Questions tagged [quantum-computing]

Quantum computation and computational issues related to quantum mechanics

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238 views

Dependent corrections in measurement-based Universal Blind Quantum Computation

In Universal Blind Quantum Computation the autors describe a measurement-based protocol which allows an almost classical user to perform arbitrary computations on a quantum server without revealing ...
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Fast classical simulation of quantum algorithms

Are there examples of cases where the classical simulation of a quantum algorithm for a problem outperforms the best previously known classical algorithm for this problem? "Outperforms" doesn't have ...
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456 views

Why must QMA complete problems be promise problems?

I'm reading Watrous's excellent survey paper on paper on quantum complexity theory. In it he states that it would be surprising if a QMA -complete problem were found to have a vacuous promise (I.e. Be ...
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Span programs, witness size, and certificate complexity

A span program is a linear-algebraic way of specifying a boolean function introduced here. Recently, this model was used to show that the negative adversary method provides a tight characterization (...
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Lower bounds for quantum circuits using the geodesic framework

Some of us have been reading Michael Nielsen's paper on a geometric approach to using quantum lower bounds (in brief, the construction of a Finsler metric on $SU(2^n)$ such that the geodesic distance ...
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Does MIP* = RE algebrize?

Does the MIP* = RE result algebrize? (It doesn’t relativize, as noted here.) If it doesn’t algebrize, is there a more complicated similar notion that it does satisfy?
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How would proof of the Lindelöf hypothesis improve our understanding of computational complexity classes?

A recent press release from the Viterbi School of Engineering at USC discussed the proof of the Lindelöf hypothesis by Athanassios Fokas, a visiting professor from the Department of Applied ...
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How hard it is to approximate the ground state of the (2-D) Hubbard model

The Hubbard model (see also the wikipedea article on the Bose-Hubbard model) is a basic quantum model of solid-state physics. Question: What is the computational complexity of approximating the ...
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Is adiabatic quantum computing as powerful as the circuit model?

Much of the quantum computing literature focuses on the circuit model. Adiabatic quantum computing is not based on applying a sequence of unitary operators, but on changing a time-dependent ...
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Why exactly are complexity theorists interested in closed timelike curves?

Context: There are several papers that study the implications of closed timelike curves (CTCs) to quantum complexity. In 2008, Aaronson and Watrous published their famous paper on this topic which ...
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Interactive Proofs via Postselection?

Define the computational model MPostBQP to be identical to PostBQP except we allow polynomially many qubit measurements before the post-selection and final measurement. Can we give any evidence ...
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Polynomial algorithms for UPB (Unextendable Product Bases)

Consider a Hilbert space $H = H_1 \otimes \dots \otimes H_n$. An Unextendable Product Basis (UPB) is a set of product vectors $\vert v_i \rangle = \vert v_i^1 \rangle \otimes \dots \otimes \vert v_i^n ...
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The complexity of Area-lawed Hamiltonians

I have recently thought about "importing" some physics-related question into quantum CS: The notion of the area-law phenomenon in Hamiltonian systems usually stands for a local Hamiltonian on some ...
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663 views

Lower bounds on the Threshold function

In decision tree complexity of a boolean function, a very well know lower bound method is to find a (approximate) polynomial that represents the function. Paturi gave a characterization for symmetric ...
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Is there a candidate for a post-quantum one-way group action?

Is there a known family of group actions with a designated element in the set that is being acted on, where it is known how to efficiently $\:$ sample (essentially uniformly) from the groups, ...
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623 views

On optimality of Grover algorithm with high success probability

It is well-known that bounded error quantum query complexity of the function $OR(x_1,x_2,\ldots, x_n)$ is $\Theta(\sqrt{n})$. Now the question is what if we want our quantum algorithm to succeed for ...
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409 views

What is the proper role of verification in quantum sampling, simulation, and extended-Church-Turing (E-C-T) testing?

Since no answer was given, a flag has been set requesting that this question be converted to a community wiki. The comments by Aaron Sterling, Sasho Nikolov, and Vor have been synthesized into the ...
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Relatively low ambitious frontiers

What are some of the current "relatively" low ambitious frontiers for MA/PhD thesis in complexity theory class separations/containment or quantum computing? For example: In the draft version of Arora ...
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Non-tomographical certification of projectors, using product states?

I'm interested in operational ways of demonstrating (with high probability of confidence, in an error-free setting) that a POVM operator on n-qubit states is a projector. Specifically, I'm interested ...
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Von Neumann architectures and quantum computing

Can you do quantum computing in a von neuman architecture? If not, why? What is the constraint? If you control a qbit, can a quantum computer use the von neuman architecture? Thanks.
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Suppose $\mathbf{P} = \mathbf{BQP}$. Then what is randomness? Would it even exist at all?

DISCLAIMERI do apologize in advance if this question turns out to be silly, for some trivial reason that I may be overlooking in this moment. Suppose for a moment that $\mathbf{P} = \mathbf{BQP}$ ...
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Is the wording of Google's QC Supremacy valid?

Quantum supremacy using a programmable superconducting processor was published today. Scott Aaronson posted a few weeks ago a post about this paper and it was clear we will see a Nature or Science ...
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489 views

Understanding QMA

This question comes out of an answer Joe Fitzsimons gave to a different question. Most natural complexity classes have a one-line "intuitive description" that helps characterize core problems in that ...
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679 views

Quantum PCP and hardness of simulating of Hamiltonians

I have a few questions about Quantum PCP conjecture: What is the statement of the quantum PCP conjecture? What implications would Quantum PCP theorem have for simulating of Hamiltonians? Is it ...
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1-way Quantum Finite Automata Example Question

I'm attempting to clarify my understanding in the example presented in Section 2.2 of 1-way Quantum Finite Automata: Strengths Weaknesses and Generalizations (this alternative link may also be useful)....
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Is it conceivable at all that the standard model of physics can outperform a quantum computer in any sense?

The Standard Model of physics (the mathematical model which predicts the Higg's boson) is, as far as I understand, our most complete model of the universe. That is to say, it is the best description ...
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Is there any quantum analog of the VP vs. VNP problem?

From Wikipedia: $\mathsf{VP}$: The class VP is the algebraic analog of P; it is the class of polynomials $f$ of polynomial degree that have polynomial size circuits over a fixed field $K$. $\mathsf{...
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Largest set allowing one-step unstructured quantum search

What is the largest set admitting a deterministic quantum search algorithm, for a single marked element, that operates with only a single call to the oracle? The question is interesting since Grover'...
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BQP algorithm for two graph bisection problems and its implications on NP $\subseteq$ BQP

I read the paper Ahmed Younes, "A Bounded-error Quantum Polynomial Time Algorithm for Two Graph Bisection Problems", 2015. doi:10.1007/s11128-015-1069-y which is published in Springer's journal ...
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Approximation of Quantum Channels

Background: In quantum information theory, a wide class of processes acting on stochastic quantum states can be described using the formalism of Quantum Channels: A quantum channel is a linear, ...
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Ed. Witten's new paper and the simulation of a quantum field theory

Context: Ed. Witten recently wrote a potentially revolutionary paper where he showed that under certain conditions, a Chern-Simons path integral in three dimensions is equivalent to an N = 4 path ...
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Physical realization of nonlinear operators for quantum computers.

I have read in a paper where nonlinear operators for quantum computers implies the solving of problems in #P time. See http://arxiv.org/pdf/quant-ph/9801041 . What would be the simplest realization of ...
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Are there any cases where quantum has given insight for classical algorithms?

To be more specific, has it ever happened that we've made some kind of significant improvement to a classical algorithm or problem as a result of some "trick" or insight gained from looking at quantum ...
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Is there a standard definition of Quantum Randomness?

I hope this question is not too vague. For classical bit generators there is the classical statistical definition which (informally) states that a source is ideally random if its output $X_1,X_2,\...
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Hardness of quantum circuit equivalence?

Given two poly-sized quantum circuits $C_1$ and $C_2$ on $n$ qubits with a universal gate set generated by some finite set of one and two qubit gates. I'm thinking of the gates $\langle H, T, CNOT\...
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Are provable quantum speed-ups possible for classes larger than NP?

In the oracle query model quantum computers can provably achieve a quadratic speed-up over any classical randomized computer [Grover, BBBV]. Are similar speed-ups provably possible for higher levels ...
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Layman Interpretation: Quantum Factoring Algorithm

I must firstly express that I know only a little about quantum computing and my knowledge comes largely from popular science texts and the media. So, I'm hoping that somebody will be able to help me ...
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A promise problem to decide whether two given pure quantum states are close or far apart

Consider this problem in quantum cryptography: We have two pure states $\phi_1,\phi_2$ as input and constants $0 \leq \alpha <\beta \leq 1 $, where "Yes instances" are those for which $$\left|\...
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Applications of Quantum Walks?

Can someone explain to me what real world applications could potentially benefit from the study of quantum random walks? I have researched a fair amount on how quantum walks operate and their ...
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400 views

Quantum Money where not even the Bank can counterfeit

The Quantum Money system proposed in "Quantum Copy-Protection and Quantum Money" has the following properties: The bank can produce bank notes in the form of quantum states. Anyone can verify that ...
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Evidence that there is some problem in BQP distinct from BPP?

Are there any evidences (1 physics, 2 mathematics AND 3 computer science) that particular problems such as integer factorization, discrete logarithm are in BQP but not in BPP? There do not seem to be ...
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Is any QMA-intermediate problem known?

Similar to the class of classical NP-intermediate problems (e.g. Graph Isomorphism), is there any "QMA-intermediate" problem known, that is in QMA but not known to be QMA-complete? Has this been ...
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The computational complexity of spectral norm of a matrix

How hard is computing the spectral norm of a matrix? This paper says, ... it suffices to say that, except for few particular cases, the Matrix Norm problem is NP-hard. I expected that the ...
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886 views

States and Probability distributions that the 5-qubits IBM computer can produce

Update (January 2018) A new very interesting paper with various experiments on the IBM machine is Five Experimental Tests on the 5-Qubit IBM Quantum Computer by Diego García-Martín, Germán Sierra. ...
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Quantum Hardness of Approximating Lattice Problems

A common claim in lattice-based cryptography is that cryptosystems based on the Learning with Errors ($\mathsf{LWE}$) problem are hard to break (for a per-system definition of "break") for quantum ...
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Quantum annealing vs adiabatic quantum computation

I had this impression that quantum annealing is an optimization technique which may or may not produce exact solutions. On the other hand adiabatic quantum computation always gives exact solutions ...
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Quantum query complexity and certificate complexity

A certificate for an input $x$ is a subset of bits $S \subseteq \{1,...,n\}$ such that for all inputs $y$, $(\forall i \in S \quad y_i = x_i) \rightarrow f(y) = f(x)$. Then $C_x(f)$ is the minimum ...
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248 views

What complexity issues are there in considering quantum algorithms with infinite gate-sets?

Short Version Suppose that you want to consider a model of quantum computation in which the gates used in the circuits may depend on the input size. Are there pitfalls to avoid when defining the ...
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What is the complexity of estimating the number of paths between two vertices of a large graph?

Consider an $N\times N$ adjacency matrix $A$ of some large, $b$-sparse undirected graph $G$. The $(i,j)$ entry of $A^m$ counts the number of $m$-length paths between vertex $i$ and vertex $j$. We let ...
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Given a subset of the hypercube and a copy translated by s, find s

Problem: Suppose we are given an $n$ element subset $A\subseteq\{0,1\}^d$ of the $d$ dimensional hypercube and a translated copy $B= A+s$ by some secret $s\in\{0,1\}^d$. Find $s$ as fast as possible ...

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