123 lines
4.8 KiB
TeX
123 lines
4.8 KiB
TeX
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\documentclass{scrartcl}
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\usepackage[utf8]{inputenc}
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\usepackage{graphicx}
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\usepackage{subcaption}
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\usepackage{amsmath}
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\usepackage{pgfplots}
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\pgfplotsset{compat=newest}
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\usetikzlibrary{plotmarks}
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\usetikzlibrary{arrows.meta}
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\usepgfplotslibrary{patchplots}
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\usepackage{grffile}
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\usepackage{amsmath}
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\usepackage{subcaption}
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\usepgfplotslibrary{external}
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\tikzexternalize
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\usepackage[margin=2.5cm]{geometry}
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% To compile:
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% sed -i 's#title style={font=\\bfseries#title style={yshift=1ex, font=\\tiny\\bfseries#' *.tex
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% luatex -enable-write18 -shellescape main.tex
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\pgfplotsset{every x tick label/.append style={font=\tiny, yshift=0.5ex}}
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\pgfplotsset{every title/.append style={font=\tiny, align=center}}
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\pgfplotsset{every y tick label/.append style={font=\tiny, xshift=0.5ex}}
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\pgfplotsset{every z tick label/.append style={font=\tiny, xshift=0.5ex}}
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\setlength{\parindent}{0cm}
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\setlength{\parskip}{0.5\baselineskip}
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\title{Optimization methods -- Homework 2}
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\author{Claudio Maggioni}
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\begin{document}
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\maketitle
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\section{Exercise 1}
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\subsection{Implement the matrix $A$ and the vector $b$, for the moment, without taking into consideration the
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boundary conditions. As you can see, the matrix $A$ is not symmetric. Does an energy function of
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the problem exist? Consider $N = 4$ and show your answer, explaining why it can or cannot exist.}
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Answer is a energy function does not exist. Since A is not symmetric
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(even if it is pd), the minimizer used for the c.g. method
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(i.e. $\frac12 x^T A x - b^T x$ won't work
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since $x^T A x$ might be negative and thus the minimizer does not point to
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the solution of $Ax = b$ necessairly
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\subsection{Once the new matrix has been derived, write the energy function related to the new problem
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and the corresponding gradient and Hessian.}
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we already enforce x(1) = x(n) = 0, since b(1) = b(n) = 0 and thus
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A(1, :) * x = b(0) = 0 and same for n can be solved only for x(1) = x(n)
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= 0size(A, 1)
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The objective is therefore $\phi(x) = (1/2)x^T\overline{A}x - b^x$ with a and b
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defined above, gradient is = $\overline{A}x - b$, hessian is $= \overline{A}$
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\subsection{Write the Conjugate Gradient algorithm in the pdf and implement it Matlab code in a function
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called \texttt{CGSolve}.}
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See page 112 (133 for pdf) for the algorithm implementation
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The solution of this task can be found in Section 1.3 of the script \texttt{main.m}.
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\subsection{Solve the Poisson problem.}
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The solution of this task can be found in Section 1.4 of the script \texttt{main.m}.
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\subsection{Plot the value of energy function and the norm of the gradient (here,
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use semilogy) as functions of the iterations.}
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The solution of this task can be found in Section 1.5 of the script \texttt{main.m}.
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\subsection{Finally, explain why the Conjugate Gradient method is a Krylov subspace method.}
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Because theorem 5.3 holds, which itself holds mainly because of this (5.10, page 106 [127]):
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\[r_{k+1} = r_k + a_k * A * p_k\]
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\section{Exercise 2}
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Consider the linear system $Ax = b$, where the matrix $A$ is constructed in three different ways:
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\begin{itemize}
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\item $A =$ diag([1:10])
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\item $A =$ diag(ones(1,10))
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\item $A =$ diag([1, 1, 1, 3, 4, 5, 5, 5, 10, 10])
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\item $A =$ diag([1.1, 1.2, 1.3, 1.4, 1.5, 1.6, 1.7, 1.8, 1.9, 2.0])
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\end{itemize}
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\subsection{How many distinct eigenvalues has each matrix?}
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Each matrix has a distinct number of eigenvalues equal to the number of distinct
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elements on its diagonal. So, in order, each A has respectively 10, 1, 5, and 10 distinct eigenvalues.
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\subsection{Construct a right-hand side $b=$rand(10,1) and apply the
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Conjugate Gradient method to solve the system for each $A$.}
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The solution of this task can be found in section 2.2 of the \texttt{main.m} MATLAB script.
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\subsection{Compute the logarithm energy norm of the error for each matrix
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and plot it with respect to the number of iteration.}
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The solution of this task can be found in section 2.3 of the \texttt{main.m} MATLAB script.
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\subsection{Comment on the convergence of the method for the different matrices. What can you say observing
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the number of iterations obtained and the number of clusters of the eigenvalues of the related
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matrix?}
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The method converges quickly for each matrix. The fastest convergence surely happens for $A2$, which is
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the identity matrix and therefore makes the $Ax = b$ problem trivial.
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For all the other matrices, we observe the energy norm of the error decreasing exponentially as the iterations
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increase, eventually reaching $0$ for the cases where the method converges exactly (namely on matrices $A1$ and $A3$).
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Other than for the fourth matrix, the number of iterations is exactly equal
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to the number of distinct eigenvalues for the matrix. That exception on the fourth matrix is simply due to the
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tolerance termination condition holding true for an earlier iteration, i.e. we terminate early since we find an
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approximation of $x$ with residual norm below $10^{-8}$.
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\end{document}
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