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Merge pull request #15 from FYS3150-G2-2023/coryab/change-latex-structure

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Coryab/change latex structure
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Cory Balaton 2023-09-07 14:07:13 +02:00 committed by GitHub Enterprise
commit 2e6b2cf6bc
14 changed files with 252 additions and 71 deletions
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latex/assignment_1.pdf
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latex/assignment_1.tex
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\textit{https://github.uio.no/FYS3150-G2-2023/Project-1} \textit{https://github.uio.no/FYS3150-G2-2023/Project-1}
\section*{Problem 1} \input{problems/problem1}
% Do the double integral \input{problems/problem2}
\begin{align*}
u(x) &= \int \int \frac{d^2 u}{dx^2} dx^2\\
&= \int \int -100 e^{-10x} dx^2 \\
&= \int \frac{-100 e^{-10x}}{-10} + c_1 dx \\
&= \int 10 e^{-10x} + c_1 dx \\
&= \frac{10 e^{-10x}}{-10} + c_1 x + c_2 \\
&= -e^{-10x} + c_1 x + c_2
\end{align*}
Using the boundary conditions, we can find $c_1$ and $c_2$ as shown below: \input{problems/problem3}
\begin{align*} \input{problems/problem4}
u(0) &= 0 \\
-e^{-10 \cdot 0} + c_1 \cdot 0 + c_2 &= 0 \\
-1 + c_2 &= 0 \\
c_2 &= 1
\end{align*}
\begin{align*} \input{problems/problem5}
u(1) &= 0 \\
-e^{-10 \cdot 1} + c_1 \cdot 1 + c_2 &= 0 \\
-e^{-10} + c_1 + c_2 &= 0 \\
c_1 &= e^{-10} - c_2\\
c_1 &= e^{-10} - 1\\
\end{align*}
Using the values that we found for $c_1$ and $c_2$, we get \input{problems/problem6}
\begin{align*} \input{problems/problem7}
u(x) &= -e^{-10x} + (e^{-10} - 1) x + 1 \\
&= 1 - (1 - e^{-10}) - e^{-10x}
\end{align*}
\section*{Problem 2} \input{problems/problem8}
% Write which .cpp/.hpp/.py (using a link?) files are relevant for this and show the plot generated. \input{problems/problem9}
\section*{Problem 3}
% Show how it's derived and where we found the derivation.
\section*{Problem 4}
% Show that each iteration of the discretized version naturally creates a matrix equation.
\section*{Problem 5}
\subsection*{a)}
\subsection*{b)}
\section*{Problem 6}
\subsection*{a)}
% Use Gaussian elimination, and then use backwards substitution to solve the equation
\subsection*{b)}
% Figure it out
\section*{Problem 7}
% Link to relevant files on gh and possibly add some comments
\section*{Problem 8}
%link to relvant files and show plots
\section*{Problem 9}
% Show the algorithm, then calculate FLOPs, then link to relevant files
\section*{Problem 10}
% Time and show result, and link to relevant files
\end{document} \end{document}

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latex/problems/problem1.tex Normal file
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\section*{Problem 1}
% Do the double integral
\begin{align*}
u(x) &= \int \int \frac{d^2 u}{dx^2} dx^2\\
&= \int \int -100 e^{-10x} dx^2 \\
&= \int \frac{-100 e^{-10x}}{-10} + c_1 dx \\
&= \int 10 e^{-10x} + c_1 dx \\
&= \frac{10 e^{-10x}}{-10} + c_1 x + c_2 \\
&= -e^{-10x} + c_1 x + c_2
\end{align*}
Using the boundary conditions, we can find $c_1$ and $c_2$ as shown below:
\begin{align*}
u(0) &= 0 \\
-e^{-10 \cdot 0} + c_1 \cdot 0 + c_2 &= 0 \\
-1 + c_2 &= 0 \\
c_2 &= 1
\end{align*}
\begin{align*}
u(1) &= 0 \\
-e^{-10 \cdot 1} + c_1 \cdot 1 + c_2 &= 0 \\
-e^{-10} + c_1 + c_2 &= 0 \\
c_1 &= e^{-10} - c_2\\
c_1 &= e^{-10} - 1\\
\end{align*}
Using the values that we found for $c_1$ and $c_2$, we get
\begin{align*}
u(x) &= -e^{-10x} + (e^{-10} - 1) x + 1 \\
&= 1 - (1 - e^{-10}) - e^{-10x}
\end{align*}

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latex/problems/problem10.tex Normal file
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\section*{Problem 10}
% Time and show result, and link to relevant files

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latex/problems/problem2.tex Normal file
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\section*{Problem 2}
% Write which .cpp/.hpp/.py (using a link?) files are relevant for this and show the plot generated.

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latex/problems/problem3.tex Normal file
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\section*{Problem 3}
% Show how it's derived and where we found the derivation.

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latex/problems/problem4.tex Normal file
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\section*{Problem 4}
% Show that each iteration of the discretized version naturally creates a matrix equation.

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latex/problems/problem5.tex Normal file
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\section*{Problem 5}
\subsection*{a)}
\subsection*{b)}

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latex/problems/problem6.tex Normal file
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\section*{Problem 6}
\subsection*{a)}
% Use Gaussian elimination, and then use backwards substitution to solve the equation
\subsection*{b)}
% Figure it out

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\section*{Problem 7}
% Link to relevant files on gh and possibly add some comments

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\section*{Problem 8}
%link to relvant files and show plots

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\section*{Problem 9}
% Show the algorithm, then calculate FLOPs, then link to relevant files

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#include "GeneralAlgorithm.hpp"
#include <armadillo>
#include <iostream>
double f(double x) {
return 100. * std::exp(-10.*x);
}
double a_sol(double x) {
return 1. - (1. - std::exp(-10)) * x - std::exp(-10*x);
}
int main() {
arma::mat A = arma::eye(3,3);
GeneralAlgorithm ga(3, &A, f, a_sol, 0., 1.);
ga.solve();
std::cout << "Time: " << ga.time(5) << std::endl;
ga.error();
return 0;
}

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#include <armadillo>
#include <cmath>
#include <ctime>
#include <fstream>
#include <iomanip>
#include <ios>
#include <string>
#define TIMING_ITERATIONS 5
arma::vec* general_algorithm(
arma::vec* sub_diag,
arma::vec* main_diag,
arma::vec* sup_diag,
arma::vec* g_vec
)
{
int n = main_diag->n_elem;
double d;
for (int i = 1; i < n; i++) {
d = (*sub_diag)(i-1) / (*main_diag)(i-1);
(*main_diag)(i) -= d*(*sup_diag)(i-1);
(*g_vec)(i) -= d*(*g_vec)(i-1);
}
(*g_vec)(n-1) /= (*main_diag)(n-1);
for (int i = n-2; i >= 0; i--) {
(*g_vec)(i) = ((*g_vec)(i) - (*sup_diag)(i) * (*g_vec)(i+1)) / (*main_diag)(i);
}
return g_vec;
}
arma::vec* special_algorithm(
double sub_sig,
double main_sig,
double sup_sig,
arma::vec* g_vec
)
{
return g_vec;
}
void error(
std::string filename,
arma::vec* x_vec,
arma::vec* v_vec,
arma::vec* a_vec
)
{
std::ofstream ofile;
ofile.open(filename);
if (!ofile.is_open()) {
exit(1);
}
for (int i=0; i < a_vec->n_elem; i++) {
double sub = (*a_vec)(i) - (*v_vec)(i);
ofile << std::setprecision(8) << std::scientific << (*x_vec)(i)
<< std::setprecision(8) << std::scientific << std::log10(std::abs(sub))
<< std::setprecision(8) << std::scientific << std::log10(std::abs(sub/(*a_vec)(i)))
<< std::endl;
}
ofile.close();
}
double f(double x) {
return 100*std::exp(-10*x);
}
void build_array(
int n_steps,
arma::vec* sub_diag,
arma::vec* main_diag,
arma::vec* sup_diag,
arma::vec* g_vec
)
{
sub_diag->resize(n_steps-2);
main_diag->resize(n_steps-1);
sup_diag->resize(n_steps-2);
sub_diag->fill(-1);
main_diag->fill(2);
sup_diag->fill(-1);
g_vec->resize(n_steps-1);
double step_size = 1./ (double) n_steps;
for (int i=0; i < n_steps-1; i++) {
(*g_vec)(i) = f((i+1)*step_size);
}
}
void timing() {
arma::vec sub_diag, main_diag, sup_diag, g_vec;
int n_steps;
std::ofstream ofile;
ofile.open("timing.txt");
// Timing
for (int i=1; i <= 8; i++) {
n_steps = std::pow(10, i);
clock_t g_1, g_2, s_1, s_2;
double g_res = 0, s_res = 0;
for (int j=0; j < TIMING_ITERATIONS; j++) {
build_array(n_steps, &sub_diag, &main_diag, &sup_diag, &g_vec);
g_1 = clock();
general_algorithm(&sub_diag, &main_diag, &sup_diag, &g_vec);
g_2 = clock();
g_res += (double) (g_2 - g_1) / CLOCKS_PER_SEC;
build_array(n_steps, &sub_diag, &main_diag, &sup_diag, &g_vec);
s_1 = clock();
special_algorithm(-1., 2., -1., &g_vec);
s_2 = clock();
s_res += (double) (s_2 - s_1) / CLOCKS_PER_SEC;
}
ofile
<< n_steps << ","
<< g_res / (double) TIMING_ITERATIONS << ","
<< s_res / (double) TIMING_ITERATIONS << std::endl;
}
ofile.close();
}
int main()
{
timing();
}