linarith
certificate search as an LP problem #
linarith
certificate search can easily be reduced to the following problem:
given the matrix A
and the list strictIndexes
,
find the nonnegative vector v
such that some of its coordinates from
the strictIndexes
are positive and A v = 0
.
The function findPositiveVector
solves this problem.
Algorithm sketch #
We translate the problem stated above to some Linear Programming problem. See
stateLP
for details. Let us denote the corresponding matrixB
.We solve the equation
B x = 0
using Gauss Elimination, splitting the set of variables into free variables, which can take any value, and basic variables which are linearly expressed through the free one. This gives us an initial tableau for the Simplex Algorithm. SeeLinarith.SimplexAlgorithm.Gauss.getTableau
.We run the Simplex Algorithm until it finds a solution. See the file
SimplexAlgorithm.lean
.
Given matrix A
and list strictIndexes
of strict inequalities' indexes, we want to state the
Linear Programming problem which solution would give us a solution for the initial problem (see
findPositiveVector
).
As an objective function (that we are trying to maximize) we use sum of coordinates from
strictIndexes
: it suffices to find the nonnegative vector that makes this function positive.
We introduce two auxiliary variables and one constraint:
- The variable
y
is interpreted as "homogenized"1
. We need it because dealing with a homogenized problem is easier, but having some "unit" is necessary. - To bound the problem we add the constraint
x₁ + ... + xₘ + z = y
introducing new variablez
.
The objective function also interpreted as an auxiliary variable with constraint
f = ∑ i ∈ strictIndexes, xᵢ
.
The variable f
has to always be basic while y
has to be free. Our Gauss method implementation
greedy collects basic variables moving from left to right. So we place f
before x
-s and y
after them. We place z
between f
and x
because in this case z
will be basic and
Gauss.getTableau
produce tableau with nonnegative last column, meaning that we are starting from
a feasible point.
Equations
- One or more equations did not get rendered due to their size.
Instances For
Extracts target vector from the tableau, putting auxilary variables aside (see stateLP
).
Equations
- One or more equations did not get rendered due to their size.
Instances For
Finds a nonnegative vector v
, such that A v = 0
and some of its coordinates from
strictCoords
are positive, in the case such v
exists. If not, throws the error. The latter prevents
linarith
from doing useless post-processing.
Equations
- One or more equations did not get rendered due to their size.