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comparison +sbp/+implementations/d4_4.m @ 261:6009f2712d13 operator_remake

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Moved and renamned all implementations.
author Martin Almquist <martin.almquist@it.uu.se>
date Thu, 08 Sep 2016 15:35:45 +0200
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children bfa130b7abf6
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260:b4116ce49ac4 261:6009f2712d13
1 function [H, HI, D1, D2, D3, D4, e_1, e_m, M, ...
2 M4,Q, Q3, S2_1, S2_m, S3_1, S3_m, S_1, S_m] = d4_4(m,h)
3
4
5 %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
6 %%% 4:de ordn. SBP Finita differens %%%
7 %%% operatorer framtagna av Ken Mattsson %%%
8 %%% %%%
9 %%% 6 randpunkter, diagonal norm %%%
10 %%% %%%
11 %%% Datum: 2013-11-11 %%%
12 %%% %%%
13 %%% %%%
14 %%% H (Normen) %%%
15 %%% D1 (approx f?rsta derivatan) %%%
16 %%% D2 (approx andra derivatan) %%%
17 %%% D3 (approx tredje derivatan) %%%
18 %%% D2 (approx fj?rde derivatan) %%%
19 %%% %%%
20 %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
21
22 % M?ste ange antal punkter (m) och stegl?ngd (h)
23 % Notera att dessa opetratorer ?r framtagna f?r att anv?ndas n?r
24 % vi har 3de och 4de derivator i v?r PDE
25 % I annat fall anv?nd de "traditionella" som har noggrannare
26 % randsplutningar f?r D1 och D2
27
28 % Vi b?rjar med normen. Notera att alla SBP operatorer delar samma norm,
29 % vilket ?r n?dv?ndigt f?r stabilitet
30
31 H=diag(ones(m,1),0);
32 H_U=[0.35809e5 / 0.100800e6 0 0 0 0 0; 0 0.13297e5 / 0.11200e5 0 0 0 0; 0 0 0.5701e4 / 0.5600e4 0 0 0; 0 0 0 0.45109e5 / 0.50400e5 0 0; 0 0 0 0 0.35191e5 / 0.33600e5 0; 0 0 0 0 0 0.33503e5 / 0.33600e5;];
33
34 H(1:6,1:6)=H_U;
35 H(m-5:m,m-5:m)=fliplr(flipud(H_U));
36 H=H*h;
37 HI=inv(H);
38
39
40 % First derivative SBP operator, 1st order accurate at first 6 boundary points
41
42 q2=-1/12;q1=8/12;
43 Q=q2*(diag(ones(m-2,1),2) - diag(ones(m-2,1),-2))+q1*(diag(ones(m-1,1),1)-diag(ones(m-1,1),-1));
44
45 %Q=(-1/12*diag(ones(m-2,1),2)+8/12*diag(ones(m-1,1),1)-8/12*diag(ones(m-1,1),-1)+1/12*diag(ones(m-2,1),-2));
46
47 Q_U = [0 0.526249e6 / 0.907200e6 -0.10819e5 / 0.777600e6 -0.50767e5 / 0.907200e6 -0.631e3 / 0.28800e5 0.91e2 / 0.7776e4; -0.526249e6 / 0.907200e6 0 0.1421209e7 / 0.2721600e7 0.16657e5 / 0.201600e6 -0.8467e4 / 0.453600e6 -0.33059e5 / 0.5443200e7; 0.10819e5 / 0.777600e6 -0.1421209e7 / 0.2721600e7 0 0.631187e6 / 0.1360800e7 0.400139e6 / 0.5443200e7 -0.8789e4 / 0.302400e6; 0.50767e5 / 0.907200e6 -0.16657e5 / 0.201600e6 -0.631187e6 / 0.1360800e7 0 0.496403e6 / 0.907200e6 -0.308533e6 / 0.5443200e7; 0.631e3 / 0.28800e5 0.8467e4 / 0.453600e6 -0.400139e6 / 0.5443200e7 -0.496403e6 / 0.907200e6 0 0.1805647e7 / 0.2721600e7; -0.91e2 / 0.7776e4 0.33059e5 / 0.5443200e7 0.8789e4 / 0.302400e6 0.308533e6 / 0.5443200e7 -0.1805647e7 / 0.2721600e7 0;];
48 Q(1:6,1:6)=Q_U;
49 Q(m-5:m,m-5:m)=flipud( fliplr( -Q_U ) );
50
51 e_1=zeros(m,1);e_1(1)=1;
52 e_m=zeros(m,1);e_m(m)=1;
53
54
55 D1=HI*(Q-1/2*e_1*e_1'+1/2*e_m*e_m') ;
56
57 %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
58
59
60
61 % Second derivative, 1st order accurate at first 6 boundary points
62 m2=1/12;m1=-16/12;m0=30/12;
63 M=m2*(diag(ones(m-2,1),2)+diag(ones(m-2,1),-2))+m1*(diag(ones(m-1,1),1)+diag(ones(m-1,1),-1))+m0*diag(ones(m,1),0);
64 %M=(1/12*diag(ones(m-2,1),2)-16/12*diag(ones(m-1,1),1)-16/12*diag(ones(m-1,1),-1)+1/12*diag(ones(m-2,1),-2)+30/12*diag(ones(m,1),0));
65 M_U=[0.2386127e7 / 0.2177280e7 -0.515449e6 / 0.453600e6 -0.10781e5 / 0.777600e6 0.61567e5 / 0.1360800e7 0.6817e4 / 0.403200e6 -0.1069e4 / 0.136080e6; -0.515449e6 / 0.453600e6 0.4756039e7 / 0.2177280e7 -0.1270009e7 / 0.1360800e7 -0.3751e4 / 0.28800e5 0.3067e4 / 0.680400e6 0.119459e6 / 0.10886400e8; -0.10781e5 / 0.777600e6 -0.1270009e7 / 0.1360800e7 0.111623e6 / 0.60480e5 -0.555587e6 / 0.680400e6 -0.551339e6 / 0.5443200e7 0.8789e4 / 0.453600e6; 0.61567e5 / 0.1360800e7 -0.3751e4 / 0.28800e5 -0.555587e6 / 0.680400e6 0.1025327e7 / 0.544320e6 -0.464003e6 / 0.453600e6 0.222133e6 / 0.5443200e7; 0.6817e4 / 0.403200e6 0.3067e4 / 0.680400e6 -0.551339e6 / 0.5443200e7 -0.464003e6 / 0.453600e6 0.5074159e7 / 0.2177280e7 -0.1784047e7 / 0.1360800e7; -0.1069e4 / 0.136080e6 0.119459e6 / 0.10886400e8 0.8789e4 / 0.453600e6 0.222133e6 / 0.5443200e7 -0.1784047e7 / 0.1360800e7 0.1812749e7 / 0.725760e6;];
66
67 M(1:6,1:6)=M_U;
68
69 M(m-5:m,m-5:m)=flipud( fliplr( M_U ) );
70 M=M/h;
71
72 S_U=[-0.11e2 / 0.6e1 3 -0.3e1 / 0.2e1 0.1e1 / 0.3e1;]/h;
73 S_1=zeros(1,m);
74 S_1(1:4)=S_U;
75 S_m=zeros(1,m);
76
77 S_m(m-3:m)=fliplr(-S_U);
78
79 D2=HI*(-M-e_1*S_1+e_m*S_m);
80
81
82 %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
83
84
85
86 % Third derivative, 1st order accurate at first 6 boundary points
87
88 q3=-1/8;q2=1;q1=-13/8;
89 Q3=q3*(diag(ones(m-3,1),3)-diag(ones(m-3,1),-3))+q2*(diag(ones(m-2,1),2)-diag(ones(m-2,1),-2))+q1*(diag(ones(m-1,1),1)-diag(ones(m-1,1),-1));
90
91 %QQ3=(-1/8*diag(ones(m-3,1),3) + 1*diag(ones(m-2,1),2) - 13/8*diag(ones(m-1,1),1) +13/8*diag(ones(m-1,1),-1) -1*diag(ones(m-2,1),-2) + 1/8*diag(ones(m-3,1),-3));
92
93
94 Q3_U = [0 -0.88471e5 / 0.67200e5 0.58139e5 / 0.33600e5 -0.1167e4 / 0.2800e4 -0.89e2 / 0.11200e5 0.7e1 / 0.640e3; 0.88471e5 / 0.67200e5 0 -0.43723e5 / 0.16800e5 0.46783e5 / 0.33600e5 -0.191e3 / 0.3200e4 -0.1567e4 / 0.33600e5; -0.58139e5 / 0.33600e5 0.43723e5 / 0.16800e5 0 -0.4049e4 / 0.2400e4 0.29083e5 / 0.33600e5 -0.71e2 / 0.1400e4; 0.1167e4 / 0.2800e4 -0.46783e5 / 0.33600e5 0.4049e4 / 0.2400e4 0 -0.8591e4 / 0.5600e4 0.10613e5 / 0.11200e5; 0.89e2 / 0.11200e5 0.191e3 / 0.3200e4 -0.29083e5 / 0.33600e5 0.8591e4 / 0.5600e4 0 -0.108271e6 / 0.67200e5; -0.7e1 / 0.640e3 0.1567e4 / 0.33600e5 0.71e2 / 0.1400e4 -0.10613e5 / 0.11200e5 0.108271e6 / 0.67200e5 0;];
95
96 Q3(1:6,1:6)=Q3_U;
97 Q3(m-5:m,m-5:m)=flipud( fliplr( -Q3_U ) );
98 Q3=Q3/h^2;
99
100
101
102 S2_U=[2 -5 4 -1;]/h^2;
103 S2_1=zeros(1,m);
104 S2_1(1:4)=S2_U;
105 S2_m=zeros(1,m);
106 S2_m(m-3:m)=fliplr(S2_U);
107
108
109
110 D3=HI*(Q3 - e_1*S2_1 + e_m*S2_m +1/2*S_1'*S_1 -1/2*S_m'*S_m ) ;
111
112 % Fourth derivative, 0th order accurate at first 6 boundary points (still
113 % yield 4th order convergence if stable: for example u_tt=-u_xxxx
114
115 m3=-1/6;m2=2;m1=-13/2;m0=28/3;
116 M4=m3*(diag(ones(m-3,1),3)+diag(ones(m-3,1),-3))+m2*(diag(ones(m-2,1),2)+diag(ones(m-2,1),-2))+m1*(diag(ones(m-1,1),1)+diag(ones(m-1,1),-1))+m0*diag(ones(m,1),0);
117
118 %M4=(-1/6*(diag(ones(m-3,1),3)+diag(ones(m-3,1),-3) ) + 2*(diag(ones(m-2,1),2)+diag(ones(m-2,1),-2)) -13/2*(diag(ones(m-1,1),1)+diag(ones(m-1,1),-1)) + 28/3*diag(ones(m,1),0));
119
120 M4_U=[0.4596181e7 / 0.1814400e7 -0.10307743e8 / 0.1814400e7 0.160961e6 / 0.43200e5 -0.535019e6 / 0.907200e6 0.109057e6 / 0.1814400e7 -0.29273e5 / 0.604800e6; -0.10307743e8 / 0.1814400e7 0.8368543e7 / 0.604800e6 -0.9558943e7 / 0.907200e6 0.2177057e7 / 0.907200e6 -0.11351e5 / 0.86400e5 0.204257e6 / 0.1814400e7; 0.160961e6 / 0.43200e5 -0.9558943e7 / 0.907200e6 0.4938581e7 / 0.453600e6 -0.786473e6 / 0.151200e6 0.1141057e7 / 0.907200e6 -0.120619e6 / 0.907200e6; -0.535019e6 / 0.907200e6 0.2177057e7 / 0.907200e6 -0.786473e6 / 0.151200e6 0.3146581e7 / 0.453600e6 -0.4614143e7 / 0.907200e6 0.24587e5 / 0.14400e5; 0.109057e6 / 0.1814400e7 -0.11351e5 / 0.86400e5 0.1141057e7 / 0.907200e6 -0.4614143e7 / 0.907200e6 0.185709e6 / 0.22400e5 -0.11293343e8 / 0.1814400e7; -0.29273e5 / 0.604800e6 0.204257e6 / 0.1814400e7 -0.120619e6 / 0.907200e6 0.24587e5 / 0.14400e5 -0.11293343e8 / 0.1814400e7 0.16787381e8 / 0.1814400e7;];
121
122 M4(1:6,1:6)=M4_U;
123
124 M4(m-5:m,m-5:m)=flipud( fliplr( M4_U ) );
125 M4=M4/h^3;
126
127 S3_U=[-1 3 -3 1;]/h^3;
128 S3_1=zeros(1,m);
129 S3_1(1:4)=S3_U;
130 S3_m=zeros(1,m);
131 S3_m(m-3:m)=fliplr(-S3_U);
132
133 D4=HI*(M4-e_1*S3_1+e_m*S3_m + S_1'*S2_1-S_m'*S2_m);
134
135
136 % L=h*(m-1);
137 %
138 % x1=linspace(0,L,m)';
139 % x2=x1.^2/fac(2);
140 % x3=x1.^3/fac(3);
141 % x4=x1.^4/fac(4);
142 % x5=x1.^5/fac(5);
143 %
144 % x0=x1.^0/fac(1);
145
146 S_1 = S_1';
147 S2_1 = S2_1';
148 S3_1 = S3_1';
149 S_m = S_m';
150 S2_m = S2_m';
151 S3_m = S3_m';
152
153
154
155 end