Merge branch 'master' of git.maggioni.xyz:maggicl/ICS

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Claudio Maggioni (maggicl) 2020-05-26 16:51:55 +02:00
commit 96b281d882
4 changed files with 96 additions and 32 deletions

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@ -1,7 +1,7 @@
%% Assignment 4 %% Assignment 4
% Name: Claudio Maggioni % Name: Claudio Maggioni
% %
% Date: 19/3/2019 % Date: 2020-05-17
% %
% This is a template file for the first assignment to get started with running % This is a template file for the first assignment to get started with running
% and publishing code in Matlab. Each problem has its own section (delineated % and publishing code in Matlab. Each problem has its own section (delineated
@ -11,11 +11,13 @@
% To generate a pdf for submission in your current directory, use the following % To generate a pdf for submission in your current directory, use the following
% three lines of code at the command window: % three lines of code at the command window:
% %
% >> options.format = 'pdf'; options.outputDir = pwd; publish('assignment3.m', options) % >> options.format = 'pdf'; options.outputDir = pwd; publish('assignment4.m', options)
% %
%% Problem 3 %% Problem 3
clear; clear all;
clc;
clf reset;
n=10; n=10;
f = @(x) (exp(-(x^2)/2)/sqrt(2*pi)); f = @(x) (exp(-(x^2)/2)/sqrt(2*pi));
@ -36,12 +38,21 @@ p_10 = computePolypoints(f, xe, x_10, 10);
p_5c = computePolypoints(f, xe, x_5c, 5); p_5c = computePolypoints(f, xe, x_5c, 5);
p_10c = computePolypoints(f, xe, x_10c, 10); p_10c = computePolypoints(f, xe, x_10c, 10);
figure;
subplot(1,2,1);
plot(xe, p_5, xe, p_10, xe, y); plot(xe, p_5, xe, p_10, xe, y);
subplot(1,2,2); figure;
plot(xe, p_5c, xe, p_10c, xe, y); plot(xe, p_5c, xe, p_10c, xe, y);
%% Question 6
y = [-0.0044; -0.0771; -0.2001; -0.3521; -0.3520; 0; 0.5741; 0.8673; ...
0.5741; 0; 0.3520; -0.3521; 0.2001; -0.0771; -0.0213; -0.0044];
figure;
alpha = b3interpolate(y);
x = (0:0.01:16)';
y_c = spline_curve(alpha, x);
plot(x, y_c);
%% Question 3 (continued)
function x = computeEquidistantXs(n) function x = computeEquidistantXs(n)
x = zeros(2*n+1,1); x = zeros(2*n+1,1);
for i = 1:2*n+1 for i = 1:2*n+1
@ -88,3 +99,46 @@ function p = HornerNewton(N, x, xe)
p = p .* (xe - x(i)) + N(i); p = p .* (xe - x(i)) + N(i);
end end
end end
%% Problem 6 (continued)
% assuming x_i = i - 1
function [alpha] = b3interpolate(y)
n = size(y, 1);
A = zeros(n+2);
B = [y; 0; 0];
for x_i = 0:n-1
for j = -1:n
%fprintf("A(%d, %d) = B3(%d - %d)\n", x_i + 1, j+2, x_i, j);
A(x_i + 1, j + 2) = B3(x_i - j);
end
end
A(n+1, 1:3) = [1 -2 1];
A(n+2, n-1:n+1) = [1 -2 1];
alpha = A \ B;
end
function [v] = spline_curve(alpha, x)
n = size(alpha, 1) - 2;
v = zeros(size(x));
for i = 1:size(x,1)
for j = -1:n
v(i) = v(i) + alpha(j + 2) * B3(x(i) - j);
end
end
end
function [y] = B3(x)
y = zeros (size (x));
i1 = find (-2 < x & x < -1);
i2 = find (-1 <= x & x < 1);
i3 = find (1 <= x & x < 2);
y(i1) = 0.5 * (x(i1) + 2) .^ 3;
y(i2) = 0.5 * (3 * abs (x(i2)) .^ 3 - 6 * x(i2) .^ 2 + 4);
y(i3) = 0.5 * (2 - x(i3)) .^ 3;
y = y / 3;
end

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@ -89,7 +89,7 @@ $$y = y (x - x_0) + a_0 = -\frac{23}{6} \cdot 0.5 + 0 = -\frac{23}{12}$$
\section*{Question 4} \section*{Question 4}
\subsection*{Point a)} \subsection*{Point a)}
The node coordinates to which fix the quadratic spline are $(1/2, y_0), (1, y_1),(3/2, y_2),(2, y_3)$. The node coordinates to which fix the quadratic spline are $(1/2, y_0), (3/2, y_1),(5/2, y_2),(7/2, y_3)$.
Then, we can start formulating the equations for the linear system: Then, we can start formulating the equations for the linear system:
@ -100,40 +100,38 @@ $$y_0 = s\left(\frac{1}{2}\right) = a_{-1}B_2\left(\frac{1}{2} + 1\right) + a_{0
+ a_{1}B_2\left(\frac{1}{2} - 5\right)=$$$$ + a_{1}B_2\left(\frac{1}{2} - 5\right)=$$$$
a_{-1} \cdot 0 + a_{0} \cdot \frac{1}{2} + a_{1} \cdot \frac{1}{2} + a_{2} \cdot 0 + a_{-1} \cdot 0 + a_{0} \cdot 0 + a_{1} \cdot 0 = \frac{a_0 + a_1}{2}$$ a_{-1} \cdot 0 + a_{0} \cdot \frac{1}{2} + a_{1} \cdot \frac{1}{2} + a_{2} \cdot 0 + a_{-1} \cdot 0 + a_{0} \cdot 0 + a_{1} \cdot 0 = \frac{a_0 + a_1}{2}$$
$$y_1 = s\left(1\right) = a_{-1}B_2\left(1 + 1\right) + a_{0}B_2\left(1\right) + a_{1}B_2\left(1 - 1\right) + $$$$ $$y_1 = s\left(\frac{3}{2}\right) = a_{-1}B_2\left(\frac{3}{2} + 1\right) + a_{0}B_2\left(\frac{3}{2}\right) + a_{1}B_2\left(\frac{3}{2} - 1\right) + $$$$
+ a_{2}B_2\left(1 - 2\right)
+ a_{-1}B_2\left(1 - 3\right)
+ a_{0}B_2\left(1 - 4\right)
+ a_{1}B_2\left(1 - 5\right)=$$$$
a_{-1} \cdot 0 + a_{0} \cdot \left(\frac{1}{8}\right) + a_{1} \cdot \frac{3}{4} + a_{2} \cdot \left(\frac{1}{8}\right) + a_{-1} \cdot 0 + a_{0} \cdot 0 + a_{1} \cdot 0 =
\frac{1}{8} a_{0} + \frac{3}{4} a_{1} + \frac{1}{8} a_{2}$$
$$y_2 = s\left(\frac{3}{2}\right) = a_{-1}B_2\left(\frac{3}{2} + 1\right) + a_{0}B_2\left(\frac{3}{2}\right) + a_{1}B_2\left(\frac{3}{2} - 1\right) + $$$$
+ a_{2}B_2\left(\frac{3}{2} - 2\right) + a_{2}B_2\left(\frac{3}{2} - 2\right)
+ a_{-1}B_2\left(\frac{3}{2} - 3\right) + a_{-1}B_2\left(\frac{3}{2} - 3\right)
+ a_{0}B_2\left(\frac{3}{2} - 4\right) + a_{0}B_2\left(\frac{3}{2} - 4\right)
+ a_{1}B_2\left(\frac{3}{2} - 5\right)=$$$$ + a_{1}B_2\left(\frac{3}{2} - 5\right)=$$$$
a_{-1} \cdot 0 + a_{0} \cdot 0 + a_{1} \cdot \frac{1}{2} + a_{2} \cdot \frac{1}{2} + a_{-1} \cdot 0 + a_{0} \cdot 0 + a_{1} \cdot 0 = \frac{a_1 + a_2}{2}$$ a_{-1} \cdot 0 + a_{0} \cdot 0 + a_{1} \cdot \frac{1}{2} + a_{2} \cdot \frac{1}{2} + a_{-1} \cdot 0 + a_{0} \cdot 0 + a_{1} \cdot 0 = \frac{a_1 + a_2}{2}$$
$$y_3 = s\left(2\right) = a_{-1}B_2\left(2 + 1\right) + a_{0}B_2\left(2\right) + a_{1}B_2\left(2 - 1\right) + $$$$ $$y_2 = s\left(\frac{5}{2}\right) = a_{-1}B_2\left(\frac{5}{2} + 1\right) + a_{0}B_2\left(\frac{5}{2}\right) + a_{1}B_2\left(\frac{5}{2} - 1\right) + $$$$
+ a_{2}B_2\left(2 - 2\right) + a_{2}B_2\left(\frac{5}{2} - 2\right)
+ a_{-1}B_2\left(2 - 3\right) + a_{-1}B_2\left(\frac{5}{2} - 3\right)
+ a_{0}B_2\left(2 - 4\right) + a_{0}B_2\left(\frac{5}{2} - 4\right)
+ a_{1}B_2\left(2 - 5\right)=$$$$ + a_{1}B_2\left(\frac{5}{2} - 5\right)=$$$$
a_{-1} \cdot 0 + a_{0} \cdot 0 + a_{1} \cdot \left(\frac{1}{8}\right) + a_{2} \cdot \frac{3}{4} + a_{-1} \cdot \left(\frac{1}{8}\right) + a_{0} \cdot 0 + a_{1} \cdot 0 = a_{-1} \cdot 0 + a_{0} \cdot 0 + a_{1} \cdot 0 + a_{2} \cdot \frac{1}{2} + a_{-1} \cdot \frac{1}{2} + a_{0} \cdot 0 + a_{1} \cdot 0 = \frac{a_2 + a_{-1}}{2}$$
\frac{1}{8} a_{1} + \frac{3}{4} a_{2} + \frac{1}{8} a_{-1}$$
$$y_1 = s\left(\frac{7}{2}\right) = a_{-1}B_2\left(\frac{7}{2} + 1\right) + a_{0}B_2\left(\frac{7}{2}\right) + a_{1}B_2\left(\frac{7}{2} - 1\right) + $$$$
+ a_{2}B_2\left(\frac{7}{2} - 2\right)
+ a_{-1}B_2\left(\frac{7}{2} - 3\right)
+ a_{0}B_2\left(\frac{7}{2} - 4\right)
+ a_{1}B_2\left(\frac{7}{2} - 5\right)=$$$$
a_{-1} \cdot 0 + a_{0} \cdot 0 + a_{1} \cdot 0 + a_{2} \cdot 0 + a_{-1} \cdot \frac{1}{2} + a_{0} \cdot \frac{1}{2} + a_{1} \cdot 0 = \frac{a_{-1} + a_0}{2}$$
The linear system in matrix form is: The linear system in matrix form is:
\[\frac{1}{8} \cdot \[\frac{1}{2} \cdot
\begin{bmatrix} \begin{bmatrix}
4&4&0&0\\ 0&1&1&0\\
1&6&1&0\\ 0&0&1&1\\
0&4&4&0\\ 1&0&0&1\\
0&1&6&1\\ 1&1&0&0\\
\end{bmatrix} \end{bmatrix}
\begin{bmatrix} \begin{bmatrix}
a_0\\a_1\\a_2\\a_{-1}\\ a_{-1}\\a_0\\a_1\\a_2\\
\end{bmatrix} \end{bmatrix}
= =
\begin{bmatrix} \begin{bmatrix}
@ -155,9 +153,21 @@ $$y_0 = s(0) = a_{-1}B_2\left(1\right) + a_{0}B_2\left(0\right) + a_{1}B_2\left(
a_{-1} \cdot \frac{1}{8} + a_{0} \cdot \frac{3}{4} + a_{1} \cdot \frac{1}{8} + a_{2} \cdot 0 + a_{-1} \cdot 0 + a_{0} \cdot 0 + a_{1} \cdot 0 = a_{-1} \cdot \frac{1}{8} + a_{0} \cdot \frac{3}{4} + a_{1} \cdot \frac{1}{8} + a_{2} \cdot 0 + a_{-1} \cdot 0 + a_{0} \cdot 0 + a_{1} \cdot 0 =
\frac{1}{8} a_{-1} + \frac{3}{4} a_{0} + \frac{1}{8} a_{1}$$ \frac{1}{8} a_{-1} + \frac{3}{4} a_{0} + \frac{1}{8} a_{1}$$
$$y_1 = s\left(1\right) = \frac{1}{8} a_{0} + \frac{3}{4} a_{1} + \frac{1}{8} a_{2}$$ $$y_1 = s\left(1\right) = a_{-1}B_2\left(1 + 1\right) + a_{0}B_2\left(1\right) + a_{1}B_2\left(1 - 1\right) + $$$$
+ a_{2}B_2\left(1 - 2\right)
+ a_{-1}B_2\left(1 - 3\right)
+ a_{0}B_2\left(1 - 4\right)
+ a_{1}B_2\left(1 - 5\right)=$$$$
a_{-1} \cdot 0 + a_{0} \cdot \left(\frac{1}{8}\right) + a_{1} \cdot \frac{3}{4} + a_{2} \cdot \left(\frac{1}{8}\right) + a_{-1} \cdot 0 + a_{0} \cdot 0 + a_{1} \cdot 0 =
\frac{1}{8} a_{0} + \frac{3}{4} a_{1} + \frac{1}{8} a_{2}$$
$$y_2 = s\left(2\right) = \frac{1}{8} a_{1} + \frac{3}{4} a_{2} + \frac{1}{8} a_{-1}$$ $$y_2 = s\left(2\right) = a_{-1}B_2\left(2 + 1\right) + a_{0}B_2\left(2\right) + a_{1}B_2\left(2 - 1\right) + $$$$
+ a_{2}B_2\left(2 - 2\right)
+ a_{-1}B_2\left(2 - 3\right)
+ a_{0}B_2\left(2 - 4\right)
+ a_{1}B_2\left(2 - 5\right)=$$$$
a_{-1} \cdot 0 + a_{0} \cdot 0 + a_{1} \cdot \left(\frac{1}{8}\right) + a_{2} \cdot \frac{3}{4} + a_{-1} \cdot \left(\frac{1}{8}\right) + a_{0} \cdot 0 + a_{1} \cdot 0 =
\frac{1}{8} a_{1} + \frac{3}{4} a_{2} + \frac{1}{8} a_{-1}$$
$$y_3 = s\left(3\right) = a_{-1}B_2\left(3 + 1\right) + a_{0}B_2\left(3\right) + a_{1}B_2\left(3 - 1\right) + $$$$ $$y_3 = s\left(3\right) = a_{-1}B_2\left(3 + 1\right) + a_{0}B_2\left(3\right) + a_{1}B_2\left(3 - 1\right) + $$$$
+ a_{2}B_2\left(3 - 2\right) + a_{2}B_2\left(3 - 2\right)
@ -184,7 +194,7 @@ a_0\\a_1\\a_2\\a_{-1}\\
y_0\\y_1\\y_2\\y_{3}\\ y_0\\y_1\\y_2\\y_{3}\\
\end{bmatrix}\] \end{bmatrix}\]
\subsection*{Question 5} \section*{Question 5}
$$1 = y_0 = s(x_0) = 0 = a_{-1}B_3(1) +a_0B_3(0) $$1 = y_0 = s(x_0) = 0 = a_{-1}B_3(1) +a_0B_3(0)
+a_1B_3(-1) +a_1B_3(-1)