# Modelling heteroskedasticity in MATLAB

Trying to set up a simulation of White's test using MCMC: Notably, y=X*beta + e X is N(25, 15) e=N(0, sigma_b) sigma_i=1+alpha(sqrt(x(b)^2) Want to output power of the test. This code breaks and can't work out why. Any suggestions?

``````clear all
T=20; % sample size
alpha=0; % alpha level (controls level of heteroskedasticity)
x=normrnd(25,15,T,1);
X=x;
sigma=1+ diag(alpha*sqrt(diag (x)^2));
beta=1.5;
ind=0;
indprop=0;
for b=1:1000
e(:,b)=normrnd(zeros(T,1),sigma);
y(:,b)=x*beta+e(:,b);
ols(:,b)=(x'*x)^-1*x'*y(:,b);
res(:,b)=y(:,b)-x*ols(:,b);
s(:,b)=res (:,b)'*res (:,b)/T;
varols(:,b)=s(:,b)*(x'*x)^-1;
p(b)=polyfit(x, e(:,b), 1);
efit(b) = polyval(p,x);
eresid(b) = e(:,b) - efit;
SSresid(b) = sum(eresid(b).^2);
SStotal(b) = (length(e(:,b)-1)) * var(e(:,b));
rsq(b) = 1 - SSresid(b)/SStotal(b)
LM(b)=T*rsq(b)
if (LM(b) > 5.991)
ind= ind + 1;
else
ind=ind;
end
end
indprop=ind/1000
``````
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`polyfit` returns two numbers for degree 1, the slope and the y-intercept. Likewise `polyval` returns 20 values, one for each sample. –  s.bandara Nov 8 '13 at 2:53