<S,T>::operator* (const vector<S,T> &rhs) const {
+matrix<S,T>::operator* (const vector<S,T> &rhs) const
-    return vector<S,T> {
+{
-        values[0][0] * rhs.x + values[0][1] * rhs.y + values[0][2] * rhs.z + values[0][3] * rhs.w,
+    vector<S,T> out;
-        values[1][0] * rhs.x + values[1][1] * rhs.y + values[1][2] * rhs.z + values[1][3] * rhs.w,
+
-        values[2][0] * rhs.x + values[2][1] * rhs.y + values[2][2] * rhs.z + values[2][3] * rhs.w,
+    for (size_t i = 0; i < S; ++i)
-        values[3][0] * rhs.x + values[3][1] * rhs.y + values[3][2] * rhs.z + values[3][3] * rhs.w
+        out[i] = dot (rhs, values[i]);
-    };
+
    return out;
 }
@ -291,12 +177,12 @@ template <size_t S, typename T>
 point<S,T>
 matrix<S,T>::operator* (const point<S,T> &rhs) const
 {
-    return point<S,T> {
+    point<S,T> out;
-        values[0][0] * rhs.x + values[0][1] * rhs.y + values[0][2] * rhs.z + values[0][3] * rhs.w,
+
-        values[1][0] * rhs.x + values[1][1] * rhs.y + values[1][2] * rhs.z + values[1][3] * rhs.w,
+    for (size_t i = 0; i < S; ++i)
-        values[2][0] * rhs.x + values[2][1] * rhs.y + values[2][2] * rhs.z + values[2][3] * rhs.w,
+        out[i] = dot (rhs, values[i]);
-        values[3][0] * rhs.x + values[3][1] * rhs.y + values[3][2] * rhs.z + values[3][3] * rhs.w
+
-    };
+    return out;
 }
@ -318,7 +204,8 @@ matrix<S,T>::operator* (T f) const
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
 matrix<S,T>&
-matrix<S,T>::operator*= (T f){
+matrix<S,T>::operator*= (T f)
 {
    for (size_t i = 0; i < S; ++i)
        for (size_t j = 0; j < S; ++j)
            values[i][j] *= f;
@ -329,22 +216,24 @@ matrix<S,T>::operator*= (T f){
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
-matrix<S,T>
+util::matrix<S,T>
-matrix<S,T>::operator/ (T s) const {
+util::matrix<S,T>::operator/ (T t) const
-    matrix<S,T> m;
+{
    auto out = *this;
-    for (size_t r = 0; r < m.rows; ++r)
+    for (auto &i: out.values)
-        for (size_t c = 0; c < m.cols; ++c)
+        for (auto &j: i)
-            m.values[r][c] = values[r][c] / s;
+            j /= t;
-    return m;
+    return out;
 }
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
 matrix<S,T>&
-matrix<S,T>::operator/= (T s) {
+matrix<S,T>::operator/= (T s)
 {
    for (size_t r = 0; r < rows; ++r)
        for (size_t c = 0; c < cols; ++c)
            values[r][c] /= s;
@ -356,7 +245,8 @@ matrix<S,T>::operator/= (T s) {
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
 bool
-matrix<S,T>::operator== (const matrix<S,T> &rhs) const {
+matrix<S,T>::operator== (const matrix<S,T> &rhs) const
 {
    for (size_t r = 0; r < rows; ++r)
        for (size_t c = 0; c < cols; ++c)
            if (!almost_equal (rhs.values[r][c], values[r][c]))
@ -368,11 +258,13 @@ matrix<S,T>::operator== (const matrix<S,T> &rhs) const {
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
 bool
-matrix<S,T>::is_affine (void) const {
+matrix<S,T>::is_affine (void) const
-    return exactly_equal (values[3][0], T {0}) &&
+{
-           exactly_equal (values[3][1], T {0}) &&
+    for (size_t i = 0; i < S - 1; ++i)
-           exactly_equal (values[3][2], T {0}) &&
+        if (!exactly_zero (values[S-1][i]))
-           exactly_equal (values[3][3], T {1});
+            return false;
    return exactly_equal (values[S-1][S-1], T{1});
 }
@ -538,31 +430,28 @@ matrix<S,T>::rotate (T angle, util::vector<3,T> about)
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
 const matrix<S,T>
-matrix<S,T>::IDENTITY = { { { 1, 0, 0, 0 },
+matrix<S,T>::ZEROES { 0 };
                            { 0, 1, 0, 0 },
                            { 0, 0, 1, 0 },
                            { 0, 0, 0, 1 } } };
 template <size_t S, typename T>
 const matrix<S,T>
 matrix<S,T>::ZEROES = { { { 0, 0, 0, 0 },
                          { 0, 0, 0, 0 },
                          { 0, 0, 0, 0 },
                          { 0, 0, 0, 0 } } };
 //-----------------------------------------------------------------------------
 namespace util {
    template struct matrix<2,float>;
    template struct matrix<2,double>;
    template struct matrix<3,float>;
    template struct matrix<3,double>;
    template struct matrix<4,float>;
    template struct matrix<4,double>;
 }
 //-----------------------------------------------------------------------------
 namespace util {
    template <size_t S, typename T>
    std::ostream&
-    operator<< (std::ostream &os, const matrix<S,T> &m) {
+    operator<< (std::ostream &os, const matrix<S,T> &m)
    {
        os << "{ {" << m.values[0][0] << ", "
                    << m.values[0][1] << ", "
                    << m.values[0][2] << ", "
@ -584,5 +473,6 @@ namespace util {
    }
 }
 template std::ostream& util::operator<< (std::ostream&, const matrix<4,float>&);
 template std::ostream& util::operator<< (std::ostream&, const matrix<4,double>&);
--- a/matrix.hpp
+++ b/matrix.hpp
@ -29,9 +29,14 @@ namespace util {
        static const size_t rows = S;
        static const size_t cols = S;
        T* operator[] (size_t);
        const T* operator[] (size_t) const;
        matrix& transpose  (void);
        matrix  transposed (void) const;
        T determinant (void) const;
        matrix  inverse (void) const;
        matrix& invert  (void);
        matrix  inverse_affine (void) const;
@ -42,9 +47,6 @@ namespace util {
        matrix   operator* (const matrix&) const;
        matrix&  operator*=(const matrix&);
        //vector<3,T> operator* (vector<3,T>) const;
        //point<3,T>  operator* (point<3,T>) const;
        vector<S,T> operator* (const vector<S,T>&) const;
        point<S,T>  operator* (const point<S,T> &) const;
@ -78,12 +80,26 @@ namespace util {
        static const matrix ZEROES;
    };
    template <size_t S, typename T>
    T determinant (const matrix<S,T>&);
    template <size_t S, typename T>
    matrix<S,T>
    inverse (const matrix<S,T>&);
    template <typename T> using matrix3 = matrix<3,T>;
    template <typename T> using matrix4 = matrix<4,T>;
    template <size_t S> using matrixf = matrix<S,float>;
    template <size_t S> using matrixd = matrix<S,double>;
    typedef matrix<2,float> matrix2f;
    typedef matrix<2,double> matrix2d;
    typedef matrix<3,float> matrix3f;
    typedef matrix<3,double> matrix3d;
    typedef matrix<4,float> matrix4f;
    typedef matrix<4,double> matrix4d;
--- a/matrix.ipp
+++ b/matrix.ipp
@ -21,6 +21,46 @@
 #define __UTIL_MATRIX_IPP
 ///////////////////////////////////////////////////////////////////////////////
 template <size_t S, typename T>
 T*
 util::matrix<S,T>::operator[] (size_t idx)
 {
    return this->values[idx];
 }
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
 const T*
 util::matrix<S,T>::operator[] (size_t idx) const
 {
    return this->values[idx];
 }
 ///////////////////////////////////////////////////////////////////////////////
 //template <size_t S, typename T>
 //vector<3,T>
 //matrix<S,T>::operator* (vector<3,T> v) const
 //{
 //    return (
 //        *this * v.template homog<S> ()
 //    ).template redim<3> ();
 //}
 //
 //
 ////-----------------------------------------------------------------------------
 //template <size_t S, typename T>
 //point<3,T>
 //matrix<S,T>::operator* (point<3,T> p) const
 //{
 //    return (*this * p.template homog<S> ()).template redim<3> ();
 //}
 //
 ///////////////////////////////////////////////////////////////////////////////
 template <size_t S, typename T>
 template <typename U>
 util::matrix<S,U>
@ -34,3 +74,49 @@ util::matrix<S,T>::cast (void) const
    return out;
 }
 /////////////////////////////////////////////////////////////////////////////////
 //template <size_t S, typename T>
 //T
 //util::matrix<S,T>::determinant (void) const
 //{
 //    return util::determinant (*this);
 //}
 //
 //
 ////-----------------------------------------------------------------------------
 //template <size_t S, typename T>
 //util::matrix<S,T>
 //util::matrix<S,T>::inverse (void) const
 //{
 //    return util::inverse (*this);
 //}
 ///////////////////////////////////////////////////////////////////////////////
 //template <size_t S, typename T>
 //util::matrix<S,T>
 //util::matrix<S,T>::operator/ (T t) const
 //{
 //    auto out = *this;
 //
 //    for (auto &i: out.values)
 //        for (auto &j: i)
 //            j /= t;
 //
 //    return out;
 //}
 //
 //
 /////////////////////////////////////////////////////////////////////////////////
 //template <size_t S, typename T>
 //bool
 //util::matrix<S,T>::operator== (const matrix<S,T> &m) const
 //{
 //    for (size_t i = 0; i < S; ++i)
 //        for (size_t j = 0; j < S; ++j)
 //            if (!exactly_equal (values[i][j], m[i][j]))
 //                return false;
 //    return true;
 //}
--- a/matrix2.cpp
+++ b/matrix2.cpp
@ -0,0 +1,64 @@
 /*
 * Licensed under the Apache License, Version 2.0 (the "License");
 * you may not use this file except in compliance with the License.
 * You may obtain a copy of the License at
 *
 *     http://www.apache.org/licenses/LICENSE-2.0
 *
 * Unless required by applicable law or agreed to in writing, software
 * distributed under the License is distributed on an "AS IS" BASIS,
 * WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
 * See the License for the specific language governing permissions and
 * limitations under the License.
 *
 * Copyright 2015 Danny Robson <danny@nerdcruft.net>
 */
 #include "matrix.hpp"
 using util::matrix;
 ///////////////////////////////////////////////////////////////////////////////
 template <size_t S, typename T>
 T
 util::determinant (const matrix<S,T> &m)
 {
    static_assert (S == 2, "partial specialization for 2 dimensions");
    return m[0][0] * m[1][1] - m[0][1] * m[1][0];
 }
 template float  util::determinant (const matrix<2,float>&);
 template double util::determinant (const matrix<2,double>&);
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
 matrix<S,T>
 util::inverse (const matrix<S,T> &m)
 {
    static_assert (S == 2, "partial specialization for 2 dimensions");
    return matrix<S,T> {
         m[1][1], -m[0][1],
        -m[1][0],  m[0][0]
    } / determinant (m);
 }
 template util::matrix<2,float>  util::inverse (const matrix<2,float>&);
 template util::matrix<2,double> util::inverse (const matrix<2,double>&);
 ///////////////////////////////////////////////////////////////////////////////
 template <size_t S, typename T>
 const matrix<S,T>
 matrix<S,T>::IDENTITY = { {
    { 1, 0, },
    { 0, 1  }
 } };
 ///////////////////////////////////////////////////////////////////////////////
 template struct util::matrix<2,float>;
 template struct util::matrix<2,double>;
--- a/matrix3.cpp
+++ b/matrix3.cpp
@ -0,0 +1,75 @@
 /*
 * Licensed under the Apache License, Version 2.0 (the "License");
 * you may not use this file except in compliance with the License.
 * You may obtain a copy of the License at
 *
 *     http://www.apache.org/licenses/LICENSE-2.0
 *
 * Unless required by applicable law or agreed to in writing, software
 * distributed under the License is distributed on an "AS IS" BASIS,
 * WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
 * See the License for the specific language governing permissions and
 * limitations under the License.
 *
 * Copyright 2015 Danny Robson <danny@nerdcruft.net>
 */
 #include "./matrix.hpp"
 using util::matrix;
 ///////////////////////////////////////////////////////////////////////////////
 template <size_t S, typename T>
 T
 util::determinant (const matrix<S,T>& m)
 {
    static_assert (S == 3, "hard coded 3x3 specialisation");
    return m[0][0] * (m[1][1] * m[2][2] - m[2][1] * m[1][2]) -
           m[0][1] * (m[1][0] * m[2][2] - m[1][2] * m[2][0]) +
           m[0][2] * (m[1][0] * m[2][1] - m[1][1] * m[2][0]);
 }
 template float  util::determinant (const matrix<3,float>&);
 template double util::determinant (const matrix<3,double>&);
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
 matrix<S,T>
 util::inverse (const matrix<S,T> &m)
 {
    static_assert (S == 3, "hard coded 3x3 specialisation");
    return matrix<S,T> {
        m[1][1] * m[2][2] - m[2][1] * m[1][2],
        m[0][2] * m[2][1] - m[0][1] * m[2][2],
        m[0][1] * m[1][2] - m[0][2] * m[1][1],
        m[1][2] * m[2][0] - m[1][0] * m[2][2],
        m[0][0] * m[2][2] - m[0][2] * m[2][0],
        m[1][0] * m[0][2] - m[0][0] * m[1][2],
        m[1][0] * m[2][1] - m[2][0] * m[1][1],
        m[2][0] * m[0][1] - m[0][0] * m[2][1],
        m[0][0] * m[1][1] - m[1][0] * m[0][1],
    } / determinant (m);
 }
 template util::matrix<3,float>  util::inverse (const matrix<3,float>&);
 template util::matrix<3,double> util::inverse (const matrix<3,double>&);
 ///////////////////////////////////////////////////////////////////////////////
 template <size_t S, typename T>
 const matrix<S,T>
 matrix<S,T>::IDENTITY = { {
    { 1, 0, 0, },
    { 0, 1, 0, },
    { 0, 0, 1  }
 } };
 ///////////////////////////////////////////////////////////////////////////////
 template struct util::matrix<3,float>;
 template struct util::matrix<3,double>;
--- a/matrix4.cpp
+++ b/matrix4.cpp
@ -0,0 +1,89 @@
 /*
 * Licensed under the Apache License, Version 2.0 (the "License");
 * you may not use this file except in compliance with the License.
 * You may obtain a copy of the License at
 *
 *     http://www.apache.org/licenses/LICENSE-2.0
 *
 * Unless required by applicable law or agreed to in writing, software
 * distributed under the License is distributed on an "AS IS" BASIS,
 * WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
 * See the License for the specific language governing permissions and
 * limitations under the License.
 *
 * Copyright 2015 Danny Robson <danny@nerdcruft.net>
 */
 #include "matrix.hpp"
 using util::matrix;
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
 T
 util::determinant (const matrix<S,T> &m)
 {
    static_assert (S == 4, "hard coded 4x4 specialisation");
    return m[0][3] * m[1][2] * m[2][1] * m[3][0] - m[0][2] * m[1][3] * m[2][1] * m[3][0] -
           m[0][3] * m[1][1] * m[2][2] * m[3][0] + m[0][1] * m[1][3] * m[2][2] * m[3][0] +
           m[0][2] * m[1][1] * m[2][3] * m[3][0] - m[0][1] * m[1][2] * m[2][3] * m[3][0] -
           m[0][3] * m[1][2] * m[2][0] * m[3][1] + m[0][2] * m[1][3] * m[2][0] * m[3][1] +
           m[0][3] * m[1][0] * m[2][2] * m[3][1] - m[0][0] * m[1][3] * m[2][2] * m[3][1] -
           m[0][2] * m[1][0] * m[2][3] * m[3][1] + m[0][0] * m[1][2] * m[2][3] * m[3][1] +
           m[0][3] * m[1][1] * m[2][0] * m[3][2] - m[0][1] * m[1][3] * m[2][0] * m[3][2] -
           m[0][3] * m[1][0] * m[2][1] * m[3][2] + m[0][0] * m[1][3] * m[2][1] * m[3][2] +
           m[0][1] * m[1][0] * m[2][3] * m[3][2] - m[0][0] * m[1][1] * m[2][3] * m[3][2] -
           m[0][2] * m[1][1] * m[2][0] * m[3][3] + m[0][1] * m[1][2] * m[2][0] * m[3][3] +
           m[0][2] * m[1][0] * m[2][1] * m[3][3] - m[0][0] * m[1][2] * m[2][1] * m[3][3] -
           m[0][1] * m[1][0] * m[2][2] * m[3][3] + m[0][0] * m[1][1] * m[2][2] * m[3][3];
 }
 template float  util::determinant (const matrix<4,float>&);
 template double util::determinant (const matrix<4,double>&);
 //-----------------------------------------------------------------------------
 template <size_t S, typename T>
 matrix<S,T>
 util::inverse (const matrix<S,T> &m)
 {
    static_assert (S == 4, "hard coded 4x4 specialisation");
    return matrix<S,T> {
        m[1][2]*m[2][3]*m[3][1] - m[1][3]*m[2][2]*m[3][1] + m[1][3]*m[2][1]*m[3][2] - m[1][1]*m[2][3]*m[3][2] - m[1][2]*m[2][1]*m[3][3] + m[1][1]*m[2][2]*m[3][3],
        m[0][3]*m[2][2]*m[3][1] - m[0][2]*m[2][3]*m[3][1] - m[0][3]*m[2][1]*m[3][2] + m[0][1]*m[2][3]*m[3][2] + m[0][2]*m[2][1]*m[3][3] - m[0][1]*m[2][2]*m[3][3],
        m[0][2]*m[1][3]*m[3][1] - m[0][3]*m[1][2]*m[3][1] + m[0][3]*m[1][1]*m[3][2] - m[0][1]*m[1][3]*m[3][2] - m[0][2]*m[1][1]*m[3][3] + m[0][1]*m[1][2]*m[3][3],
        m[0][3]*m[1][2]*m[2][1] - m[0][2]*m[1][3]*m[2][1] - m[0][3]*m[1][1]*m[2][2] + m[0][1]*m[1][3]*m[2][2] + m[0][2]*m[1][1]*m[2][3] - m[0][1]*m[1][2]*m[2][3],
        m[1][3]*m[2][2]*m[3][0] - m[1][2]*m[2][3]*m[3][0] - m[1][3]*m[2][0]*m[3][2] + m[1][0]*m[2][3]*m[3][2] + m[1][2]*m[2][0]*m[3][3] - m[1][0]*m[2][2]*m[3][3],
        m[0][2]*m[2][3]*m[3][0] - m[0][3]*m[2][2]*m[3][0] + m[0][3]*m[2][0]*m[3][2] - m[0][0]*m[2][3]*m[3][2] - m[0][2]*m[2][0]*m[3][3] + m[0][0]*m[2][2]*m[3][3],
        m[0][3]*m[1][2]*m[3][0] - m[0][2]*m[1][3]*m[3][0] - m[0][3]*m[1][0]*m[3][2] + m[0][0]*m[1][3]*m[3][2] + m[0][2]*m[1][0]*m[3][3] - m[0][0]*m[1][2]*m[3][3],
        m[0][2]*m[1][3]*m[2][0] - m[0][3]*m[1][2]*m[2][0] + m[0][3]*m[1][0]*m[2][2] - m[0][0]*m[1][3]*m[2][2] - m[0][2]*m[1][0]*m[2][3] + m[0][0]*m[1][2]*m[2][3],
        m[1][1]*m[2][3]*m[3][0] - m[1][3]*m[2][1]*m[3][0] + m[1][3]*m[2][0]*m[3][1] - m[1][0]*m[2][3]*m[3][1] - m[1][1]*m[2][0]*m[3][3] + m[1][0]*m[2][1]*m[3][3],
        m[0][3]*m[2][1]*m[3][0] - m[0][1]*m[2][3]*m[3][0] - m[0][3]*m[2][0]*m[3][1] + m[0][0]*m[2][3]*m[3][1] + m[0][1]*m[2][0]*m[3][3] - m[0][0]*m[2][1]*m[3][3],
        m[0][1]*m[1][3]*m[3][0] - m[0][3]*m[1][1]*m[3][0] + m[0][3]*m[1][0]*m[3][1] - m[0][0]*m[1][3]*m[3][1] - m[0][1]*m[1][0]*m[3][3] + m[0][0]*m[1][1]*m[3][3],
        m[0][3]*m[1][1]*m[2][0] - m[0][1]*m[1][3]*m[2][0] - m[0][3]*m[1][0]*m[2][1] + m[0][0]*m[1][3]*m[2][1] + m[0][1]*m[1][0]*m[2][3] - m[0][0]*m[1][1]*m[2][3],
        m[1][2]*m[2][1]*m[3][0] - m[1][1]*m[2][2]*m[3][0] - m[1][2]*m[2][0]*m[3][1] + m[1][0]*m[2][2]*m[3][1] + m[1][1]*m[2][0]*m[3][2] - m[1][0]*m[2][1]*m[3][2],
        m[0][1]*m[2][2]*m[3][0] - m[0][2]*m[2][1]*m[3][0] + m[0][2]*m[2][0]*m[3][1] - m[0][0]*m[2][2]*m[3][1] - m[0][1]*m[2][0]*m[3][2] + m[0][0]*m[2][1]*m[3][2],
        m[0][2]*m[1][1]*m[3][0] - m[0][1]*m[1][2]*m[3][0] - m[0][2]*m[1][0]*m[3][1] + m[0][0]*m[1][2]*m[3][1] + m[0][1]*m[1][0]*m[3][2] - m[0][0]*m[1][1]*m[3][2],
        m[0][1]*m[1][2]*m[2][0] - m[0][2]*m[1][1]*m[2][0] + m[0][2]*m[1][0]*m[2][1] - m[0][0]*m[1][2]*m[2][1] - m[0][1]*m[1][0]*m[2][2] + m[0][0]*m[1][1]*m[2][2],
    } / determinant (m);
 }
 template util::matrix<4,float> util::inverse  (const matrix<4,float>&);
 template util::matrix<4,double> util::inverse (const matrix<4,double>&);
 ///////////////////////////////////////////////////////////////////////////////
 template <size_t S, typename T>
 const matrix<S,T>
 matrix<S,T>::IDENTITY = { { { 1, 0, 0, 0 },
                            { 0, 1, 0, 0 },
                            { 0, 0, 1, 0 },
                            { 0, 0, 0, 1 } } };
 ///////////////////////////////////////////////////////////////////////////////
 template struct util::matrix<4,float>;
 template struct util::matrix<4,double>;
--- a/test/matrix.cpp
+++ b/test/matrix.cpp
@ -86,8 +86,44 @@ main (void)
        tap.expect (success, "identity inversion");
    }
    // Simple 2x2 inversion test
    {
        util::matrix2f m { {
            { 1, 2 },
            { 3, 4 }
        } };
        tap.expect_eq (-2, m.determinant (), "2x2 determinant");
        util::matrix2f r { {
            { -4,  2 },
            {  3, -1 }
        } };
        tap.expect_eq (r / 2.f, m.inverse (), "2x2 inversion");
    }
    // Simple 3x3 inversion test
    {
        util::matrix3f m { {
            { 3, 1, 2 },
            { 2, 3, 1 },
            { 4, 0, 2 }
        } };
        tap.expect_eq (-6, m.determinant (), "3x3 determinant");
        util::matrix3f r { {
            { -6,  2,  5 },
            {  0,  2, -1 },
            { 12, -4, -7 }
        } };
        tap.expect_eq (m.inverse (), r / 6.f, "3x3 inversion");
    }
    // Simple 4x4 inversion test
    {
        // Simple inversion test
        util::matrix4f m { {
            { 4, 1, 2, 3 },
            { 2, 3, 4, 1 },
@ -95,6 +131,8 @@ main (void)
            { 1, 2, 3, 4 }
        } };
        tap.expect_eq (-160.f, m.determinant (), "4x4 determinant");
        util::matrix4f r { {
            { 11,  1,  1, -9 },
            { -9,  1, 11,  1 },
@ -102,7 +140,7 @@ main (void)
            {  1, -9,  1, 11 }
        } };
-        tap.expect_eq (m.inverse (), r / 40.f, "simple inversion");
+        tap.expect_eq (m.inverse (), r / 40.f, "4x4 inversion");
    }
    return tap.status ();