Last class

Last class Decision/Optimization 3-SAT Independent-Set Independent-Set  3-SAT P, NP Cook’s Theorem NP-hard, NP-complete 3-SAT  Clique, Subset-Sum, 3-COL

Reductions A  B all reductions we had were: INSTANCE of A  INSTANCE of B (many-to-one reductions) the black-box intuition model allowed more questions to an oracle for B (Turing reductions)

Planar-3-COL INSTANCE: planar graph G QUESTION: can the vertices of G be assigned colors red,green,blue so that no two neighboring vertices have the same color?

3-COL  Planar-3-COL

4-COL INSTANCE: graph G QUESTION: can the vertices of G be assigned one of 4 colors so that no two neighboring vertices have the same color?

3-COL  4-COL  G G

planar 4-COL INSTANCE: planar graph G QUESTION: can the vertices of G be assigned one of 4 colors so that no two neighboring vertices have the same color?

planar 3-COL  planar 4-COL ?

planar 3-COL  planar 4-COL ? planar 4-COL is very easy: the answer is always yes. (4-color theorem, Appel, Haken)

Integer linear-programming INSTANCE: variables x1,...,xn collection of linear inequalities over the xi with integer coefficients QUESTION: does there exist an assignment of integers to the xi such that all the linear inequalities are satisfied?

Integer linear-programming INSTANCE: variables x1,...,xn collection of linear inequalities over the xi with integer coefficients QUESTION: does there exist an assignment of integers to the xi such that all the linear inequalities are satisfied? x1  1 x2  16 x1 x3  16 x2 x4  16 x3 x3+x4+x1  10000

Integer linear-programming we will show that ILP is NP-hard by showing 3-SAT  ILP true = 1, false =0 y1 y2 y3  x1 + (1-x2) + x3 1 0 x1 1 .... 0 xn 1

Integer linear-programming Is integer linear programming NP-complete ? I.e., is ILP in NP ? Witness of solvability = solution, but a priori we do not know that the solution is polynomially bounded. ILP NP, but the proof is far from trivial.

Min-Cut problem cut S  V number of edges crossing the cut | { {u,v} ; u S, v V-S } | INPUT: graph G OUTPUT: cut S with the minimum number of crossing edges

Min-Cut problem in P for each s,t pair run max-flow algorithm

Max-Cut problem cut S  V number of edges crossing the cut | { {u,v} ; u S, v V-S } | INPUT: graph G OUTPUT: cut S with the maximum number of crossing edges

Max-Cut problem INSTANCE: graph G, integer K QUESTION: does G have a cut with  K crossing edges?

Max-Cut problem INSTANCE: graph G, integer K QUESTION: does G have a cut with  K crossing edges? NAE-3-SAT  Max-Cut NAE-3-SAT INSTANCE: 3-CNF formula QUESTION: does there exist an assignment such that every claues have  1 false and  1 true ?

NAE-3-SAT  Max-Cut INSTANCE: 3-CNF formula QUESTION: does there exist an assignment such that every claues have  1 false and  1 true ? 1 vertex for each literal x1 x2 x3 x3 x2 2m parallel edges x1 x2

3-SAT  NAE-3-SAT y1 y2 y3  y1 y2 zi , zi y3 b • C satisfiable  can find 3-NAE assignment for C’ • C’ has 3-NAE assignment  C satisfiable

Is NPco-NP = P ? Factoring INPUT: integer n OUTPUT: factorization of n, i.e., n=p11 ... pkk Factoring – decision version INSTANCE: pair of integers n,k QUESTION: does n have a factor x{2,...k} ?

Last class

Last class

Presentation Transcript

Last Class

Last Class

Last Class

Last class

RECAP LAST CLASS

From Last Class

Last class

Last Class…

From Last Class

Last Class

Last class

Last class -

Last class

Last Class

Last class….

Last Class

Last Class

Last class

Last Class

Last class