Difference between revisions of "Complexity Zoo:U"
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===== <span id="uwappcc" style="color:red">UWAPP<sup>cc</sup></span>: Unrestricted Communication Analogue of [[#wapp|WAPP]] ===== | ===== <span id="uwappcc" style="color:red">UWAPP<sup>cc</sup></span>: Unrestricted Communication Analogue of [[#wapp|WAPP]] ===== | ||
− | Syntactically, this has the same relationship to [[Complexity Zoo:W#wappcc|WAPP<sup>cc</sup>]] as [[Complexity Zoo:U#uppcc|UPP<sup>cc</sup>]] does to [[Complexity Zoo:P#ppcc|PP<sup>cc</sup>]]. | + | Syntactically, this has the same relationship to [[Complexity Zoo:W#wappcc|WAPP<sup>cc</sup>]] as [[Complexity Zoo:U#uppcc|UPP<sup>cc</sup>]] does to [[Complexity Zoo:P#ppcc|PP<sup>cc</sup>]]; i.e., we only allow private (no public) randomness, and do not charge for α in the cost of a protocol. However, it has been shown that UWAPP<sup>cc</sup> protocols can be efficiently simulated by [[Complexity Zoo:W#wappcc|WAPP<sup>cc</sup>]] protocols with a slightly larger ε parameter [[zooref#glm+15|[GLM+15]]]. |
Revision as of 21:21, 9 June 2016
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Complexity classes by letter: Symbols - A - B - C - D - E - F - G - H - I - J - K - L - M - N - O - P - Q - R - S - T - U - V - W - X - Y - Z
Lists of related classes: Communication Complexity - Hierarchies - Nonuniform
UAMcc - UAP - UCC - UCFL - UE - UL - UL/poly - UP - UPcc - UPostBPPcc - UPPcc - US - USBPcc - UWAPPcc
UAMcc: Unambiguous Arthur-Merlin Communication Complexity
UAP: Unambiguous Alternating Polynomial-Time
Same as AP, except we are promised that each existential quantifier has at most one 'yes' path, and each universal quantifier has at most one 'no' path.
Contains UP.
Defined in [NR98], where it was also shown that, even though AP = PSPACE, it is unlikely that the same is true for UAP, since UAP is contained in SPP.
[CGR+04] have also shown that UAPUAP = UAP, and that UAP contains Graph Isomorphism problem.
UCC: Unique Connected Component
The class of problems reducible in L to the problem of whether an undirected graph has a unique connected component.
See [AG00] for more information.
The corresponding class for directed graphs equals NL. On the other hand, none of that class's corresponding search problems are obviously FNL-hard.
UCFL: Unambiguous CFL
The class of context-free languages which can be represented by grammars where each word in the language has exactly one leftmost derivation.
Strictly contains Deterministic CFL. Strictly contained in CFL.
UL: Unambiguous L
Has the same relation to L as UP does to P.
The problem of reachability in directed planar graphs lies in UL [SES05].
If UL = NL, then FNL is contained in #L [AJ93].
UL/poly: Nonuniform UL
Has the same relation to UL as P/poly does to P.
Equals NL/poly [RA00]. (A corollary is that UL/poly is closed under complement).
Note that in UL/poly, the witness must be unique even for bad advice. UL/mpoly (as in BQP/mpoly) is a more natural definition, but this is a moot distinction here because [RA00] show that they both equal NL/poly.
UE: Unambiguous Exponential-Time With Linear Exponent
Has the same relation to E as UP does to P.
UP: Unambiguous Polynomial-Time
The class of decision problems solvable by an NP machine such that
- If the answer is 'yes,' exactly one computation path accepts.
- If the answer is 'no,' all computation paths reject.
Defined by [Val76].
"Worst-case" one-way functions exist if and only if P does not equal UP ([GS88] and independently [Ko85]). "Worst-case" one-way permutations exist if and only if P does not equal UP ∩ coUP [HT03]. Note that these are weaker than the one-way functions and permutations that are needed for cryptographic applications.
There exists an oracle relative to which P is strictly contained in UP is strictly contained in NP [Rac82]; indeed, these classes are distinct with probability 1 relative to a random oracle [Bei89].
NP is contained in RPPromiseUP [VV86]. On the other hand, [BBF98] give an oracle relative to which P = UP but still P does not equal NP.
UP is not known or believed to contain complete problems. [Sip82], [HH86] give oracles relative to which UP has no complete problems.
UPcc: Communication Complexity UP
Similar to NPcc except that the protocol is restricted to have exactly one accepting computation on each yes-input.
The complexity measure corresponding to UPcc is equivalent to the log of the number of rectangles needed to partition the set of 1-entries of the communication matrix.
Introduced in [Yan91], where it was shown that for total functions:
- Pcc=UPcc.
- The "Clique vs. Independent Set problem" CISG on a graph G (Alice gets a clique, Bob gets an independent set: do they intersect?) is "complete" for UPcc in the sense that every f, say with UPcc(f)=c, reduces to CISG for some G on 2c many nodes.
UPostBPPcc: Unrestricted Communication Analogue of PostBPP
Syntactically, this has the same relationship to PostBPPcc as UPPcc does to PPcc.
UPPcc: Unrestricted Communication Analogue of PP
Defined by [BFS86], UPPcc is one of two communication complexity analogues of PP. UPPcc is the class of all functions that are computable by polylogarithmic protocols using private (but no public) randomness, which accept with probability strictly greater than 1/2 when and accept with probably strictly less than 1/2 otherwise. No accounting is made for how many random bits are consulted during the protocol.
Does not contain ⊕Pcc [For02].
The complexity measure associated with UPPcc is equivalent to the log of the sign-rank of the communication matrix (assuming the latter has {1,-1} entries) [PS86].
See also: PPcc.
US: Unique Polynomial-Time
The all-American counting class.
The class of decision problems solvable by an NP machine such that the answer is 'yes' if and only if exactly one computation path accepts.
In contrast to UP, a machine can legally have more than one accepting path - that just means that the corresponding input is not in the language.
Defined in [BG82].
Contains coNP.
USBPcc: Unrestricted Communication Analogue of SBP
Syntactically, this has the same relationship to SBPcc as UPPcc does to PPcc. However, it has been shown that USBPcc=SBPcc [GLM+15].
UWAPPcc: Unrestricted Communication Analogue of WAPP
Syntactically, this has the same relationship to WAPPcc as UPPcc does to PPcc; i.e., we only allow private (no public) randomness, and do not charge for α in the cost of a protocol. However, it has been shown that UWAPPcc protocols can be efficiently simulated by WAPPcc protocols with a slightly larger ε parameter [GLM+15].