Estimation the parameters of a non-linear equation

12 visualizzazioni (ultimi 30 giorni)
The equation is P =(1-(1-q)*x*m)^(1/(1-q)), where P is probability and x is inter-event time (s), q and m are the parameters that need to be determined.
I have attached the excel file, column A is the 'x' value, column B is the value of 'P'...So I need to determine the best possible q and m in a log-log plot (I have attached a plot in the excel file for your reference where blue line is the drawn plot (P_actual vs x) and orange one is the fitted plot after estimating the parameters (P_calculated vs x)...
There are 21115 values..so you have to first consider the data from 1 to 2000 (Group 1), calculate the q and m for this group..Then take the data from 2 to 20001 (Group 2), calculate the q and m for this group.. and so on..i.e., calculating the parameters for each and every group..U can also increase the group size, this is just an example.
Also, I don't have much idea about the initial guess of the parameters...whenever i give the initial guess it never converges..still for your convenience this is the range 1 < q < 3..and 10 < m < 1000...But one thing is sure 'q' should always be more than 1..
Please help!!

Risposte (2)

Ayush
Ayush il 20 Ago 2024
Hey Kashif,
I understand that you are trying to determine the best-fit parameters ( q ) and ( m ) for your probability equation using MATLAB. This involves fitting the model to subsets of your data iteratively and ensuring convergence of the optimization process.
Here’s a structured approach to achieve this:
To fit the parameters ( q ) and ( m ) for each group of data, we can use "fmincon" function, which is suitable for constrained optimization problems. We will iterate over the data in specified group sizes, perform the optimization for each group, and store the results.
% Load the data from Excel
data = readtable('Parameter_estimation.xlsx');
x_data = data{:, 1};
P_data = data{:, 2};
% Define the model function
model_function = @(params, x) (1 - (1 - params(1)) * x * params(2)) .^ (1 / (1 - params(1)));
% Define the objective function for optimization
objective_function = @(params, x, P) sum((model_function(params, x) - P).^2);
% Define initial guess and bounds
initial_guess = [1.5, 100]; % Example initial guess [q, m]
lb = [1, 10]; % Lower bounds for [q, m]
ub = [3, 1000]; % Upper bounds for [q, m]
% Options for fmincon
options = optimoptions('fmincon', 'Display', 'off', 'MaxFunctionEvaluations', 10000);
% Define the group size
group_size = 2000; % You can adjust this size
% Initialize results storage
results = [];
% Iterate over the data
for start = 1:500:(length(x_data) - group_size + 1)
x_group = x_data(start:start + group_size - 1);
P_group = P_data(start:start + group_size - 1);
% Define a local objective function for the current group
local_objective = @(params) objective_function(params, x_group, P_group);
% Perform the optimization
[params, fval, exitflag] = fmincon(local_objective, initial_guess, [], [], [], [], lb, ub, [], options);
% Check if the optimization converged
if exitflag > 0
results = [results; start, params];
fprintf('Group starting at %d: q = %.4f, m = %.4f, Error = %.4f\n', start, params(1), params(2), fval);
else
fprintf('Fit did not converge for group starting at %d\n', start);
end
end
% Display all results at the end
fprintf('\nSummary of results:\n');
for i = 1:size(results, 1)
fprintf('Group starting at %d: q = %.4f, m = %.4f\n', results(i, 1), results(i, 2), results(i, 3));
end
Note: To improve the efficiency of your parameter fitting with a large dataset, we will increase the step size in our iteration. This means we will skip some data points between each group, allowing the script to run faster while still obtaining a representative fit for each data segment.
For more information on "fmincon" function in MATLAB, refer to the following MathWorks documentation:
Hope this helps !!
Regards
  14 Commenti
Kashif Naukhez
Kashif Naukhez il 20 Ago 2024
Check the sheets 1 and 2..Column A is x, Column B is P_actual and Column C is P_calculated which is calculated using the equation mentioned above..I just change the values of q and m and fit the orange plot to the blue plot. It is very time comsuming as it is based on hit and trial.
I need to find the variation of q with time so i need to see its variation at each and every moment by sliding the window by 1..( 1 to 500, then 2 to 501.. so on until the end, thus forming different groups and estimating the parameters for each group..I have not been able to solve this problem for more than a year..if you could do it, it will be a jackpot for me!!
Thanks in Advance
Kashif Naukhez
Kashif Naukhez il 20 Ago 2024
If we can do it in excel then why not on MATLAB. I would recommend you to forget about forming the groups as of now..Just take entire sheet 1 data as Group 1 and try to estimate q and m just like I did in excel. Later on further groups can be divided.

Accedi per commentare.


Torsten
Torsten il 21 Ago 2024
Modificato: Torsten il 21 Ago 2024
If only reproducing the x-P curve matters, you can use the following code.
If the density of the x-values in certain regions should be used in the fitting process (e.g. to give weights to the measurements that are higher in regions with greater density of x-values), report back.
data = xlsread('Parameter_estimation.xlsx');
x = data(:,1);
P = data(:,2);
[xsort,isort] = sort(x);
Psort = P(isort);
[xsort,ia] = unique(xsort);
Psort = Psort(ia);
xinter = linspace(xsort(1),xsort(end),5000);
Pinter = interp1(xsort,Psort,xinter);
f = @(p)(1 - (1 - p(1)) * xinter * p(2)) .^ (1 / (1 - p(1)));
F = @(p) f(p) - Pinter;
p = lsqnonlin(F,[1.2,450])
Local minimum possible. lsqnonlin stopped because the final change in the sum of squares relative to its initial value is less than the value of the function tolerance.
p = 1x2
1.9855 933.1432
<mw-icon class=""></mw-icon>
<mw-icon class=""></mw-icon>
hold on
plot(xsort,Psort,'r')
plot(xinter,f(p),'b')
hold off
grid on
xlim([0 0.2])
  4 Commenti
Kashif Naukhez
Kashif Naukhez il 10 Set 2024
It is not coming as a smooth curve for other data..Plus it should be in log log scale
Torsten
Torsten il 10 Set 2024
Modificato: Torsten il 10 Set 2024
If the x-values and xinter-values are sorted in ascending or descending order as in the code above, the curve will always come out as "smooth".
And for log-log plot, look up loglog as noted above.

Accedi per commentare.

Categorie

Scopri di più su Linear and Nonlinear Regression in Help Center e File Exchange

Community Treasure Hunt

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

Start Hunting!

Translated by