I am trying to analyse the impact of error in mean-variance analysis from historical data. In particular, I am trying to calculate average efficient frontiers. I have the returns and standard deviation for the five assets under consideration, as well as the correlation matrix for the five assets. I used the functions mvnrnd to generate the monthly returns and frontcon for the efficient frontier. After generating the returns, I calculate the covariance of these. I run 10,000 simulations.

I have written the function below to do what I need, but it fails on the 150 yrs attempt with the message below. This is the my first time writing anything in MATLAB (which I need to use), so I am not 100% sure of my code. It does produce graphs for the 2 yr and 30 yr time period, but I don't know if the failure of the 150 yr is due to my bad programming or not. In particular I wasn't sure how to calculate the average covariance across the 10,000 simulations. I have searched elsewhere as best I can but if the answer exists out there then I haven't found the correct phrasing to find it. Any help would be greatly appreciated. My code is below the error message.

```
> Warning: Candidate solution is infeasible due to a bad pivot.
> In lcprog>lcprealitycheck at 294
> In lcprog at 251 In qplcprog at 247
> In portopt at 249
> In frontcon at 231 In AverageEfficientFrontiers at 36
> Error using portopt (line 256)
>
> No portfolios satisfy all input constraints for maximum-return
> portfolio. Possibly unbounded problem.
>
> Error in frontcon (line 231) [PRisk, PRoR, PWts] = portopt(ERet,
> ECov, NPts, RTarget, ConSet, ...
>
> Error in AverageEfficientFrontiers (line 36) [Risk, Return, Weights] =
> frontcon(AverageReturn, AverageCovariance, 10);"
function [] = AverageEfficientFrontiers( Years, Simulations )
AssetReturns = [0.006,0.01,0.014,0.018,0.022];
AssetStDev = [0.085,0.08,0.095,0.09,0.1];
CorrelationMatrix = [1,0.3,0.3,0.3,0.3;
0.3,1,0.3,0.3,0.3;
0.3,0.3,1,0.3,0.3;
0.3,0.3,0.3,1,0.3;
0.3,0.3,0.3,0.3,1];
Months = Years*12;
CovarianceMatrix = corr2cov(AssetStDev,CorrelationMatrix);
% Preallocating avoids the need for MATLAB to copy the data from one array
% to another inside the loop
TotalCumulativeReturn = zeros(Simulations,5);
PeriodCovariance = zeros(Simulations,5,5);
for i=1:Simulations
MonthlyReturns = mvnrnd(AssetReturns,CovarianceMatrix,Months);
% If A is a nonempty matrix, then prod(A) treats the columns of A as
% vectors and returns a row vector of the products of each column.
% A(i,:) is the ith row of A.
TotalCumulativeReturn(i,:) = prod(1+MonthlyReturns)-1;
% For matrix input X, where each row is an observation, and each column
% is a variable, cov(X) is the covariance matrix.
% http://www.mathworks.co.uk/help/matlab/ref/cov.html
PeriodCovariance(i,:,:) = cov(MonthlyReturns)*Months;
end
% If A is a nonempty, nonvector matrix, then mean(A) treats the columns of
% A as vectors and returns a row vector whose elements are the mean of each
% column.
AverageReturn = mean(TotalCumulativeReturn);
AverageCovariance = mean(PeriodCovariance);
% http://www.mathworks.co.uk/help/matlab/ref/reshape.html
AverageCovariance = reshape(AverageCovariance, [5,5]);
[Risk, Return, Weights] = frontcon(AverageReturn, AverageCovariance, 10);
plot(Risk, Return);
end
```