selection of graph points

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Dmitry 2023 年 2 月 15 日

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https://jp.mathworks.com/matlabcentral/answers/1913315-selection-of-graph-points

編集済み: Voss 2023 年 2 月 15 日

I have a code that builds level lines for my function of two variables, I need to leave out of these points only those for which the values of 'd' stand apart from each other at a distance of 4.04, i.e. we have a vector of values for points [tv,dv] and we leave in it only the points we need and we are building a schedule. How can this be implemented?

%% initial conditions

% global k0 h_bar ksi m E C_2

Ef = 2.77*10^3;

Kb = physconst('boltzmann'); % 1.38*10^(-23)

m = 9.1093837*10^(-31);

Tc = 1.2;

ksi = 10^(-9);

h_bar = (1.0545726*10^(-34));

k0 = (ksi/h_bar)*sqrt(2.*m.*pi.*Kb.*Tc);

C_2 = 6.81;

t = linspace(0.1, 2,500);

D = linspace(2*10^(-9), 100*10^(-9),500);

d = D./ksi;

%d = linspace(2, 100,500);

%[TT,DD] = meshgrid(t,d);

%contour(TT, DD, @f_calc);

for i=1:numel(d)

for j = 1:numel(t)

F(i,j) = f_calc(t(j),d(i), k0, h_bar, ksi, m, C_2);

end

%plot(t,F)

figure

[c,h] = contour(t,d,F,[0 0]);

xlabel('d')

ylabel('t')

% tv = c(2, 2:end);

% dv = c(1, 2:end);

[tv,dv] = getContour0(c,h);

Levels = 0

Q1 = [size(c); size(tv)]

Q1 = 2×2

2 13404 1 13389

figure

plot(dv, tv, mlbdt.VarName2, mlbdt.VarName1, 'ob');

Unable to resolve the name 'mlbdt.VarName2'.

%scatter(mlbdt.VarName2,mlbdt.VarName1, 'black');

xlabel('d')

ylabel('t')

grid

%mesh(t,d,F)

function F = f_calc(t, d, k0, h_bar, ksi, m, C_2)

% global k0 h_bar ksi m C_2

if 45 <= d && d <= 52

nD = floor(375/(2*pi.*t*1.2) - 0.5)+1;

else

nD = floor(375/(2*pi.*t*1.2) - 0.5);

end

nD = floor(375/(2*pi.*t*1.2) - 0.5);

F = 0;

for k = 0:nD

%F = F + 1/(2*k+1).*(k0.*real(((f_p1(k,t)-f_p2(k,t))./2))+(f_arg_2(k,t,d,k0)-f_arg_1(k,t,d,k0))./d);

F = F + 1/(2*k+1).*imag(f_lg(k,t,d,k0)+1i.*d.*k0.*((f_p1(k,t)-f_p2(k,t))./2)+1i*f_arg_1(k,t,d,k0)-1i*f_arg_2(k,t,d,k0));

end

%F = -F - 6.81;

F = -(1/d).*F - 7.826922968141167;

end

function p1 = f_p1(n,t)

p1 = ((1+1i)./sqrt(2)).*sqrt(t.*(2.*n+1));

end

function p2 = f_p2(n,t)

p2 = sqrt(3601+1i.*t.*(2.*n+1));

end

function arg_1 = f_arg_1(n,t,d,k0)

% global k0

arg_1 = angle(1+exp(-1i.*d*k0.*f_p1(n,t)));

end

function arg_2 = f_arg_2(n,t,d,k0)

% global k0

arg_2 = angle(1+exp(-1i.*d*k0.*f_p2(n,t)));

end

function n_lg = f_lg(n,t,d,k0)

% global k0;

arg_of_lg = (1+exp(-1i.*d.*k0.*f_p1(n,t)))/(1+exp(-1i.*d.*k0.*f_p2(n,t)));

n_lg = log(abs(arg_of_lg));

end

function [xv,yv] = getContour0(M,C) % получение двух выходных значений от функции getContour0

Levels = C.LevelList

for k = 1:numel(Levels)

idx = find(M(1,:) == 0);

ValidV = rem(M(2,idx),1) == 0;

StartIdx{k,:} = idx(ValidV);

VLen{k,:} = M(2,StartIdx{k});

% Q3 = numel(StartIdx{k})

for k1 = 1:numel(StartIdx{k})

% Q4 = StartIdx{k}(k1)

idxv = StartIdx{k}(k1)+1 : StartIdx{k}(k1)+VLen{k}(k1); % Index For Contour 'k1'

xc{k1} = M(1,idxv);

yc{k1} = M(2,idxv);

end

xy = [cell2mat(xc); cell2mat(yc)].'; % .' обменивается индексом строки и столбца для каждого элемента. Транспонирование

xy = sortrows(xy,2);

xv = xy(:,1).';

yv = xy(:,2).';

% figure

% plot(xv, yv, '-r')

% grid

% title('Test Plot')

end

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