LibraryReExportIsNPComplete
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The problem of satisfying a logic formula remains '''NP'''-complete even if all expressions are written in ''[[wikipedia::conjunctive normal form]]'' with 3 variables per clause (3-CNF), yielding the '''3SAT''' problem. This means the expression has the form: | The problem of satisfying a logic formula remains '''NP'''-complete even if all expressions are written in ''[[wikipedia::conjunctive normal form]]'' with 3 variables per clause (3-CNF), yielding the '''3SAT''' problem. This means the expression has the form: | ||
| - | :<math>(x_{11} \ | + | :<math>(x_{11} \vee x_{12} \vee x_{13}) \wedge </math> |
| - | :<math>(x_{21} \ | + | :<math>(x_{21} \vee x_{22} \vee x_{23}) \wedge </math> |
| - | :<math>(x_{31} \ | + | :<math>(x_{31} \vee x_{32} \vee x_{33}) \wedge </math> |
:<math>...</math> | :<math>...</math> | ||
| - | :<math>(x_{n1} \ | + | :<math>(x_{n1} \vee x_{n2} \vee x_{n3})</math> |
where each <math>x_{ab}</math> is a variable <math>v_i</math> or a negation of a variable <math>\neg v_i</math>. Each variable <math>v_i</math> can appear multiple times in the expression. | where each <math>x_{ab}</math> is a variable <math>v_i</math> or a negation of a variable <math>\neg v_i</math>. Each variable <math>v_i</math> can appear multiple times in the expression. | ||
Revision as of 10:34, 25 May 2008
This page describes a way to convert any wikipedia::3SAT problem to a solution of finding the right configuration from conflicting libraries in a system that can re-export APIs. Thus proving that the later problem is wikipedia::NP-complete.
wikipedia::3SAT
The problem of satisfying a logic formula remains NP-complete even if all expressions are written in wikipedia::conjunctive normal form with 3 variables per clause (3-CNF), yielding the 3SAT problem. This means the expression has the form:
- Failed to parse (unknown error): (x_{11} \vee x_{12} \vee x_{13}) \wedge
- Failed to parse (unknown error): (x_{21} \vee x_{22} \vee x_{23}) \wedge
- Failed to parse (unknown error): (x_{31} \vee x_{32} \vee x_{33}) \wedge
- Failed to parse (unknown error): ...
- Failed to parse (unknown error): (x_{n1} \vee x_{n2} \vee x_{n3})
where each Failed to parse (unknown error): x_{ab}
is a variable Failed to parse (unknown error): v_i or a negation of a variable Failed to parse (unknown error): \neg v_i
. Each variable Failed to parse (unknown error): v_i
can appear multiple times in the expression.
Module Dependencies Problem
Let Failed to parse (unknown error): A, B, C, ...
denote an API.
Let Failed to parse (unknown error): A_1, A_{1.1}, A_{1.7}, A_{1.11}
denote compatible versions of API Failed to parse (unknown error): A
.
Let Failed to parse (unknown error): A_1, A_{2.0}, A_{3.1}
denote incompatible versions of API Failed to parse (unknown error): A
.
Let Failed to parse (unknown error): A_{x.y} > B_{u.v}
denote the fact that version x.y of API A depends on version u.v of API B.
Let Failed to parse (unknown error): A_{x.y} \gg B_{u.v}
denote the fact that version x.y of API A depends on version u.v of API B and that B re-exports its elements.
Let Repository Failed to parse (unknown error): R=(M,D)
be any set of modules with their various versions and their dependencies on other modules with or without re-export.
Let C be a Configuration in a repository Failed to parse (unknown error): R=(M,D) , if Failed to parse (unknown error): C \subseteq M , where following is satisfied:
- Failed to parse (unknown error): \forall A_{x.y} \in C, \forall A_{x.y} \gg B_{u.v} \in D \Rightarrow \exists w >= v \wedge B_{u.w} \in C
- each re-exported dependency is satisfied with some compatible version
- Failed to parse (unknown error): \forall A_{x.y} \in C, \forall A_{x.y} > B_{u.v} \in D \Rightarrow \exists w >= v B_{u.w} \in C
- each dependency is satisfied with some compatible version
- Let there be two chains of re-exported dependencies Failed to parse (unknown error): A_{p.q} \gg ... \gg B_{x.y}
and Failed to parse (unknown error): A_{p.q} \gg ... \gg B_{u.v}
then Failed to parse (unknown error): x = u \wedge y = v
- this guarantees that each class has just one, exact meaning for each importer
Module Dependency Problem: Let there be a repository Failed to parse (unknown error): R=(M,D)
and a module Failed to parse (unknown error): A \in M
. Does there exist a configuration Failed to parse (unknown error): C
in the repository Failed to parse (unknown error): R
, such that the module Failed to parse (unknown error): A \in C , e.g. the module can be enabled?
Converstion of wikipedia::3SAT to Module Dependencies Problem
Let there be wikipedia::3SAT formula with with variables Failed to parse (unknown error): v_1, ..., v_m
as defined above.
Let's create a repository of modules Failed to parse (unknown error): R . For each variable Failed to parse (unknown error): v_i
let's create two modules Failed to parse (unknown error): M^i_{1.0}
and Failed to parse (unknown error): M^i_{2.0}
, which are mutually incompatible and put them into repository Failed to parse (unknown error): R .
For each formula Failed to parse (unknown error): (x_{i1} \wedge x_{i2} \wedge x_{i3})
let's create a module Failed to parse (unknown error): F^i
that will have three compatible versions. Each of them will depend on one variable's module. In case the variable is used with negation, it will depend on version 2.0, otherwise on version 1.0. So for the formula
- Failed to parse (unknown error): v_a \vee \neg v_b \vee \neg v_c
we will get:
- Failed to parse (unknown error): F^i_{1.1} \gg M^a_{1.0}
- Failed to parse (unknown error): F^i_{1.2} \gg M^b_{2.0}
- Failed to parse (unknown error): F^i_{1.3} \gg M^c_{2.0}
All these modules and dependencies add into repository Failed to parse (unknown error): R
Now we will create a module Failed to parse (unknown error): T_{1.0}
that depends all formulas:
- Failed to parse (unknown error): T_{1.0} \gg F^1_{1.0}
- Failed to parse (unknown error): T_{1.0} \gg F^2_{1.0}
...
- Failed to parse (unknown error): T_{1.0} \gg F^n_{1.0}
and this module as well as its dependencies into repository Failed to parse (unknown error): R .
Claim: There Failed to parse (unknown error): \exists
a configuration Failed to parse (unknown error): C
of repository Failed to parse (unknown error): R
and Failed to parse (unknown error): T_{1.0} \in C
Failed to parse (unknown error): \Longleftrightarrow
there is a solution to the wikipedia::3SAT formula.
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