time series fitting to statistical moments

3 views (last 30 days)
Paolo
Paolo on 14 Feb 2025
Answered: Star Strider on 14 Feb 2025
Hello,
I have a process for which I know the conditional moments:
mean = exp(-a * t)*(x-mu)
variance = ((1-exp(-2* t* a))* sigma)/2a
where a and sigma are unknown parameters.
By using the fact that conditional moments are linear, I would like to estimate the 2 unknown parameters through a linear regression of X(t+dt) and X^2(t+dt) on X(t) where X(t) is a known time series that I have, and dt is the time interval used in the time series.
Any idea about how to implement this in matlab code, would be really appreciated.
Thanks
Best regards
Paolo
  2 Comments
Sam Chak
Sam Chak on 14 Feb 2025
Hi @Paolo, could you at least provide the data for visualization in MATLAB?
Paolo
Paolo on 14 Feb 2025
Hi Sam, here the data attached.
thanks for help
Paolo

Sign in to comment.

Sign in to answer this question.

Answers (1)

Star Strider
Star Strider on 14 Feb 2025
Ran in:
where a and sigma are unknown parameters
Beyond that, I am clueless as to any appropriate way to do this parameter estimation, since there is a significant amount of missing information.
Using my fertile imagination to fill those gaps, try something like tthis —
LD = load('cds.mat');
X = LD.spread; % The ‘X’ Part
X = X(:);
Size_X = size(X)
Size_X = 1×2
2219 1
<mw-icon class=""></mw-icon>
<mw-icon class=""></mw-icon>
t = 0:numel(X)-1; % Undefined, So A Guess
t = t(:);
mu = mean(X) % Undefined, So A Guess
mu = 0.0425
dt = randi([2 10])
dt = 4
Xmm = movmean(X,dt); % Use ‘movmean’ To Provide The ‘(X(t+dt)’ Mean
Xmv = movvar(X,dt); % Use ‘movvar’ To Provide The ‘(X(t+dt)’ Variance
fcn = @(b,x) [exp(-b(1) .* t).*(x-mu), ((1-exp(-2 * t .* b(1)) .* b(2))./(2*b(1)))] % b(1) = a, b(2) = sigma
fcn = function_handle with value:
@(b,x)[exp(-b(1).*t).*(x-mu),((1-exp(-2*t.*b(1)).*b(2))./(2*b(1)))]
[B, fv] = fminsearch(@(b) norm([Xmm(:) Xmv(:)] - fcn(b,X(:))), rand(2,1) );
FinalValue = fv
FinalValue = 2.1505
fprintf('\n\nParameters:\n\ta \t= %10.3f\n\tsigma \t= %10.3f\n\n', B)
Parameters: a = 2782.231 sigma = 2162.584
figure
plot(t, X, DisplayName="X(t)")
hold on
plot(t, Xmm, DisplayName="movmean(X)")
hold off
grid
xlabel("Time")
ylabel("Value")
legend(Location='best')
X = X.^2; % The 'X²' Part
Xmm = movmean(X,dt); % Use ‘movmean’ To Provide The ‘(X(t+dt)’ Mean
Xmv = movvar(X,dt); % Use ‘movvar’ To Provide The ‘(X(t+dt)’ Variance
fcn = @(b,x) [exp(-b(1) .* t).*(x-mu), ((1-exp(-2 * t .* b(1)) .* b(2))./(2*b(1)))] % b(1) = a, b(2) = sigma
fcn = function_handle with value:
@(b,x)[exp(-b(1).*t).*(x-mu),((1-exp(-2*t.*b(1)).*b(2))./(2*b(1)))]
[B, fv] = fminsearch(@(b) norm([Xmm(:) Xmv(:)] - fcn(b,X(:))), rand(2,1) );
FinalValue = fv
FinalValue = 0.1420
fprintf('\n\nParameters:\n\ta \t= %10.3f\n\tsigma \t= %10.3f\n\n', B)
Parameters: a = 525.128 sigma = 109.864
figure
plot(t, X, DisplayName="X(t)^2")
hold on
plot(t, Xmm, DisplayName="movmean(X^2)")
hold off
grid
xlabel("Time")
ylabel("Value")
legend(Location='best')
.

Categories

Find more on Linear and Nonlinear Regression in Help Center and File Exchange

Tags

Products


Release

R2024b

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!