add shifted eigenvalue procedure and unit test

2023-11-27 14:06:16 -07:00 · 2023-11-27 14:06:16 -07:00 · 793c01c9bd
commit 793c01c9bd
parent 76e00682b2
5 changed files with 128 additions and 66 deletions
--- a/doc/software_manual.org
+++ b/doc/software_manual.org
@ -1035,22 +1035,22 @@ double dominant_eigenvalue(Matrix_double *m, Array_double *v, double tolerance,
  return lambda;
 }
 #+END_SRC
-*** ~least_dominant_eigenvalue~
+*** ~shift_inverse_power_eigenvalue~
 + Author: Elizabeth Hunt
 + Name: ~least_dominant_eigenvalue~
 + Location: ~src/eigen.c~
 + Input: a pointer to an invertible matrix ~m~, an initial eigenvector guess ~v~ (that is non
-  zero or orthogonal to an eigenvector with the dominant eigenvalue), a ~tolerance~ and
+  zero or orthogonal to an eigenvector with the dominant eigenvalue), a ~shift~ to act as the
- ~max_iterations~ that act as stop conditions
+  shifted \delta, and ~tolerance~ and ~max_iterations~ that act as stop conditions.
-+ Output: the least dominant eigenvalue with the lowest magnitude, approximated with the Inverse
+ Output: the eigenvalue closest to ~shift~ with the lowest magnitude closest to 0, approximated
-  Power Iteration Method
+  with the Inverse Power Iteration Method
 #+BEGIN_SRC c
-double least_dominant_eigenvalue(Matrix_double *m, Array_double *v,
+double shift_inverse_power_eigenvalue(Matrix_double *m, Array_double *v,
-                                 double tolerance, size_t max_iterations) {
+                                      double shift, double tolerance,
                                      size_t max_iterations) {
  assert(m->rows == m->cols);
  assert(m->rows == v->size);
  double shift = 0.0;
  Matrix_double *m_c = copy_matrix(m);
  for (size_t y = 0; y < m_c->rows; ++y)
    m_c->data[y]->data[y] = m_c->data[y]->data[y] - shift;
@ -1065,22 +1065,38 @@ double least_dominant_eigenvalue(Matrix_double *m, Array_double *v,
    Array_double *normalized_eigenvector_2 =
        scale_v(eigenvector_2, 1.0 / linf_norm(eigenvector_2));
    free_vector(eigenvector_2);
    eigenvector_2 = normalized_eigenvector_2;
-    Array_double *mx = m_dot_v(m, eigenvector_2);
+    Array_double *mx = m_dot_v(m, normalized_eigenvector_2);
    double new_lambda =
-        v_dot_v(mx, eigenvector_2) / v_dot_v(eigenvector_2, eigenvector_2);
+        v_dot_v(mx, normalized_eigenvector_2) /
        v_dot_v(normalized_eigenvector_2, normalized_eigenvector_2);
    error = fabs(new_lambda - lambda);
    lambda = new_lambda;
    free_vector(eigenvector_1);
-    eigenvector_1 = eigenvector_2;
+    eigenvector_1 = normalized_eigenvector_2;
  }
  return lambda;
 }
 #+END_SRC
 *** ~least_dominant_eigenvalue~
 + Author: Elizabeth Hunt
 + Name: ~least_dominant_eigenvalue~
 + Location: ~src/eigen.c~
 + Input: a pointer to an invertible matrix ~m~, an initial eigenvector guess ~v~ (that is non
  zero or orthogonal to an eigenvector with the dominant eigenvalue), a ~tolerance~ and
 ~max_iterations~ that act as stop conditions.
 + Output: the least dominant eigenvalue with the lowest magnitude closest to 0, approximated
  with the Inverse Power Iteration Method.
 #+BEGIN_SRC c
 double least_dominant_eigenvalue(Matrix_double *m, Array_double *v,
                                 double tolerance, size_t max_iterations) {
  return shift_inverse_power_eigenvalue(m, v, 0.0, tolerance, max_iterations);
 }
 #+END_SRC
 *** ~leslie_matrix~
 + Author: Elizabeth Hunt
 + Name: ~leslie_matrix~
--- a/homeworks/hw-7.org
+++ b/homeworks/hw-7.org
@ -21,7 +21,23 @@ finds the least dominant eigenvalue on the matrix:
 0 & 2 & 6 
 \end{bmatrix}
-which has eigenvalues: $5 + \sqrt{17}, 2, 5 - \sqrt{17}$ and should produce $\sqrt{17}$.
+which has eigenvalues: $5 + \sqrt{17}, 2, 5 - \sqrt{17}$ and should thus produce $5 - \sqrt{17}$.
 See also the entry ~Eigen-Adjacent -> least_dominant_eigenvalue~ in the LIZFCM API
 documentation.
 * Question Four
 See ~UTEST(eigen, shifted_eigenvalue)~ in ~test/eigen.t.c~ which
 finds the least dominant eigenvalue on the matrix:
 \begin{bmatrix}
 2 & 2 & 4 \\
 1 & 4 & 7 \\
 0 & 2 & 6 
 \end{bmatrix}
 which has eigenvalues: $5 + \sqrt{17}, 2, 5 - \sqrt{17}$ and should thus produce $2.0$.
 With the initial guess: $[0.5, 1.0, 0.75]$.
 See also the entry ~Eigen-Adjacent -> shift_inverse_power_eigenvalue~ in the LIZFCM API
 documentation.
--- a/inc/lizfcm.h
+++ b/inc/lizfcm.h
@ -76,6 +76,9 @@ extern double fixed_point_secant_bisection_method(double (*f)(double),
 extern double dominant_eigenvalue(Matrix_double *m, Array_double *v,
                                  double tolerance, size_t max_iterations);
 extern double shift_inverse_power_eigenvalue(Matrix_double *m, Array_double *v,
                                             double shift, double tolerance,
                                             size_t max_iterations);
 extern double least_dominant_eigenvalue(Matrix_double *m, Array_double *v,
                                        double tolerance,
                                        size_t max_iterations);
--- a/src/eigen.c
+++ b/src/eigen.c
@ -49,12 +49,12 @@ double dominant_eigenvalue(Matrix_double *m, Array_double *v, double tolerance,
  return lambda;
 }
-double least_dominant_eigenvalue(Matrix_double *m, Array_double *v,
+double shift_inverse_power_eigenvalue(Matrix_double *m, Array_double *v,
-                                 double tolerance, size_t max_iterations) {
+                                      double shift, double tolerance,
                                      size_t max_iterations) {
  assert(m->rows == m->cols);
  assert(m->rows == v->size);
  double shift = 0.0;
  Matrix_double *m_c = copy_matrix(m);
  for (size_t y = 0; y < m_c->rows; ++y)
    m_c->data[y]->data[y] = m_c->data[y]->data[y] - shift;
@ -69,17 +69,22 @@ double least_dominant_eigenvalue(Matrix_double *m, Array_double *v,
    Array_double *normalized_eigenvector_2 =
        scale_v(eigenvector_2, 1.0 / linf_norm(eigenvector_2));
    free_vector(eigenvector_2);
    eigenvector_2 = normalized_eigenvector_2;
-    Array_double *mx = m_dot_v(m, eigenvector_2);
+    Array_double *mx = m_dot_v(m, normalized_eigenvector_2);
    double new_lambda =
-        v_dot_v(mx, eigenvector_2) / v_dot_v(eigenvector_2, eigenvector_2);
+        v_dot_v(mx, normalized_eigenvector_2) /
        v_dot_v(normalized_eigenvector_2, normalized_eigenvector_2);
    error = fabs(new_lambda - lambda);
    lambda = new_lambda;
    free_vector(eigenvector_1);
-    eigenvector_1 = eigenvector_2;
+    eigenvector_1 = normalized_eigenvector_2;
  }
  return lambda;
 }
 double least_dominant_eigenvalue(Matrix_double *m, Array_double *v,
                                 double tolerance, size_t max_iterations) {
  return shift_inverse_power_eigenvalue(m, v, 0.0, tolerance, max_iterations);
 }
--- a/test/eigen.t.c
+++ b/test/eigen.t.c
@ -1,50 +1,7 @@
 #include "lizfcm.test.h"
-UTEST(eigen, leslie_matrix) {
+Matrix_double *eigen_test_matrix() {
-  Array_double *felicity = InitArray(double, {0.0, 1.5, 0.8});
+  // produces a matrix that has eigenvalues [5 + sqrt{17}, 2, 5 - sqrt{17}]
  Array_double *survivor_ratios = InitArray(double, {0.8, 0.55});
  Matrix_double *m = InitMatrixWithSize(double, 3, 3, 0.0);
  m->data[0]->data[0] = 0.0;
  m->data[0]->data[1] = 1.5;
  m->data[0]->data[2] = 0.8;
  m->data[1]->data[0] = 0.8;
  m->data[2]->data[1] = 0.55;
  Matrix_double *leslie = leslie_matrix(survivor_ratios, felicity);
  EXPECT_TRUE(matrix_equal(leslie, m));
  free_matrix(leslie);
  free_matrix(m);
  free_vector(felicity);
  free_vector(survivor_ratios);
 }
 UTEST(eigen, leslie_matrix_dominant_eigenvalue) {
  Array_double *felicity = InitArray(double, {0.0, 1.5, 0.8});
  Array_double *survivor_ratios = InitArray(double, {0.8, 0.55});
  Matrix_double *leslie = leslie_matrix(survivor_ratios, felicity);
  Array_double *v_guess = InitArrayWithSize(double, 3, 2.0);
  double tolerance = 0.0001;
  uint64_t max_iterations = 64;
  double expect_dominant_eigenvalue = 1.22005;
  double approx_dominant_eigenvalue =
      dominant_eigenvalue(leslie, v_guess, tolerance, max_iterations);
  EXPECT_NEAR(expect_dominant_eigenvalue, approx_dominant_eigenvalue,
              tolerance);
  free_vector(v_guess);
  free_vector(survivor_ratios);
  free_vector(felicity);
  free_matrix(leslie);
 }
 UTEST(eigen, least_dominant_eigenvalue) {
  Matrix_double *m = InitMatrixWithSize(double, 3, 3, 0.0);
  m->data[0]->data[0] = 2.0;
  m->data[0]->data[1] = 2.0;
@ -54,12 +11,17 @@ UTEST(eigen, least_dominant_eigenvalue) {
  m->data[1]->data[2] = 7.0;
  m->data[2]->data[1] = 2.0;
  m->data[2]->data[2] = 6.0;
  return m;
 }
 UTEST(eigen, least_dominant_eigenvalue) {
  Matrix_double *m = eigen_test_matrix();
  double expected_least_dominant_eigenvalue = 0.87689; // 5 - sqrt(17)
  double tolerance = 0.0001;
  uint64_t max_iterations = 64;
-  Array_double *v_guess = InitArrayWithSize(double, 3, 2.0);
+  Array_double *v_guess = InitArrayWithSize(double, 3, 1.0);
  double approx_least_dominant_eigenvalue =
      least_dominant_eigenvalue(m, v_guess, tolerance, max_iterations);
@ -88,3 +50,63 @@ UTEST(eigen, dominant_eigenvalue) {
  free_matrix(m);
  free_vector(v_guess);
 }
 UTEST(eigen, shifted_eigenvalue) {
  Matrix_double *m = eigen_test_matrix();
  double least_dominant_eigenvalue = 0.87689; // 5 - sqrt{17}
  double dominant_eigenvalue = 9.12311;       // 5 + sqrt{17}
  double expected_middle_eigenvalue = 2.0;
  double shift = (dominant_eigenvalue + least_dominant_eigenvalue) / 2.0;
  double tolerance = 0.0001;
  uint64_t max_iterations = 64;
  Array_double *v_guess = InitArray(double, {0.5, 1.0, 0.75});
  double approx_middle_eigenvalue = shift_inverse_power_eigenvalue(
      m, v_guess, shift, tolerance, max_iterations);
  EXPECT_NEAR(approx_middle_eigenvalue, expected_middle_eigenvalue, tolerance);
 }
 UTEST(eigen, leslie_matrix_dominant_eigenvalue) {
  Array_double *felicity = InitArray(double, {0.0, 1.5, 0.8});
  Array_double *survivor_ratios = InitArray(double, {0.8, 0.55});
  Matrix_double *leslie = leslie_matrix(survivor_ratios, felicity);
  Array_double *v_guess = InitArrayWithSize(double, 3, 2.0);
  double tolerance = 0.0001;
  uint64_t max_iterations = 64;
  double expect_dominant_eigenvalue = 1.22005;
  double approx_dominant_eigenvalue =
      dominant_eigenvalue(leslie, v_guess, tolerance, max_iterations);
  EXPECT_NEAR(expect_dominant_eigenvalue, approx_dominant_eigenvalue,
              tolerance);
  free_vector(v_guess);
  free_vector(survivor_ratios);
  free_vector(felicity);
  free_matrix(leslie);
 }
 UTEST(eigen, leslie_matrix) {
  Array_double *felicity = InitArray(double, {0.0, 1.5, 0.8});
  Array_double *survivor_ratios = InitArray(double, {0.8, 0.55});
  Matrix_double *m = InitMatrixWithSize(double, 3, 3, 0.0);
  m->data[0]->data[0] = 0.0;
  m->data[0]->data[1] = 1.5;
  m->data[0]->data[2] = 0.8;
  m->data[1]->data[0] = 0.8;
  m->data[2]->data[1] = 0.55;
  Matrix_double *leslie = leslie_matrix(survivor_ratios, felicity);
  EXPECT_TRUE(matrix_equal(leslie, m));
  free_matrix(leslie);
  free_matrix(m);
  free_vector(felicity);
  free_vector(survivor_ratios);
 }