Support:Documents:Examples:Estimate Change Neurotransmitter
Estimating Input Delay and Rate Constants
This example demonstrates an approach to simultaneously estimating input function delay along with parameters of the 1-tissue compartment (e.g. blood flow) model. For the sake of generality, this could be interpreted as a dynamic contrast-enhanced (DCE) MRI or perfusion PET study.
Example: Estimating Input Delay and Rate Constants
In this example, the model output are assumed to represent measurements of CT. (To keep the example simple, intravascular concentration of tracer is ignored.) The values of the parameters p = [K1; k2; tau] will be estimated.
Step 1 To set the simulation in Matlab, create the above function and put in in a file called DelayExampleInput.m.
Step 2 Create a 1-tissue compartment model
% create new, empty model
cm = compartmentModel;
% define default values for parameters
cm = addParameter(cm, 'k1', 0.3);
cm = addParameter(cm, 'k2', 0.5);
cm = addParameter(cm, 'tau', 0.25);
cm = addParameter(cm, 'sa', 1); % specific activity at t=0
cm = addParameter(cm, 'dk', 0.34); % decay constant
cm = addParameter(cm, 'tau', 0.25); % time delay
% add compartments
cm = addCompartment(cm, 'CT');
cm = addCompartment(cm, 'J');
% define the input(first column is time, second it concentration)
inputData = [
0 0
0.0500 0
0.1000 0
0.1500 14.5234
0.2000 52.1622
0.2500 76.6730
0.3000 91.6416
0.4000 103.0927
0.5000 100.9401
0.7000 83.5343
0.8000 74.3628
1.0000 59.7726
1.2500 48.7530
1.5000 43.0772
1.7500 40.1924
2.0000 38.6236
];
% determine spline coefficients for linear interpolation
ppM = lspline(inputData(:,1), inputData(:,2));
% analytically calculate derivative
[breaks, coefs, l, k, d] = unmkpp(ppM);
ppdMdtau = mkpp(breaks, repmat(k-1:-1:1,d*l,1) .* coefs(:,1:k-1), d);
X = {ppM, ppdMdtau};
cm = addInput(cm, 'Cp','sa','dk', 'DelayExampleInput', 'tau', X);
% connect compartments and inputs
cm = addLink(cm, 'L', 'Cp', 'CT', 'k1');
cm = addLink(cm, 'K', 'CT', 'J', 'k2');
% define the activity concentration in tissue pixel
cm = addOutput(cm, 'TissuePixel', {'CT','1'}, {'Cp','0'});
% specify scan frame times
st = [[0:5:85]' [5:5:90]']/60; % division by 60 converts sec to min
cm = set(cm, 'ScanTime', st);
midScanTime = (st(:,1) + st(:,2)) / 2;
% solve the model and generate the output
[sol,solIndex] = solve(cm);
plot(midScanTime,sol(:,3),'LineWidth',2);
xlabel('Minutes');
ylabel('KBq/ml');
The above figure is the model output (CT). Here, we use it as perfect experimental data that would be fitted.
Step 3 Use model output as measured CT (perfect "data") and fit it
% Set parameters: initial guess, lower and upper bounds for K1, k2 and tau pinit=[0.1;0.2;0.1]; lb =[0.01;0.01;0.01]; ub =[1;1;5]; % specify parameters to be adjusted in fitting cm=addSensitivity(cm,'k1','k2','tau'); % Experimental Data to be fit cm=set(cm,'ExperimentalData',sol(:,3)); % Perform curve fitting [pfit,qfitnull,modelfit,pp1,output]=fitGen(cm,pinit,lb,ub,'OLS');
Step 4 Examine model outputs using estimated parameter (pfit) and initial guess (pinit)
% Solve model using estimated parameters
cm1=cm;
cm1=set(cm1,'ParameterValue','k1',pfit(1));
cm1=set(cm1,'ParameterValue','k2',pfit(2));
cm1=set(cm1,'ParameterValue','tau',pfit(3));
est_sol=solve(cm1);
% solve model using initial parameters
cm1=set(cm1,'ParameterValue','k1',pinit(1));
cm1=set(cm1,'ParameterValue','k2',pinit(2));
cm1=set(cm1,'ParameterValue','tau',pinit(3));
est_sol_init=solve(cm1);
plot(midScanTime,sol(:,3),'o',midScanTime,est_sol(:,3),'r-',midScanTime,est_sol_init(:,3),'g-','LineWidth',2);
xlabel('Minutes');
ylabel('KBq/ml');
legend('Data', 'Fit','Initial Guess');