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Theoretical grounds of lambda optimization

Revision en19, by adamant, 2021-12-28 17:51:33

Hi everyone!

This time I'd like to write about what's widely known as "Aliens trick" (as it got popularized after 2016 IOI problem called Aliens). There are already some articles about it here and there, and I'd like to summarize them, while also adding insights into the connection between this trick and generic Lagrange multipliers and Lagrangian duality which often occurs in e.g. linear programming problems.


Lagrange duality

Let $$$f : X \to \mathbb R$$$ be the objective function and $$$g : X \to \mathbb R^c$$$ be the constraint function. The constrained optimization problem

$$$\begin{gather}f(x) \to \min\\ g(x) = 0\end{gather}$$$

in some cases can be reduced to finding stationary points of the Lagrange function

$$$L(x, \lambda) = f(x) - \lambda \cdot g(x).$$$

Here $$$\lambda \cdot g(x)$$$ is the dot product of $$$g(x)$$$ and a variable vector $$$\lambda \in \mathbb R^c$$$, called the Lagrange multiplier. Mathematical optimization typically focuses on finding stationary points of $$$L(x,\lambda)$$$. However, in our particular case we're more interested in the function

$$$t(\lambda) = \inf\limits_{x \in X} L(x,\lambda),$$$

which is called the Lagrange dual function. If $$$x^*$$$ is the solution to the original problem, then $$$t(\lambda) \leq L(x^*,\lambda)=f(x^*)$$$.

This allows to introduce the Lagrangian dual problem $$$t(\lambda) \to \max$$$. Note that $$$t(\lambda)$$$, as a point-wise infimum of concave (specifically, linear) functions, is always concave, even when $$$X$$$ is, e.g., discrete. If $$$\lambda^*$$$ is the solution to the dual problem, the value $$$f(x^*) - t(\lambda^*)$$$ is called the duality gap. We're specifically interested in the case when it equals zero, which is called the strong duality.

Typical example here is Slater's condition, which says that strong duality holds if $$$f(x)$$$ is convex and there exists $$$x$$$ such that $$$g(x)=0$$$.


Change of domain

In competitive programming, the set $$$X$$$ in definitions above is often weird and very difficult to analyze directly, so Slater's condition is not applicable. As a typical example, $$$X$$$ could be the set of all possible partitions of $$$\{1,2,\dots, n\}$$$ into non-intersecting segments.

To mitigate this, we define $$$h(y)$$$ as the minimum value of $$$f(x)$$$ subject to $$$g(x)=y$$$. In this notion, the dual function is written as

$$$t(\lambda) = \inf\limits_{y \in Y} [h(y) - \lambda \cdot y],$$$

where $$$Y=\{ g(x) : x \in X\}$$$. The set $$$Y$$$ is usually much more regular than $$$X$$$, as just by definition it is already a subset of $$$\mathbb R^c$$$. The strong duality condition is also very clear in this terms: it holds if and only if $$$0 \in Y$$$ and there is a $$$\lambda$$$ for which $$$y=0$$$ delivers infimum.

Geometrically $$$t(\lambda)$$$ defines a level at which the epigraph of $$$h(y)$$$, i. e. the set $$$\{(y,z) : z \geq h(y)\}$$$ has a supporting hyperplane with the normal vector $$$(-\lambda, 1)$$$. Indeed, the half-space bounded by such hyperplane on the level $$$c$$$ is defined as

$$$\{(y, z) : z-\lambda \cdot y \geq c\}.$$$

With $$$c=t(\lambda) > -\infty$$$, all the points at which the hyperplane touches the epigraph would correspond to infimum. Please, refer to the picture below. Lower $$$c$$$ would move the hyperplane lower, while higher $$$c$$$ would move it upper. With $$$c=t(\lambda)$$$, the hyperplane is lowest possible while still intersecting the epigraph of the function in the point $$$(y^*, h(y^*))$$$ where $$$y^*$$$ delivers the minimum of $$$h(y) - \lambda \cdot y$$$.

Competitive programming problems typically assume variable $$$y$$$ in the input, so for strong duality to hold for all inputs, all $$$y \in Y$$$ should have a supporting hyperplane that touches the epigraph in the point $$$(y, h(y))$$$. This condition is equivalent to $$$h(y)$$$ being convex on $$$Y$$$.


Monotonicity of $$$y_\lambda$$$

While calculating $$$t(\lambda)$$$, we typically find $$$x_\lambda$$$ that delivers the infimum of $$$f(x) - \lambda \cdot g(x)$$$. But at the same time we find $$$y_\lambda=g(x_\lambda)$$$ that delivers the infimum of $$$h(y) - \lambda \cdot y$$$. As $$$h(y)$$$ is convex, it is also convex component-wise, which means that increasing $$$y_i$$$ would generally require larger values of $$$\lambda_i$$$ in the supporting plane when all the other components of $$$y$$$ are fixed.

We can do a nested binary search on the components of $$$\lambda$$$ to find the $$$\lambda$$$ that corresponds to $$$y=0$$$. The procedure would look like this:

void adjust(double *lmb, int i, int c) {
    if(i == c) {
        return;
    }
    double l = -inf, r = +inf; // some numbers that are large enough
    while(r - l > eps) {
        double m = (l + r) / 2;
        lmb[i] = m;
        adjust(lmb, i + 1, c);
        auto [xl, yl] = solve(lmb); // returns (x_lambda, y_lambda) the minimum y_lambda[i]
        if(yl[k] < 0) {
            l = m;
        } else {
            r = m;
        }
    }
}

Note that a concrete $$$\lambda_i$$$, while other values of $$$\lambda$$$ are fixed, might correspond to the contiguous segment of $$$y_i$$$, thus we need to find the $$$(x_\lambda,y_\lambda)$$$ pair with the minimum possible $$$i$$$-th component of $$$y_\lambda$$$ to guarantee monotonicity, otherwise binary search might work in an unexpected way.

Integer search

What is common for $$$y_i$$$ that correspond to the same $$$\lambda_i$$$? They have the same value of $$$h(y_i) - \lambda_i \cdot y_i$$$.


Problem examples


References

Tags lambda, aliens, tutorial, lagrange, duality

History

 
 
 
 
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en68 English adamant 2023-10-11 00:47:07 8
en67 English adamant 2022-02-13 16:55:43 33
en66 English adamant 2022-01-04 14:57:40 25
en65 English adamant 2022-01-04 05:03:24 6363 + honorable mention
en64 English adamant 2022-01-04 04:20:18 8 articles
en63 English adamant 2022-01-04 04:18:39 354 example 3
en62 English adamant 2022-01-04 04:00:52 748 tldr structured
en61 English adamant 2022-01-04 03:39:52 33
en60 English adamant 2022-01-04 03:38:28 721 example, part 2
en59 English adamant 2022-01-04 03:25:48 784
en58 English adamant 2022-01-04 03:18:14 1414 example
en57 English adamant 2022-01-04 00:21:04 4
en56 English adamant 2022-01-04 00:20:45 570 better code for min_conv
en55 English adamant 2022-01-03 15:20:41 472 clarified tldr
en54 English adamant 2022-01-03 03:37:09 688 code for max-conv of concave functions
en53 English adamant 2022-01-03 01:11:10 43 link
en52 English adamant 2022-01-03 01:07:50 30
en51 English adamant 2022-01-03 01:06:56 12
en50 English adamant 2022-01-03 01:02:56 1815 + example
en49 English adamant 2022-01-02 20:14:13 160 sections in testing convexity
en48 English adamant 2022-01-02 13:29:02 129
en47 English adamant 2022-01-02 13:26:24 104 (published)
en46 English adamant 2022-01-02 13:21:47 3709
en45 English adamant 2022-01-02 12:55:16 690
en44 English adamant 2022-01-02 01:54:22 24
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en30 English adamant 2021-12-29 05:34:22 1201
en29 English adamant 2021-12-29 03:47:08 332
en28 English adamant 2021-12-29 02:45:56 2366
en27 English adamant 2021-12-28 22:09:05 1383
en26 English adamant 2021-12-28 19:28:41 1585
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en20 English adamant 2021-12-28 18:18:48 1224 Tiny change: 'blem\n\n$$f(x)→ming(x)=0f(x)→ming(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en19 English adamant 2021-12-28 17:51:33 66
en18 English adamant 2021-12-28 17:50:21 316 Tiny change: 'blem\n\n$$f(x)→ming(x)=0f(x)→ming(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en17 English adamant 2021-12-28 17:35:06 409 Tiny change: 'blem\n\n$$f(x)→ming(x)=0f(x)→ming(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en16 English adamant 2021-12-28 17:18:07 81 Tiny change: 'blem\n\n$$f(x)→ming(x)=0f(x)→ming(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en15 English adamant 2021-12-28 17:14:07 1049 Tiny change: 'blem\n\n$$f(x)→ming(x)=0f(x)→ming(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en14 English adamant 2021-12-28 16:12:52 96 Tiny change: 'blem\n\n$$f(x)→ming(x)=0f(x)→ming(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en13 English adamant 2021-12-28 16:01:48 338 Tiny change: 'blem\n\n$$f(x)→ming(x)=0f(x)→ming(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en12 English adamant 2021-12-28 15:54:43 903 Tiny change: 'blem\n\n$$f(x)→ming(x)=0f(x)→ming(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en11 English adamant 2021-12-28 04:38:22 2 Tiny change: 'blem\n\n$$f(x)→ming(x)=0f(x)→ming(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en10 English adamant 2021-12-28 04:35:18 118 Tiny change: 'blem\n\n$$f(x)→ming(x)=0f(x)→ming(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en9 English adamant 2021-12-28 04:23:41 1406 Tiny change: 'blem\n\n$$f(x)→ming(x)=0f(x)→ming(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en8 English adamant 2021-12-28 03:18:55 333 Tiny change: 'blem\n\n$$f(x)→ming(x)=0f(x)→ming(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en7 English adamant 2021-12-28 02:59:30 322 Tiny change: 'blem\n\n$$f(x)→ming(x)=0f(x)→ming(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en6 English adamant 2021-12-28 01:40:50 2845 Tiny change: 'blem\n\n$$f(x)→ming(x)=0f(x)→ming(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en5 English adamant 2021-12-27 22:08:35 26 Tiny change: 'blem\n\n$$f(x)→ming(x)=0f(x)→ming(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en4 English adamant 2021-12-26 19:06:11 0 Tiny change: 'blem\n\n$$f(x)→ming(x)=0f(x)→ming(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en3 English adamant 2021-12-26 01:42:07 1888 Tiny change: 'blem\n\n$$f(x)→extrg(x)=0f(x)→extrg(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en2 English adamant 2021-12-25 16:27:58 176 Tiny change: 'blem\n\n$$f(x)→extrg(x)=0f(x)→extrg(x)=0\begin{gat' -> 'blem\n\n$$\begin{gat'
en1 English adamant 2021-12-25 16:21:30 2909 Initial revision (saved to drafts)