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This example shows how to solve a Mixed-Integer Quadratic Programming (MIQP) portfolio optimization problem using the `intlinprog`

Mixed-Integer Linear Programming (MILP) solver. The idea is to iteratively solve a sequence of MILP problems that locally approximate the MIQP problem. For the problem-based approach, see Mixed-Integer Quadratic Programming Portfolio Optimization: Problem-Based.

As Markowitz showed ("Portfolio Selection," J. Finance Volume 7, Issue 1, pp. 77-91, March 1952), you can express many portfolio optimization problems as quadratic programming problems. Suppose that you have a set of `N`

assets and want to choose a portfolio, with $$x(i)$$ being the fraction of your investment that is in asset $$i$$. If you know the vector $$r$$ of mean returns of each asset, and the covariance matrix $$Q$$ of the returns, then for a given level of risk-aversion $$\lambda $$ you maximize the risk-adjusted expected return:

$$\underset{x}{\mathrm{max}}({r}^{T}x-\lambda {x}^{T}Qx).$$

The `quadprog`

solver addresses this quadratic programming problem. However, in addition to the plain quadratic programming problem, you might want to restrict a portfolio in a variety of ways, such as:

Having no more than

`M`

assets in the portfolio, where`M <= N`

.Having at least

`m`

assets in the portfolio, where`0 < m <= M`

.Having

*semicontinuous*constraints, meaning either $$x(i)=0$$, or $$fmin\le x(i)\le fmax$$ for some fixed fractions $$fmin>0$$ and $$fmax\ge fmin$$.

You cannot include these constraints in `quadprog`

. The difficulty is the discrete nature of the constraints. Furthermore, while the mixed-integer linear programming solver `intlinprog`

does handle discrete constraints, it does not address quadratic objective functions.

This example constructs a sequence of MILP problems that satisfy the constraints, and that increasingly approximate the quadratic objective function. While this technique works for this example, it might not apply to different problem or constraint types.

Begin by modeling the constraints.

$$x$$ is the vector of asset allocation fractions, with $$0\le x(i)\le 1$$ for each $$i$$. To model the number of assets in the portfolio, you need indicator variables $$v$$ such that $$v(i)=0$$ when $$x(i)=0$$, and $$v(i)=1$$ when $$x(i)>0$$. To get variables that satisfy this restriction, set the $$v$$ vector to be a binary variable, and impose the linear constraints

$$v(i)fmin\le x(i)\le v(i)fmax.$$

These inequalities both enforce that $$x(i)$$ and $$v(i)$$ are zero at exactly the same time, and they also enforce that $$fmin\le x(i)\le fmax$$ whenever $$x(i)>0$$.

Also, to enforce the constraints on the number of assets in the portfolio, impose the linear constraints

$$m\le \sum _{i}v(i)\le M.$$

As first formulated, you try to maximize the objective function. However, all Optimization Toolbox™ solvers minimize. So formulate the problem as minimizing the negative of the objective:

$$\underset{x}{\mathrm{min}}\lambda {x}^{T}Qx-{r}^{T}x.$$

This objective function is nonlinear. The `intlinprog`

MILP solver requires a linear objective function. There is a standard technique to reformulate this problem into one with linear objective and nonlinear constraints. Introduce a slack variable $$z$$ to represent the quadratic term.

$$\underset{x,z}{\mathrm{min}}\lambda z-{r}^{T}x\text{suchthat}{x}^{T}Qx-z\le 0,\phantom{\rule{0.5em}{0ex}}z\ge 0.$$

As you iteratively solve MILP approximations, you include new linear constraints, each of which approximates the nonlinear constraint locally near the current point. In particular, for $$x={x}_{0}+\delta $$ where $${x}_{0}$$ is a constant vector and $$\delta $$ is a variable vector, the first-order Taylor approximation to the constraint is

$${x}^{T}Qx-z={x}_{0}^{T}Q{x}_{0}+2{x}_{0}^{T}Q\delta -z+O(|\delta {|}^{2}).$$

Replacing $$\delta $$ by $$x-{x}_{0}$$ gives

$${x}^{T}Qx-z=-{x}_{0}^{T}Q{x}_{0}+2{x}_{0}^{T}Qx-z+O(|x-{x}_{0}{|}^{2}).$$

For each intermediate solution $${x}_{k}$$ you introduce a new linear constraint in $$x$$ and $$z$$ as the linear part of the expression above:

$$-{x}_{k}^{T}Q{x}_{k}+2{x}_{k}^{T}Qx-z\le 0.$$

This has the form $$Ax\le b$$, where $$A=2{x}_{k}^{T}Q$$, there is a $$-1$$ multiplier for the $$z$$ term, and $$b={x}_{k}^{T}Q{x}_{k}$$.

This method of adding new linear constraints to the problem is called a cutting plane method. For details, see J. E. Kelley, Jr. "The Cutting-Plane Method for Solving Convex Programs." J. Soc. Indust. Appl. Math. Vol. 8, No. 4, pp. 703-712, December, 1960.

To express problems for the `intlinprog`

solver, you need to do the following:

Decide what your variables represent

Express lower and upper bounds in terms of these variables

Give linear equality and inequality matrices

Have the first $$N$$ variables represent the $$x$$ vector, the next $$N$$ variables represent the binary $$v$$ vector, and the final variable represent the $$z$$ slack variable. There are $$2N+1$$ variables in the problem.

Load the data for the problem. This data has 225 expected returns in the vector `r`

and the covariance of the returns in the 225-by-225 matrix `Q`

. The data is the same as in the Using Quadratic Programming on Portfolio Optimization Problems example.

```
load port5
r = mean_return;
Q = Correlation .* (stdDev_return * stdDev_return');
```

Set the number of assets as `N`

.

N = length(r);

Set indexes for the variables

xvars = 1:N; vvars = N+1:2*N; zvar = 2*N+1;

The lower bounds of all the `2N+1`

variables in the problem are zero. The upper bounds of the first `2N`

variables are one, and the last variable has no upper bound.

lb = zeros(2*N+1,1); ub = ones(2*N+1,1); ub(zvar) = Inf;

Set the number of assets in the solution to be between 100 and 150. Incorporate this constraint into the problem in the form, namely

$$m\le \sum _{i}v(i)\le M,$$

by writing two linear constraints of the form $$Ax\le b$$:

$$\sum _{i}v(i)\le M$$

$$\sum _{i}-v(i)\le -m.$$

M = 150; m = 100; A = zeros(1,2*N+1); % Allocate A matrix A(vvars) = 1; % A*x represents the sum of the v(i) A = [A;-A]; b = zeros(2,1); % Allocate b vector b(1) = M; b(2) = -m;

Include semicontinuous constraints. Take the minimal nonzero fraction of assets to be `0.001`

for each asset type, and the maximal fraction to be `0.05`

.

fmin = 0.001; fmax = 0.05;

Include the inequalities $$x(i)\le fmax(i)*v(i)$$ and $$fmin(i)*v(i)\le x(i)$$ as linear inequalities.

Atemp = eye(N); Amax = horzcat(Atemp,-Atemp*fmax,zeros(N,1)); A = [A;Amax]; b = [b;zeros(N,1)]; Amin = horzcat(-Atemp,Atemp*fmin,zeros(N,1)); A = [A;Amin]; b = [b;zeros(N,1)];

Include the constraint that the portfolio is 100% invested, meaning $$\sum {x}_{i}=1$$.

```
Aeq = zeros(1,2*N+1); % Allocate Aeq matrix
Aeq(xvars) = 1;
beq = 1;
```

Set the risk-aversion coefficient $$\lambda $$ to `100`

.

lambda = 100;

Define the objective function $$\lambda z-{r}^{T}x$$ as a vector. Include zeros for the multipliers of the $$v$$ variables.

f = [-r;zeros(N,1);lambda];

To solve the problem iteratively, begin by solving the problem with the current constraints, which do not yet reflect any linearization. The integer constraints are in the `vvars`

vector.

options = optimoptions(@intlinprog,'Display','off'); % Suppress iterative display [xLinInt,fval,exitFlagInt,output] = intlinprog(f,vvars,A,b,Aeq,beq,lb,ub,options);

Prepare a stopping condition for the iterations: stop when the slack variable $$z$$ is within 0.01% of the true quadratic value. Set tighter tolerances than default to help ensure that the problem remains strictly feasible as constraints accumulate.

thediff = 1e-4; iter = 1; % iteration counter assets = xLinInt(xvars); % the x variables truequadratic = assets'*Q*assets; zslack = xLinInt(zvar); % slack variable value options = optimoptions(options,'LPOptimalityTolerance',1e-10,'RelativeGapTolerance',1e-8,... 'ConstraintTolerance',1e-9,'IntegerTolerance',1e-6);

Keep a history of the computed true quadratic and slack variables for plotting.

history = [truequadratic,zslack];

Compute the quadratic and slack values. If they differ, then add another linear constraint and solve again.

In toolbox syntax, each new linear constraint $$Ax\le b$$ comes from the linear approximation

$$-{x}_{k}^{T}Q{x}_{k}+2{x}_{k}^{T}Qx-z\le 0.$$

You see that the new row of $$A=2{x}_{k}^{T}Q$$ and the new element in $$b={x}_{k}^{T}Q{x}_{k}$$, with the $$z$$ term represented by a -1 coefficient in $$A$$.

After you find a new solution, use a linear constraint halfway between the old and new solutions. This heuristic way of including linear constraints can be faster than simply taking the new solution. To use the solution instead of the halfway heuristic, comment the "Midway" line below, and uncomment the following one.

while abs((zslack - truequadratic)/truequadratic) > thediff % relative error newArow = horzcat(2*assets'*Q,zeros(1,N),-1); % Linearized constraint rhs = assets'*Q*assets; % right hand side of the linearized constraint A = [A;newArow]; b = [b;rhs]; % Solve the problem with the new constraints [xLinInt,fval,exitFlagInt,output] = intlinprog(f,vvars,A,b,Aeq,beq,lb,ub,options); assets = (assets+xLinInt(xvars))/2; % Midway from the previous to the current % assets = xLinInt(xvars); % Use the previous line or this one truequadratic = xLinInt(xvars)'*Q* xLinInt(xvars); zslack = xLinInt(zvar); history = [history;truequadratic,zslack]; iter = iter + 1; end

Plot the history of the slack variable and the quadratic part of the objective function to see how they converged.

plot(history) legend('Quadratic','Slack') xlabel('Iteration number') title('Quadratic and linear approximation (slack)')

What is the quality of the MILP solution? The `output`

structure contains that information. Examine the absolute gap between the internally-calculated bounds on the objective at the solution.

disp(output.absolutegap)

0

The absolute gap is zero, indicating that the MILP solution is accurate.

Plot the optimal allocation. Use `xLinInt(xvars)`

, not `assets`

, because `assets`

might not satisfy the constraints when using the midway update.

bar(xLinInt(xvars)) grid on xlabel('Asset index') ylabel('Proportion of investment') title('Optimal Asset Allocation')

You can easily see that all nonzero asset allocations are between the semicontinuous bounds $$fmin=0.001$$ and $$fmax=0.05$$.

How many nonzero assets are there? The constraint is that there are between 100 and 150 nonzero assets.

sum(xLinInt(vvars))

ans = 100

What is the expected return for this allocation, and the value of the risk-adjusted return?

fprintf('The expected return is %g, and the risk-adjusted return is %g.\n',... r'*xLinInt(xvars),-fval)

The expected return is 0.000595107, and the risk-adjusted return is -0.0360382.

More elaborate analyses are possible by using features specifically designed for portfolio optimization in Financial Toolbox™. For an example that shows how to use the Portfolio class to directly handle semicontinuous and cardinality constraints, see Portfolio Optimization with Semicontinuous and Cardinality Constraints (Financial Toolbox)**.**