Week 1: Matrices, vectors, matrix/vector norms, scalar products & unitary matrices
Week 2: TAs-week (Strassen, FFT, a bit of SVD)
Week 3: Matrix ranks, singular value decomposition, linear systems
Today we will talk about:
Today we talk about:
A linear system of equations can be written in the form \begin{equation} \begin{split} &2 x + 3 y = 5\quad &\longrightarrow \quad &2x + 3 y + 0 z = 5\\ &2 x + 3z = 5\quad &\longrightarrow\quad &2 x + 0 y + 3 z = 5\\ &x + y = 2\quad &\longrightarrow\quad & 1 x + 1 y + 0 z = 2\\ \end{split} \end{equation}
The "matrix form" is $$ \begin{pmatrix} 2 & 3 & 0 \\ 2 & 0 & 3 \\ 1 & 1 & 0 \\ \end{pmatrix}\begin{pmatrix} x \\ y \\ z \end{pmatrix} = \begin{pmatrix} 5 \\ 5 \\ 2 \end{pmatrix} $$ or simply $$ A u = f, $$
where $A$ is a $3 \times 3$ matrix.
Linear systems are everywhere - in modelling, even if you have nonlinear systems, by linearization they are reduced to a sequence of linear systems. They appear in different applications:
We take a continious problem, discretize on a mesh with $N$ elements and get a linear system with $N\times N$ system.
Example of a mesh around A319 aircraft
(taken from GMSH website).
Storing $N^2$ elements of a matrix is prohibitive even for $N = 100000$.
How to work with such matrices?
Fortunately, those matrices are structured and require $\mathcal{O}(N)$ parameters to be stored.
The most widespread structure are sparse matrices: in the matrix there are $\mathcal{O}(N)$ non-zeros!
Example (one of the famous matrices around for $n = 5$): $$ \begin{pmatrix} 2 & -1 & 0 & 0 & 0 \\ -1 & 2 & -1 & 0 & 0 \\ 0 & -1 & 2 & -1 & 0 \\ 0 & 0 &-1& 2 & -1 \\ 0 & 0 & 0 & -1 & 2 \\ \end{pmatrix} $$ At least you can store such matrices, and multiply by vector fast; but how to solve linear systems?! (and that is typically the final goal).
Important: forget about determinants and the Cramer rule (it is good for $2 \times 2$ matrices still).
The main tool is variable elimination. \begin{equation} \begin{split} &2 y + 3 x = 5 \quad&\longrightarrow \quad &y = 5/2 - 3/2 x \\ &2 x + 3z = 5 \quad&\longrightarrow\quad &z = 5/3 - 2/3 x\\ &x + y = 2 \quad&\longrightarrow\quad & 5/2 + 5/3 - (3/2 + 2/3) x = 2,\\ \end{split} \end{equation} and that is how you find $x$ (and all previous ones).
This process is called Gaussian elimination and is one of the most widely used algorithms.
In the forward step, we eliminate $x_1$: $$ x_1 = f_1 - (a_{12} x_2 + \ldots + a_{1n} x_n)/a_{11}, $$ and then substitute this into the equations $2, \ldots, n$. Then we eliminate $x_2$ and so on from the second equation. The important thing is that the pivots (that we divide over) are not equal to $0$.
In the backward step, we solve equation for $x_n$, put it into the equation for $x_{n-1}$ and so on, until we compute all $x_i, i=1,\ldots, n$.
Each elimination step requires $\mathcal{O}(n^2)$ operations. Thus, the cost of the naive algorithm is $\mathcal{O}(n^3)$.
Think a little bit: Can Strassen help here?
Gaussian elimination is the computation of one of the most important matrix decompositions: LU-decomposition
Definition LU-decomposition of the matrix is the representation
$$A = LU,$$where $L$ is lower triangular and $U$ is upper triangular matrices (i.e. elements strictly above the diagonal are zero, elements strictly below the diagonal are zero)
The forward step is the computation of $z = L^{-1} b$, and the backward step is the computation of $U^{-1} z$.
In many cases, computing LU-decomposition once is a good idea!
Once the decomposition is found (it is $\mathcal{O}(n^3)$), then solving linear systems with $L$ and $U$ costs only $\mathcal{O}(n^2)$ operations.
Check: Solving linear systems with triangular matrices is easy (why?). How we compute the $L$ and $U$ factors?
Not let us see how it works in numpy (for the Hilbert matrix, of course).
import numpy as np
import matplotlib.pyplot as plt
%matplotlib inline
import seaborn as sns
n = 15
a = [[1.0/(i + j + 1) for i in xrange(n)] for j in xrange(n)]
a = np.array(a)
rhs = np.ones(n) #Right-hand side
x = np.linalg.solve(a, rhs)
#And check if everything is fine
er = np.linalg.norm(a.dot(x) - rhs) / np.linalg.norm(rhs)
print er
plt.xkcd()
plt.plot(x)
3.00342505734e-09
[<matplotlib.lines.Line2D at 0x11577d850>]
As you see, the error grows with larger $n$, and we have to find out why.
Important point is that it is not a problem of the algorithm: it is a problem of representing
the matrix in the memory. The error occurs in the moment when the matrix elements are evaluated approximately.
What was the problem in the previous example? Why the error grows so quickly?
And here is one of the main concepts of numerical linear algebra: the concept of condition number of a matrix.
But before that we have to define the inverse.
The inverse of a matrix $A$ is defined as a matrix $X$ denoted by $A^{-1}$ such that
$$
AX = XA = I,
$$
where $I$ is the identity matrix (i.e., $I_{ij} = 0$ if $i \ne j$ and $1$ otherwise).
The computation of the inverse is linked to the solution of linear systems. Indeed, $i$-th column of the product gives
$$
A x_i = e_i,
$$
where $e_i$ is the $i$-th column of the identity matrix. Thus, we can apply Gaussian elimination to solve this system. Moreover, if there are no divisions by zero in this process (and the pivots do not depend on the right-hand side), the it is possible to solve the system.
If we have computed $A^{-1}$, the solution of linear system
$$Ax = f$$
is just $x = A^{-1} f$.
Indeed,
$$
A(A^{-1} f) = (AA^{-1})x = I x = f.
$$
To study, why there can be such big errors in a solution (see the example above on the Hilbert matrix) we need an important auxilary result: Neumann series:
If for a matrix $\Vert F \Vert < 1$ then the matrix $(I - F)$ is invertible and
$$(I - F)^{-1} = I + F + F^2 + F^3 + \ldots = \sum_{k=0}^{\infty} F^k.$$
Note that it is a matrix version of the geometric progression.
The proof is constructive. First of all, the show prove that the series $\sum_{k=0}^{\infty} F^k$ converges.
Like in the scalar case, we have
$$
(I - F) \sum_{k=0}^N F^k = (I - F^{N+1}) \rightarrow I.
$$
Indeed,
$$
\| (I - F^{N+1}) - I\| = \|F^{N+1}\| \leqslant \|F\|^{N+1} \to 0, \quad N\to +\infty.
$$
We can also estimate the norm of the inverse:
$$
\Vert \sum_{k=0}^N F^k \Vert \leq \sum_{k=0}^N \Vert F \Vert^k \Vert I \Vert = \frac{\Vert I \Vert}{I - \Vert F \Vert}
$$
Using this result, we can estimate, how the perturbation of the matrix influences the inverse matrix. We assume that the perturbation $E$ is small in the sense that $\Vert A^{-1} E \Vert < 1$. Then $$(A + E)^{-1} = \sum_{k=0}^{\infty} (-A^{-1} E)^k A^{-1}$$ and moreover, $$ \frac{\Vert (A + E)^{-1} - A^{-1} \Vert}{\Vert A^{-1} \Vert} \leq \frac{\Vert A^{-1} \Vert \Vert E \Vert}{1 - \Vert A^{-1} E \Vert}. $$ As you see, the norm of the inverse enters the estimate.
Now consider the perturbed linear system: $$ (A + \Delta A) \widehat{x} = f + \Delta f. $$ Then the algebra begins!
therefore $$ \begin{split} \frac{\Vert \widehat{x} - x \Vert}{\Vert x \Vert} \leq &\frac{\Vert A \Vert \Vert A^{-1} \Vert}{1 - \|A^{-1}\Delta A\|} \Big(\frac{\Vert\Delta A\Vert}{\Vert A \Vert} + \frac{\Vert \Delta f \Vert}{ \Vert f \Vert}\Big) \leq \\ \leq &\frac{\Vert A \Vert \Vert A^{-1} \Vert}{1 - \|A\|\|A^{-1}\|\frac{\|\Delta A\|}{\|A\|}} \Big(\frac{\Vert\Delta A\Vert}{\Vert A \Vert} + \frac{\Vert \Delta f \Vert}{ \Vert f \Vert}\Big) \equiv \\ \equiv &\frac{\mathrm{cond}(A)}{1 - \mathrm{cond}(A)\frac{\|\Delta A\|}{\|A\|}} \Big(\frac{\Vert\Delta A\Vert}{\Vert A \Vert} + \frac{\Vert \Delta f \Vert}{ \Vert f \Vert}\Big) \end{split} $$
The crucial role is played by the condition number $\mathrm{cond}(A) = \Vert A \Vert \Vert A^{-1} \Vert$.
The larger the condition number, the less number of digits we can recover. Note, that the condition number is different for different norms.
Note, that if $\Delta A = 0$, then $$ \frac{\Vert \widehat{x} - x \Vert}{\Vert x \Vert} \leq \mathrm{cond}(A) \frac{\|\Delta f\|}{\|f\|} $$
The spectral norm of the matrix is equal to largest singular value, and the singular values of the inverse matrix are equal to the inverses of the singular values. Thus, the condition number is equal to the ratio of the largest singular value and the smallest singular value. $$ \mathrm{cond}_2 (A) = \|A\|_2 \|A^{-1}\|_2 = \frac{\sigma_{\max}}{\sigma_{\min}} $$
We can also try to test how tight is the estimate, both with ones in the right-hand side, and with a random vector in the right-hand side. The results are strickingly different
import numpy as np
import matplotlib.pyplot as plt
%matplotlib inline
n = 1000
a = [[1.0/(i + j + 1) for i in xrange(n)] for j in xrange(n)]
a = np.array(a)
rhs = np.ones(n) #Right-hand side
f = np.linalg.solve(a, rhs)
#And check if everything is fine
er = np.linalg.norm(a.dot(f) - rhs) / np.linalg.norm(rhs)
cn = np.linalg.cond(a, 2)
print 'Error:', er, 'Condition number:', cn
Error: 8.96141017158e-08 Condition number: 1.5912638327e+20
And with random right-hand side...
import numpy as np
import matplotlib.pyplot as plt
%matplotlib inline
n = 100
a = [[1.0/(i + j + 1) for i in xrange(n)] for j in xrange(n)]
a = np.array(a)
rhs = np.random.randn(n) #Right-hand side
f = np.linalg.solve(a, rhs)
#And check if everything is fine
er = np.linalg.norm(a.dot(f) - rhs) / np.linalg.norm(rhs)
cn = np.linalg.cond(a)
print 'Error:', er, 'Condition number:', cn
u, s, v = np.linalg.svd(a)
rhs = np.random.randn(n)
plt.plot(u.T.dot(rhs))
Error: 18.4579334118 Condition number: 3.33972881047e+19
[<matplotlib.lines.Line2D at 0x117fd20d0>]
** Can you think about an explanation?**
Important class of problems are overdetermined linear systems, when the number of equations is greater, than the number of unknowns. The simplest example that you all know, is linear fitting, fitting a set of 2D points by a line.
Then, a typical way is to minimize the residual (least squares)
$$\Vert A x - b \Vert_2 \rightarrow \min$$The optimality condition is $0\equiv \delta \left(\|Ax-b\|_2^2\right)$, where $\delta$ denotes variation. Therefore,
$$ \begin{split} 0\equiv \delta \left(\|Ax-b\|_2^2\right) =\delta \left(Ax-b, Ax - b\right) = (A\delta x, Ax-b)+ (Ax-b, A\delta x) = 2(A x - b, A \delta x) = 2(A^*(A x - b), \delta x) = 0, \end{split} $$for any $\delta x$. Here we used, that $\delta(Ax-b)=\delta x$ ($A$ is linear operator and $b$ is constant) and $(x,Ay) \equiv (A^*x, y)$. Thus, $$ \quad A^* A x = A^* b $$ The matrix $A^* A$ is called Gram matrix and the system is called normal equations.
This is not a good way to do it, since the condition number of $A^* A$ is a square of condition number of $A$.
A canonical way is to use QR-factorization:
any matrix can be factored into a product
$$A = Q R, $$where $Q$ is unitary, and $R$ is upper triangular (details in the next lectures).
Then, finding optimal $x$ is equivalent to solving $Rx = Q^* b$.
Instead of solving $A^* A x = A^* b$,
we introduce a new variable $r = Ax - b$ and then have
$$A^* r = 0, \quad r = Ax - b,$$or in the block form
$$ \begin{bmatrix} 0 & A^* \\ A & -I \end{bmatrix} \begin{bmatrix} x \\ r \end{bmatrix} = \begin{bmatrix} 0 \\ b \end{bmatrix}, $$the total size of the system is $(n + m)$ square, and the condition number is the same as for $A$ (by the way, how we define the condition number of a rectangular matrix?)
The solution to the linear least squares problem can be written as $$x = A^{\dagger} b.$$
The matrix $$A^{\dagger} = \lim_{\alpha \rightarrow 0}(\alpha I + A^* A)^{-1} A^*$$ is called Moore-Penrose pseudoinverse of the matrix $A$.
If matrix $A$ has full column rank, then $A^* A$ is non-singular and we get $A^{\dagger} = \lim_{\alpha \rightarrow 0}(\alpha I + A^* A)^{-1} A^* = (A^* A)^{-1} A^*$.
If matrix $A$ is squared and non-singular we get $A^{\dagger} = \lim_{\alpha \rightarrow 0}(\alpha I + A^* A)^{-1} A^* = (A^* A)^{-1} A^* = A^{-1} A^{-*} A^* = A^{-1}$ - standard inverse of $A$
If $A$ has linearly dependent columns, then $A^\dagger b$ gives solution that has minimal euclidean norm
Let $A = U \Sigma V^*$ be the SVD of $A$. Then,
$$A^{\dagger} = V \Sigma^{\dagger} U^*,$$where $\Sigma^{\dagger}$ consists of inverses of non-zero singular values of $A$. Indeed,
$$A^{\dagger} = \lim_{\alpha \rightarrow 0}(\alpha I + A^* A)^{-1} A^* = \lim_{\alpha \rightarrow 0}( \alpha VV^* + V \Sigma^2 V^*)^{-1} V \Sigma U^* = \lim_{\alpha \rightarrow 0}( V(\alpha I + \Sigma^2) V^*)^{-1} V \Sigma U^* = V \lim_{\alpha \rightarrow 0}(\alpha I + \Sigma^2)^{-1} \Sigma U^* = V \Sigma^{\dagger} U^*,$$Thus, the condition number for the euclidean norm is still just the ratio of largest and smallest non-zero singular values.
Consider a two-dimensional example. Suppose we have a linear model $$y = ax + b$$ and noisy data $(x_1, y_1), \dots (x_n, y_n)$. Then the linear system on coefficients will look as follows $$ \begin{split} a x_1 &+ b &= y_1 \\ &\vdots \\ a x_n &+ b &= y_n \\ \end{split} $$ or in a matrix form $$ \begin{pmatrix} x_1 & 1 \\ \vdots & \vdots \\ x_n & 1 \\ \end{pmatrix} \begin{pmatrix} a \\ b \end{pmatrix} = \begin{pmatrix} y_1 \\ \vdots \\ y_n \\ \end{pmatrix}, $$ which represents overdetermined system.
%matplotlib inline
import numpy as np
import matplotlib.pyplot as plt
a_exact = 1.
b_exact = 2.
n = 10
xi = np.arange(n)
yi = a_exact * xi + b_exact + 2*np.random.random(n)
A = np.array([xi, np.ones(n)])
coef = np.linalg.pinv(A).T.dot(yi) # coef is [a, b]
plt.xkcd()
plt.plot(xi, yi, 'o', label='$(x_i, y_i)$')
plt.plot(xi, coef[0]*xi + coef[1], label='Least Squares')
plt.legend(loc='best')
<matplotlib.legend.Legend at 0x11087ec90>
A typical 3D-problem requires a $100 \times 100 \times 100$ discretization
This gives a linear system with $10^6$ unknowns, right hand side takes $8$ megabytes of memory.
This matrix has $10^6 \times 10^6 = 10^{12}$ elements, takes $8$ terabytes of memory.
Fortunately, the matrices in real-life are not dense, but have certain structure:
from IPython.core.display import HTML
def css_styling():
styles = open("./styles/custom.css", "r").read()
return HTML(styles)
css_styling()