Structural complexity theory explained

In computational complexity theory of computer science, the structural complexity theory or simply structural complexity is the study of complexity classes, rather than computational complexity of individual problems and algorithms. It involves the research of both internal structures of various complexity classes and the relations between different complexity classes.[1]

History

The theory has emerged as a result of (still failing) attempts to resolve the first and still the most important question of this kind, the P = NP problem. Most of the research is done basing on the assumption of P not being equal to NP and on a more far-reaching conjecture that the polynomial time hierarchy of complexity classes is infinite.[1]

Important results

The compression theorem

See main article: Compression theorem. The compression theorem is an important theorem about the complexity of computable functions.

The theorem states that there exists no largest complexity class, with computable boundary, which contains all computable functions.

Space hierarchy theorems

See main article: Space hierarchy theorem. The space hierarchy theorems are separation results that show that both deterministic and nondeterministic machines can solve more problems in (asymptotically) more space, subject to certain conditions. For example, a deterministic Turing machine can solve more decision problems in space n log n than in space n. The somewhat weaker analogous theorems for time are the time hierarchy theorems.

Time hierarchy theorems

See main article: Time hierarchy theorem. The time hierarchy theorems are important statements about time-bounded computation on Turing machines. Informally, these theorems say that given more time, a Turing machine can solve more problems. For example, there are problems that can be solved with n2 time but not n time.

Valiant–Vazirani theorem

See main article: Valiant–Vazirani theorem. The Valiant–Vazirani theorem is a theorem in computational complexity theory. It was proven by Leslie Valiant and Vijay Vazirani in their paper titled NP is as easy as detecting unique solutions published in 1986.[2] The theorem states that if there is a polynomial time algorithm for Unambiguous-SAT, then NP=RP.The proof is based on the Mulmuley–Vazirani isolation lemma, which was subsequently used for a number of important applications in theoretical computer science.

Sipser–Lautemann theorem

See main article: Sipser–Lautemann theorem. The Sipser–Lautemann theorem or Sipser–Gács–Lautemann theorem states that Bounded-error Probabilistic Polynomial (BPP) time, is contained in the polynomial time hierarchy, and more specifically Σ2 ∩ Π2.

Savitch's theorem

See main article: Savitch's theorem. Savitch's theorem, proved by Walter Savitch in 1970, gives a relationship between deterministic and non-deterministic space complexity. It states that for any function

f\in\Omega(log(n))

,

NSPACE\left(f\left(n\right)\right)\subseteqDSPACE\left(\left(f\left(n\right)\right)2\right).

Toda's theorem

See main article: Toda's theorem. Toda's theorem is a result that was proven by Seinosuke Toda in his paper "PP is as Hard as the Polynomial-Time Hierarchy" (1991) and was given the 1998 Gödel Prize. The theorem states that the entire polynomial hierarchy PH is contained in PPP; this implies a closely related statement, that PH is contained in P#P.

Immerman–Szelepcsényi theorem

See main article: Immerman–Szelepcsényi theorem. The Immerman–Szelepcsényi theorem was proven independently by Neil Immerman and Róbert Szelepcsényi in 1987, for which they shared the 1995 Gödel Prize. In its general form the theorem states that NSPACE(s(n)) = co-NSPACE(s(n)) for any function s(n) ≥ log n. The result is equivalently stated as NL = co-NL; although this is the special case when s(n) = log n, it implies the general theorem by a standard padding argument. The result solved the second LBA problem.

Research topics

Major directions of research in this area include:[1]

Notes and References

  1. [Juris Hartmanis]
  2. Valiant . L. . Vazirani . V.. 10.1016/0304-3975(86)90135-0 . NP is as easy as detecting unique solutions . . 47 . 85–93 . 1986 . free .