## Wednesday, May 6, 2020

### n-queens in Fusion

In a nice post on LinkedIn by Alireza Soroudi the author presents a short GAMS integer model for the classical n-queens puzzle: place the maximal number of non-attacking queens on an $n\times n$ chessboard.

We couldn't resist writing it up in Python Fusion as well.

And here is the solution we get for $n=8$:
[[_ ♕ _ _ _ _ _ _]
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[♕ _ _ _ _ _ _ _]
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[_ _ _ _ ♕ _ _ _]]

## Monday, May 4, 2020

### Grouping in Fusion

We sometimes get asked how to efficiently perform a "group by" operation on a variable. That is, we have a variable $x=(x_0,\ldots,x_{n-1})$ naturally divided into groups and we want to add constraints for each group or constraints on aggregate values within groups. This arises for instance in portfolio optimization where the groups are assets, each consisting of a (varying) number of tax lots.

To keep the discussion more concrete, suppose we have a variable $x=(x_0,x_1,x_2,x_3,x_4,x_5)$ which consists of 3 groups $(x_0,x_1,x_2)$, $(x_3)$ and $(x_4,x_5)$. Let's say we want to express:
• an upper bound $b_i$ on the total value within each group,
• a joint volatility constraint such as $$\gamma\geq\left\|G\cdot \left[\begin{array}{c} x_0+x_1+x_2-i_0 \\ x_3-i_1 \\ x_4+x_5-i_2\end{array}\right]\right\|_2$$ for some matrix $G$ and constant index weights $i_0,i_1,i_2$
• the constraint that all values within one group have the same sign.

Pick, slice
A straightforward solution is to pick (Expr.pick) the content of each group into a separate view and add relevant constraints in a loop over the groups. One could also take slices (Expr.slice) when the groups form contiguous subsequences. This approach is implemented below in Python Fusion.

Loop-free
The previous solution requires picking and stacking expressions in a loop over all groups. This can sometimes be slow. A nicer and more efficient solution uses a bit of linear algebra to perform the grouping. We first encode the groups via a sparse membership matrix $\mathrm{Memb}$, where the rows are groups, columns are entries of $x$, and there is a $1$ whenever an entry belongs to a group. In our example $$\mathrm{Memb}=\left[\begin{array}{cccccc}1&1&1&0&0&0\\0&0&0&1&0&0\\0&0&0&0&1&1\end{array}\right] .$$
This matrix is easy to construct in Fusion.
Note that $\mathrm{Memb}\cdot x$ is the vector of all group sums, in our case $$\mathrm{Memb}\cdot x = \left[\begin{array}{c} x_0+x_1+x_2 \\ x_3 \\ x_4+x_5\end{array}\right].$$
That means we can express both of the previous models in a single call without looping. Since $\mathrm{Memb}$ is very sparse, this becomes a very efficient representation. Of course it is important to keep $\mathrm{Memb}$ as a sparse matrix.
Loop-free same sign
We can now use the same matrix to model the last problem from the introduction: all entries within each group must have the same sign. We introduce a sequence of binary variables $z=(z_0,\ldots,z_{g-1})$, one for each of the $g$ groups. The $j$-th variable will determine the sign of elements in the $j$-th group. That is imposed by constraints $$-M(1-z_j)\leq x_i\leq Mz_j,$$ whenever $x_i$ belongs to $j$-th group. We can use the pick/slice strategy per group, as before, or observe that $\mathrm{Memb}^T\cdot z$ produces the vector with the correct binary variable for each entry in $x$. I our case, if $z=(z_0,z_1,z_2)$ then $$\mathrm{Memb}^T\cdot z = (z_0,z_0,z_0,z_1,z_2,z_2)^T.$$ Now each inequality in (4) can be written as a single constraint:

## Monday, April 6, 2020

### Easter 2020

Support and sales are closed from Thursday, Aptil 9th, until Monday, April 13th, inclusive.

The MOSEK team wishes everyone safe Easter.

## Wednesday, March 11, 2020

### Coronavirus COVID-19

March 11th: As of now Denmark locks down for at least 2 weeks in response to the coronavirus pandemic. In the interest of public health we close the MOSEK physical office and continue working from home. At the moment we don't expect any major disruptions, although small delays in e-mail responses are possible. Thank you in advance for your patience.

March 16th: If you are working from home and for this reason require some special arrangements regarding the license, send us an email to support@mosek.com.

We will update this post if there is important new information.

## Monday, March 9, 2020

### Parametrized Fusion - benchmarks

We present some indicative benchmarks of the new Parametrized Fusion, to be released in MOSEK 9.2. We compare a few typical optimization models being reoptimized in two scenarios:

• the model is constructed from scratch with new data for each optimization, MOSEK version 9.1 (green bars)
• the parametrized model is constructed once and parameters are set before every optimization, MOSEK version 9.2 (blue bars)
The red bar in all cases represents the amount of time spent in the optimizer.

## 1. Markowitz portfolio optimization

Here we consider a simple model
$$\begin{array}{ll}\mbox{maximize} & \mu^T x \\ \mbox{subject to} & e^Tx=1,\\ & \gamma \geq \|Fx\|_2, \\ & x\geq 0, \end{array}$$

where
• $x\in\mathbb{R}^{2000}$,
• $F\in \mathbb{R}^{200\times 2000}$ is a dense matrix,
• $\gamma$ is the only parameter changed between optimizations,
• we resolve the model for 200 values of $\gamma$.
Note that by parametrizing we avoid inputting the same big matrix $F$ over and over again.

## 2. Various models

Next we run a few models implemented in Python only.
• MPC - Model Predictive Control similar as in this demo with 15 states, 8 inputs, horizon length $T=80$, parametrized by the initial state, 100 resolves,
• Polytopes - a geometric polytope containment problem, the parameter is a $3\times 3$ matrix $P$ which enters in many constraints of the form $Px=y$, 1000 resolves.
• Elastic - a linear regression model with main term $\|Ax-b\|_2$, where $A\in\mathbb{R}^{3000\times 100}$ is dense, parametrized by $b\in\mathbb{R}^{3000}$, 60 resolves.
• Option - a big option pricing model with complicated structure and multiple parameters, 10 resolves.

## Tuesday, March 3, 2020

### CVX 2.2 supports exponential cone in MOSEK

New features in CVX!

The last release 2.2 of CVX comes with support for the exponential cone in MOSEK. It means that problems involving log, exp, rel_entr, log_det, kl_div and other variants of logarithms and exponentials will be passed directly to a single MOSEK solve without employing a successive approximation method.

CVX 2.2 also comes bundled with the very recent MOSEK 9.1.9.

For an example of a log_det problem with MOSEK output in CVX 2.2 see:

http://web.cvxr.com/cvx/examples/log_exp/html/sparse_covariance_est.html

(Note, though, that the CVX warning about using the successive approximation method is still displayed, but if your log output consists of a single Mosek solve like above then it can be ignored.)

## Friday, February 28, 2020

### Price list change from June 1st, 2020

Our price list will change from June 1st, 2020. Prices change for the first time since June 2015 and increase on average by 5.4%.

New prices can be found at https://www.mosek.com/sales/prices-from-june-1st-2020/.