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{{unsolved|computer science|Does '''NC''' {{=}} '''P''' ?}}
In [[computational complexity theory|complexity theory]], the class '''NC''' (for "Nick's Class") is the set of [[decision problem]]s decidable in [[polylogarithmic time]] on a [[parallel computing|parallel computer]] with a polynomial number of processors. In other words, a problem is in '''NC''' if there exist constants ''c'' and ''k'' such that it can be solved in time ''[[Big O notation|O]]''(log<sup>''c''</sup>&nbsp;''n'') using ''[[Big O notation|O]]''(''n''<sup>''k''</sup>) parallel processors. [[Stephen Cook]] coined the name "Nick's class" after [[Nick Pippenger]],<ref name=AB120>Arora & Barak (2009) p.120</ref> who had done extensive research on circuits with polylogarithmic depth and polynomial size.
 
Just as the class '''[[P (complexity)|P]]''' can be thought of as the tractable problems ([[Cobham's thesis]]), so '''NC''' can be thought of as the problems that can be efficiently solved on a parallel computer.<ref name=AB118>Arora & Barak (2009) p.118</ref> '''NC''' is a subset of '''P''' because polylogarithmic parallel computations can be simulated by polynomial-time sequential ones. It is unknown whether '''NC''' = '''P''', but most researchers suspect this to be false, meaning that there are probably some tractable problems that are "inherently sequential" and cannot significantly be sped up by using parallelism. Just as the class '''[[NP-Complete]]''' can be thought of as "probably intractable", so the class '''[[P-Complete]]''', when using '''NC''' reductions, can be thought of as "probably not parallelizable" or "probably inherently sequential".
 
The parallel computer in the definition can be assumed to be a ''parallel, random-access machine'' ([[parallel random access machine|PRAM]]).  That is a parallel computer with a central pool of memory, and any processor can access any bit of memory in constant time.  The definition of '''NC''' is not affected by the choice of how the PRAM handles simultaneous access to a single bit by more than one processor. It can be CRCW, CREW, or EREW. See [[parallel random access machine|PRAM]] for descriptions of those models.
 
Equivalently, '''NC''' can be defined as those decision problems decidable by a [[Boolean circuit|uniform Boolean circuit]] (which can be calculated from the length of the input) with [[polylogarithmic]] depth and a polynomial number of gates.
 
'''[[RNC (complexity)|RNC]]''' is a class extending '''NC''' with access to randomness.
 
== Problems in NC ==
As with '''P''', by a slight abuse of language, one might classify function problems and search problems as being in '''NC'''. '''NC''' is known to include many problems, including
* Integer addition, multiplication and division;
* Matrix multiplication, determinant, inverse, rank;
* Polynomial GCD, by a reduction to linear algebra using [[Sylvester matrix]] (it is open whether integer GCD is in '''NC''');
* Finding a maximal matching.
 
Often algorithms for those problems had to be separately invented and could not be naïvely adapted from well-known algorithms – Gaussian elimination and Euclidean algorithm rely on operations performed in sequence. One might contrast [[ripple carry adder]] with a [[carry-lookahead adder]].
 
== The NC hierarchy ==
'''NC'''<sup>''i''</sup> is the class of decision problems decidable by uniform boolean circuits with a polynomial number of gates of at most two inputs and depth ''O''(log<sup>''i''</sup>&nbsp;''n''), or the class of decision problems solvable in time ''O''(log<sup>''i''</sup>&nbsp;''n'') on a parallel computer with a polynomial number of processors. Clearly, we have
 
:<math>\mathbf{NC}^1 \subseteq \mathbf{NC}^2 \subseteq \cdots \subseteq \mathbf{NC}^i \subseteq \cdots \mathbf{NC}</math>
 
which forms the '''NC'''-hierarchy.
 
We can relate the '''NC''' classes to the space classes '''[[L (complexity)|L]]''' and '''[[NL (complexity)|NL]]'''<ref>Papadimitriou (1994) Theorem 16.1</ref> and '''[[AC (complexity)|AC]]'''.<ref name=CK437>Clote & Kranakis (2002) p.437</ref>
 
:<math> \mathbf{NC}^1 \subseteq \mathbf{L} \subseteq \mathbf{NL} \subseteq \mathbf{AC}^1 \subseteq \mathbf{NC}^2 \subseteq \mathbf{P}.</math>
 
The NC classes are related to the AC classes, which are defined similarly, but with gates having unbounded fanin.  For each ''i'', we have<ref name=AB118/><ref name="CK437"/>
 
:<math>\mathbf{NC}^i \subseteq \mathbf{AC}^i \subseteq \mathbf{NC}^{i+1}.</math>
 
As an immediate consequence of this, we have that '''NC''' = '''AC'''.<ref name=CK12>Clote & Kranakis (2002) p.12</ref>
It is known that both inclusions are strict for ''i'' = 0.<ref name=AB118/>
 
Similarly, we have that '''NC''' is equivalent to the problems solvable on an [[alternating Turing machine]] restricted to at most two options at each step with ''O''(log ''n'') space and <math>(\log n)^{O(1)}</math> alternations.<ref>{{cite journal|author=S. Bellantoni and I. Oitavem|title=Separating NC along the delta axis|journal=Theoretical Computer Science|volume=318|year=2004|pages=57–78}}</ref>
 
=== Open problem: Is NC proper? ===
One major open question in [[computational complexity theory|complexity theory]] is whether or not every containment in the '''NC''' hierarchy is proper. It was observed by Papadimitriou that, if '''NC'''<sup>''i''</sup> = '''NC'''<sup>''i''+1</sup> for some ''i'', then '''NC'''<sup>''i''</sup> = '''NC'''<sup>''j''</sup> for all ''j''&nbsp;≥&nbsp;''i'', and as a result, '''NC'''<sup>''i''</sup> = '''NC'''. This observation is known as '''NC'''-hierarchy collapse because even a single equality in the chain of containments
:<math>\textbf{NC}^1 \subseteq \textbf{NC}^2 \subseteq \cdots</math>
implies that the entire '''NC''' hierarchy "collapses" down to some level ''i''. Thus, there are 2 possibilities:
 
# <math>\textbf{NC}^1 \subset \cdots \subset \textbf{NC}^i \subset ... \subset \textbf{NC}^{i+j} \subset \cdots \textbf{NC}</math>
# <math>\textbf{NC}^1 \subset \cdots \subset \textbf{NC}^i = ... = \textbf{NC}^{i+j} = \cdots \textbf{NC}</math>
 
It is widely believed that (1) is the case, although no proof as to the truth of either statement has yet been discovered.
 
==Barrington's theorem==
A '''branching program''' with ''n'' variables of width ''k'' and length ''m'' consists of a sequence of ''m'' instructions. Each of the instructions is a tuple (''i'', ''p'', ''q'') where ''i'' is the index of variable to check (1 &le; ''i'' &le; ''n''), and ''p'' and ''q'' are functions from {1, 2, ..., ''k''} to {1, 2, ..., ''k''}. Numbers 1, 2, ..., ''k'' are called states of the branching program. The program initially starts in state 1, and each instruction (''i'', ''p'', ''q'') changes the state from ''x'' to ''p''(''x'') or ''q''(''x''), depending on whether the ''i''th variable is 0 or 1.
 
A family of branching programs consists of a branching program with ''n'' variables for each ''n''.
 
It is easy to show that every language ''L'' on {0,1} can be recognized by a family of branching programs of width 4 and exponential length, or by a family of exponential width and linear length.
 
Every regular language on {0,1} can be recognized by a family of branching programs of constant width and linear number of instructions (since a DFA can be converted to a branching program). '''BWBP''' denotes the class of languages recognizable by a family of branching programs of bounded width and polynomial length.<ref name=CK50>Clote & Kranakis (2002) p.50</ref>
 
'''Barrington's theorem'''<ref name=Bar89>{{cite journal | zbl=0667.68059 | last=Barrington | first=David A. | journal=J. Comput. Syst. Sci. | volume=38 | number=1 | pages=150–164 | year=1989 | issn=0022-0000 | url=http://www.cs.umass.edu/~barring/publications/bwbp.pdf | title=Bounded-Width Polynomial-Size Branching Programs Recognize Exactly Those Languages in '''NC'''<sup>1</sup> }}</ref> says that  is exactly nonuniform '''NC'''<sup>1</sup>. The proof uses the [[solvable group|nonsolvability]] of the symmetric group S<sub>5</sup>.<ref name=CK50/>
 
The theorem is rather surprising. It implies that the majority function can be computed by a family of branching programs of constant width and polynomial size, while intuition might suggest that to achieve polynomial size, one needs a linear number of states.
 
===Proof of Barrington's theorem===
A branching program of constant width and polynomial size can be easily converted (via divide-and-conquer) to a circuit in '''NC'''<sup>1</sup>.
 
Conversely, suppose a circuit in '''NC'''<sup>1</sup> is given. Without loss of generality, assume it uses only AND and NOT gates.
 
Lemma 1: If there exists a branching program that sometimes works as a permutation ''P'' and sometimes as ''Q'', by right-multiplying permutations in the first instruction by α, and in the last instruction left-multiplying by β, we can make a circuit of the same length that behaves as β''P''α or β''Q''α, respectively.
 
Call a branching program α-computing a circuit ''C'' if it works as identity when C's output is 0, and as α when C's output is 1.
 
As a consequence of lemma 1 and the fact that all cycles of length 5 are conjugate, for any two 5-cycles α, β, if there exists a branching program α-computing a circuit ''C'', then there exists a branching program β-computing the circuit ''C'', of the same length.
 
Lemma 2: There exist 5-cycles γ, δ such that their [[commutator]] <math>\gamma \delta \gamma^{-1} \delta^{-1} = \epsilon</math> is a 5-cycle. For example, γ = (1 2 3 4 5), δ = (1 3 5 4 2).
 
We will now prove Barrington's theorem by induction.
 
Assume that for all subcircuits ''D'' of ''C'' and 5-cycles α, there exists a branching program α-computing ''D''. We will show that for all 5-cycles α, there exists a branching program α-computing ''C''.
 
* If the circuit outputs ''x<sub>i</sub>'', the branching program has one instruction checking ''x<sub>i</sub>'' and outputting identity or α respectively.
* If the circuit outputs <math>\neg C</math>, where ''C'' is a different circuit. Create a branching program <math>\alpha^{-1}</math>-computing ''C'', and multiply output of the program (using lemma 1) by α to get a branching program outputting <math>id</math> or α, i.e. α-computing <math>\neg C</math>.
* If the circuit outputs <math>C \wedge D</math>, join the branching programs that <math>\delta^{-1}</math>-compute ''D'', <math>\gamma^{-1} </math>-compute C, δ-compute ''D'', γ-compute C. If one of the circuits outputs 0, the resulting program will be identity; if both circuits output 1, the resulting program will work as ε. In other words, we get a program ε-computing <math>C \wedge D</math>. Because ε and α are two 5-cycles, they are conjugate, and there exists a program α-computing <math>C \wedge D</math>.
 
The size of the branching program is at most <math>4^d</math>, where ''d'' is the depth of the circuit. If the circuit has logarithmic depth, the branching program has polynomial length.
 
==References==
{{reflist}}
* {{cite book | zbl=1193.68112 | last1=Arora | first1=Sanjeev | authorlink1=Sanjeev Arora | last2=Barak | first2=Boaz | title=Computational complexity. A modern approach | publisher=[[Cambridge University Press]] | year=2009 | isbn=978-0-521-42426-4 }}
* {{cite book | last1=Clote | first1=Peter | last2=Kranakis |first2=Evangelos | title=Boolean functions and computation models | series=Texts in Theoretical Computer Science. An EATCS Series | location=Berlin | publisher=[[Springer-Verlag]] | year=2002 | isbn=3-540-59436-1 | zbl=1016.94046 }}
* [http://www.cs.armstrong.edu/greenlaw/research/PARALLEL/limits.pdf Greenlaw, Raymond, James Hoover, and Walter Ruzzo. ''Limits To Parallel computation; P-Completeness Theory''. ISBN 0-19-508591-4]
* {{cite book| first=Dexter C. | last=Kozen | authorlink=Dexter Kozen | year = 1992 | title = The design and analysis of algorithms}} Lectures 28 - 34 and 36
* {{cite book| first=Dexter C. | last=Kozen | authorlink=Dexter Kozen | year = 2006 | title = Theory of Computation | publisher = [[Springer-Verlag]] | isbn = 1-84628-297-7 | zbl=1102.68025 | series=Texts in Computer Science }} Lecture 12: Relation of ''NC'' to Time-Space Classes
* {{cite book| first=Christos | last=Papadimitriou | authorlink=Christos Papadimitriou | year = 1993 | title = Computational Complexity | publisher = Addison Wesley | edition = 1st | isbn = 0-201-53082-1 | chapter = Section 15.3: The class '''NC''' | pages=375–381 }}
* {{cite book | last=Straubing | first=Howard | title=Finite automata, formal logic, and circuit complexity | series=Progress in Theoretical Computer Science | location=Basel | publisher=Birkhäuser | year=1994 | isbn=3-7643-3719-2 | zbl=0816.68086 }}
* {{cite book | last=Vollmer | first=Heribert | title=Introduction to circuit complexity. A uniform approach | series=Texts in Theoretical Computer Science | location=Berlin | publisher=[[Springer-Verlag]] | year=1998 | isbn=3-540-64310-9 | zbl=0931.68055 }}
 
{{ComplexityClasses}}
 
{{DEFAULTSORT:Nc (Complexity)}}
[[Category:Complexity classes]]
[[Category:Circuit complexity]]

Revision as of 21:00, 3 February 2014

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Here is my homepage ... new launch ec In complexity theory, the class NC (for "Nick's Class") is the set of decision problems decidable in polylogarithmic time on a parallel computer with a polynomial number of processors. In other words, a problem is in NC if there exist constants c and k such that it can be solved in time O(logc n) using O(nk) parallel processors. Stephen Cook coined the name "Nick's class" after Nick Pippenger,[1] who had done extensive research on circuits with polylogarithmic depth and polynomial size.

Just as the class P can be thought of as the tractable problems (Cobham's thesis), so NC can be thought of as the problems that can be efficiently solved on a parallel computer.[2] NC is a subset of P because polylogarithmic parallel computations can be simulated by polynomial-time sequential ones. It is unknown whether NC = P, but most researchers suspect this to be false, meaning that there are probably some tractable problems that are "inherently sequential" and cannot significantly be sped up by using parallelism. Just as the class NP-Complete can be thought of as "probably intractable", so the class P-Complete, when using NC reductions, can be thought of as "probably not parallelizable" or "probably inherently sequential".

The parallel computer in the definition can be assumed to be a parallel, random-access machine (PRAM). That is a parallel computer with a central pool of memory, and any processor can access any bit of memory in constant time. The definition of NC is not affected by the choice of how the PRAM handles simultaneous access to a single bit by more than one processor. It can be CRCW, CREW, or EREW. See PRAM for descriptions of those models.

Equivalently, NC can be defined as those decision problems decidable by a uniform Boolean circuit (which can be calculated from the length of the input) with polylogarithmic depth and a polynomial number of gates.

RNC is a class extending NC with access to randomness.

Problems in NC

As with P, by a slight abuse of language, one might classify function problems and search problems as being in NC. NC is known to include many problems, including

  • Integer addition, multiplication and division;
  • Matrix multiplication, determinant, inverse, rank;
  • Polynomial GCD, by a reduction to linear algebra using Sylvester matrix (it is open whether integer GCD is in NC);
  • Finding a maximal matching.

Often algorithms for those problems had to be separately invented and could not be naïvely adapted from well-known algorithms – Gaussian elimination and Euclidean algorithm rely on operations performed in sequence. One might contrast ripple carry adder with a carry-lookahead adder.

The NC hierarchy

NCi is the class of decision problems decidable by uniform boolean circuits with a polynomial number of gates of at most two inputs and depth O(logi n), or the class of decision problems solvable in time O(logi n) on a parallel computer with a polynomial number of processors. Clearly, we have

NC1NC2NCiNC

which forms the NC-hierarchy.

We can relate the NC classes to the space classes L and NL[3] and AC.[4]

NC1LNLAC1NC2P.

The NC classes are related to the AC classes, which are defined similarly, but with gates having unbounded fanin. For each i, we have[2][4]

NCiACiNCi+1.

As an immediate consequence of this, we have that NC = AC.[5] It is known that both inclusions are strict for i = 0.[2]

Similarly, we have that NC is equivalent to the problems solvable on an alternating Turing machine restricted to at most two options at each step with O(log n) space and (logn)O(1) alternations.[6]

Open problem: Is NC proper?

One major open question in complexity theory is whether or not every containment in the NC hierarchy is proper. It was observed by Papadimitriou that, if NCi = NCi+1 for some i, then NCi = NCj for all j ≥ i, and as a result, NCi = NC. This observation is known as NC-hierarchy collapse because even a single equality in the chain of containments

NC1NC2

implies that the entire NC hierarchy "collapses" down to some level i. Thus, there are 2 possibilities:

  1. NC1NCi...NCi+jNC
  2. NC1NCi=...=NCi+j=NC

It is widely believed that (1) is the case, although no proof as to the truth of either statement has yet been discovered.

Barrington's theorem

A branching program with n variables of width k and length m consists of a sequence of m instructions. Each of the instructions is a tuple (i, p, q) where i is the index of variable to check (1 ≤ in), and p and q are functions from {1, 2, ..., k} to {1, 2, ..., k}. Numbers 1, 2, ..., k are called states of the branching program. The program initially starts in state 1, and each instruction (i, p, q) changes the state from x to p(x) or q(x), depending on whether the ith variable is 0 or 1.

A family of branching programs consists of a branching program with n variables for each n.

It is easy to show that every language L on {0,1} can be recognized by a family of branching programs of width 4 and exponential length, or by a family of exponential width and linear length.

Every regular language on {0,1} can be recognized by a family of branching programs of constant width and linear number of instructions (since a DFA can be converted to a branching program). BWBP denotes the class of languages recognizable by a family of branching programs of bounded width and polynomial length.[7]

Barrington's theorem[8] says that is exactly nonuniform NC1. The proof uses the nonsolvability of the symmetric group S5.[7]

The theorem is rather surprising. It implies that the majority function can be computed by a family of branching programs of constant width and polynomial size, while intuition might suggest that to achieve polynomial size, one needs a linear number of states.

Proof of Barrington's theorem

A branching program of constant width and polynomial size can be easily converted (via divide-and-conquer) to a circuit in NC1.

Conversely, suppose a circuit in NC1 is given. Without loss of generality, assume it uses only AND and NOT gates.

Lemma 1: If there exists a branching program that sometimes works as a permutation P and sometimes as Q, by right-multiplying permutations in the first instruction by α, and in the last instruction left-multiplying by β, we can make a circuit of the same length that behaves as βPα or βQα, respectively.

Call a branching program α-computing a circuit C if it works as identity when C's output is 0, and as α when C's output is 1.

As a consequence of lemma 1 and the fact that all cycles of length 5 are conjugate, for any two 5-cycles α, β, if there exists a branching program α-computing a circuit C, then there exists a branching program β-computing the circuit C, of the same length.

Lemma 2: There exist 5-cycles γ, δ such that their commutator γδγ1δ1=ϵ is a 5-cycle. For example, γ = (1 2 3 4 5), δ = (1 3 5 4 2).

We will now prove Barrington's theorem by induction.

Assume that for all subcircuits D of C and 5-cycles α, there exists a branching program α-computing D. We will show that for all 5-cycles α, there exists a branching program α-computing C.

  • If the circuit outputs xi, the branching program has one instruction checking xi and outputting identity or α respectively.
  • If the circuit outputs ¬C, where C is a different circuit. Create a branching program α1-computing C, and multiply output of the program (using lemma 1) by α to get a branching program outputting id or α, i.e. α-computing ¬C.
  • If the circuit outputs CD, join the branching programs that δ1-compute D, γ1-compute C, δ-compute D, γ-compute C. If one of the circuits outputs 0, the resulting program will be identity; if both circuits output 1, the resulting program will work as ε. In other words, we get a program ε-computing CD. Because ε and α are two 5-cycles, they are conjugate, and there exists a program α-computing CD.

The size of the branching program is at most 4d, where d is the depth of the circuit. If the circuit has logarithmic depth, the branching program has polynomial length.

References

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  1. Arora & Barak (2009) p.120
  2. 2.0 2.1 2.2 Arora & Barak (2009) p.118
  3. Papadimitriou (1994) Theorem 16.1
  4. 4.0 4.1 Clote & Kranakis (2002) p.437
  5. Clote & Kranakis (2002) p.12
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  7. 7.0 7.1 Clote & Kranakis (2002) p.50
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    Discover out more about real estate funding in the area, together with info on international funding incentives and property possession. Many Singaporeans have been investing in property across the causeway in recent years, attracted by comparatively low prices. However, those who need to exit their investments quickly are likely to face significant challenges when trying to sell their property – and could finally be stuck with a property they can't sell. Career improvement programmes, in-house valuation, auctions and administrative help, venture advertising and marketing, skilled talks and traisning are continuously planned for the sales associates to help them obtain better outcomes for his or her shoppers while at Knight Frank Singapore. No change Present Rules

    Extending the tax exemption would help. The exemption, which may be as a lot as $2 million per family, covers individuals who negotiate a principal reduction on their existing mortgage, sell their house short (i.e., for lower than the excellent loans), or take part in a foreclosure course of. An extension of theexemption would seem like a common-sense means to assist stabilize the housing market, but the political turmoil around the fiscal-cliff negotiations means widespread sense could not win out. Home Minority Chief Nancy Pelosi (D-Calif.) believes that the mortgage relief provision will be on the table during the grand-cut price talks, in response to communications director Nadeam Elshami. Buying or promoting of blue mild bulbs is unlawful.

    A vendor's stamp duty has been launched on industrial property for the primary time, at rates ranging from 5 per cent to 15 per cent. The Authorities might be trying to reassure the market that they aren't in opposition to foreigners and PRs investing in Singapore's property market. They imposed these measures because of extenuating components available in the market." The sale of new dual-key EC models will even be restricted to multi-generational households only. The models have two separate entrances, permitting grandparents, for example, to dwell separately. The vendor's stamp obligation takes effect right this moment and applies to industrial property and plots which might be offered inside three years of the date of buy. JLL named Best Performing Property Brand for second year running

    The data offered is for normal info purposes only and isn't supposed to be personalised investment or monetary advice. Motley Fool Singapore contributor Stanley Lim would not personal shares in any corporations talked about. Singapore private home costs increased by 1.eight% within the fourth quarter of 2012, up from 0.6% within the earlier quarter. Resale prices of government-built HDB residences which are usually bought by Singaporeans, elevated by 2.5%, quarter on quarter, the quickest acquire in five quarters. And industrial property, prices are actually double the levels of three years ago. No withholding tax in the event you sell your property. All your local information regarding vital HDB policies, condominium launches, land growth, commercial property and more

    There are various methods to go about discovering the precise property. Some local newspapers (together with the Straits Instances ) have categorised property sections and many local property brokers have websites. Now there are some specifics to consider when buying a 'new launch' rental. Intended use of the unit Every sale begins with 10 p.c low cost for finish of season sale; changes to 20 % discount storewide; follows by additional reduction of fiftyand ends with last discount of 70 % or extra. Typically there is even a warehouse sale or transferring out sale with huge mark-down of costs for stock clearance. Deborah Regulation from Expat Realtor shares her property market update, plus prime rental residences and houses at the moment available to lease Esparina EC @ Sengkang