NP-intermediate

In computational complexity, problems that are in the complexity class NP but are neither in the class P nor NP-complete are called NP-intermediate, and the class of such problems is called NPI. Ladner's theorem, shown in 1975 by Richard Ladner,^[1] is a result asserting that, if P ≠ NP, then NPI is not empty; that is, NP contains problems that are neither in P nor NP-complete. Since the other direction is trivial, it follows that P = NP if and only if NPI is empty.

Under the assumption that P ≠ NP, Ladner explicitly constructs a problem in NPI, although this problem is artificial and otherwise uninteresting. It is an open question whether any "natural" problem has the same property: Schaefer's dichotomy theorem provides conditions under which classes of constrained Boolean satisfiability problems can not be in NPI.^[2] Some problems that are considered good candidates for being NP-intermediate are the graph isomorphism problem, factoring, and computing the discrete logarithm.^[3]

List of problems that might be NP-intermediate^[4]

Algebra and number theory

• Factoring integers
• Discrete Log Problem and others related to cryptographic assumptions
• Isomorphism problems: Group isomorphism problem, Group automorphism, Ring isomorphism, Ring automorphism
• Determining the result of a comparison between two sums of square roots of integers^[5]
• Numbers in boxes problems^[6]
• The linear divisibility problem^[7]

Boolean logic

• Intersecting Monotone SAT^[8]
• Minimum Circuit Size Problem^[9][10]
• Monotone self-duality^[11]

Computational geometry and computational topology

• Computing the rotation distance^[12] between two binary trees or the flip distance between two triangulations of the same convex polygon
• The turnpike problem^[13] of reconstructing points on line from their distance multiset
• The cutting stock problem with a constant number of object lengths^[14]
• Knot triviality^[15]
• Deciding whether a given triangulated 3-manifold is a 3-sphere
• Gap version of the closest vector in lattice problem^[16]
• Finding a simple closed quasigeodesic on a convex polyhedron^[17]

Game theory

• Determining winner in parity games^[18]
• Determining who has the highest chance of winning a stochastic game^[18]
• Agenda control for balanced single-elimination tournaments^[19]

Graph algorithms

• Graph isomorphism problem
• Planar minimum bisection^[20]
• Deciding whether a graph admits a graceful labeling^[21]
• Clustered planarity^[22]
• Recognizing leaf powers and k-leaf powers^[23]
• Recognizing graphs of bounded clique-width^[24]
• Finding a simultaneous embedding with fixed edges^[25]

Miscellaneous

• Assuming NEXP is not equal to EXP, padded versions of NEXP-complete problems
• Problems in TFNP^[26]
• Pigeonhole subset sum^[27]
• Finding the VC dimension^[28]

References

External links

• Complexity Zoo: Class NPI
• Basic structure, Turing reducibility and NP-hardness
• Lance Fortnow (24 March 2003). "Foundations of Complexity, Lesson 16: Ladner's Theorem". Retrieved 1 November 2013.