2015_0042_Quantum Robot = CSP = Quantum Emotional

... created in AQC to program problems such as Maximum Clique or SAT. • This programming is like on “assembly level” but with time more efficient methods will be developed in our group. – This is also similar to programming current Field-Programmable Gate ...

bYTEBoss introduction

... immediately prompted into action. The proposition of parity non-conservation was not unequivocally denied; rather, the possibility appeared so unlikely that experimental proof did not warrant immediate attention. ...

The Physical World as a Virtual Reality

... Philosophers like Plato have long recognized that the reality of reality is not provable [20]. Bishop Berkeley’s solipsism argued that a tree falling in a wood will make no sound if no-one is there to hear it. Dr Johnson is said to have reacted to that idea the world is created by the mind by stubbi ...

The Logic of Complementarity - Philsci

... the scope of this paper. Keeping within physics, it should be recalled that in 1994 Englert et al. argued that complementarity is not simply a consequence of the uncertainty relations, as advocated by those who believe that “two complementary variables, such as position and momentum, cannot simultan ...

IS THERE A UNIQUE PHYSICAL ENTROPY? MICRO VERSUS

... Let us now consider which kind of permutations is relevant to statistical mechanics – physical exchanges, with connecting trajectories, or swapping indices? Which kind of permutations determines the number of microstates W ? Remember our two gas-filled chambers, each containing N identical particles ...

Quantum transport signatures of chiral edge states in Sr2RuO4

... The topological index theorem necessitates the presence of gapless chiral edge modes at the interface of such a chiral superconductor and vacuum. In this Letter we investigate the possibility of using quantum transport measurements to directly probe these edge states. A schematic view of the propose ...

JHEP12(2014)098 - Open Access LMU

Spacetime physics with geometric algebra

... matrices, appearing so mysteriously in relativistic quantum mechanics: The Dirac matrices are no more and no less than matrix representations of an orthonormal frame of spacetime vectors and thereby they characterize spacetime geometry. But how can this be? Dirac never said any such thing! And physi ...

Heisenberg uncertainty relations for photons

... are completely equivalent. In nonrelativistic quantum mechanics, the equivalence holds in any number of dimensions. A spherically symmetric Gaussian function shifted in the coordinate space by r and in the momentum space by p by the unitary transformation of the form (19) will automatically sat ...

Models of wave-function collapse

... this is of course observed, for example, in the famous double-slit interference experiment. Moreover, the theory in principle makes no distinction between microscopic and macroscopic objects and predicts that large objects can also be in more than one place at the same time. But this is not what we ...

Minimal normal measurement models of quantum instruments

... vector, extend to a unitary operator on HA ⊗ HB ?” Mathematically, this unitary extension problem can be related to well known and established results on extendability of partial isometries [3] and unitary dilations of contractive maps [4]. In addition, the work presented here has also applications ...

Affine computation and affine automaton

URL - StealthSkater

... Principle (NMP) states that in a given quantum state the most quantum entangled subsystemcomplement pair can perform the quantum jump. More precisely, the reduction of the entanglement entropy in the quantum jump is as large as possible. This selects the pair in question and in the case of ordinary ...

EMBEDDABLE QUANTUM HOMOGENEOUS SPACES 1

... The notion of a homogeneous space of a locally compact group is of fundamental importance in many branches of mathematics. The non-commutative geometric generalization of the theory of locally compact groups was enriched greatly by the paper of S. Vaes [29], in which the notion of a closed subgroup ...

Detailed information may be found here

... Take-home, counting 25% towards module mark Take-home, in October/November, counting 50% towards module mark ...

schrodinger operators with magnetic

... results in this subsection have been obtained in [11] independently of and approximately simultaneously to our work. Define N(V;-d) to be the dimension of the spectral projection for H0) + V corresponding to the interval (-oo, -a). Then, the Birman-Schwinger principle (see [52] for references and a ...

L17-20

... This measurement removes all the coherence in the |ej i basis, leaving the density operator diagonal in this basis. There are two lessons here. The first is that generally a POVM element corresponds to many different quantum operations: measurement statistics do not specify the post-measurement stat ...

Hyperfine interaction and spin decoherence in quantum dots

DO Timeline - University of Arizona

...  One can determine the multiplet by explicit calculation of the representation or by the following trick ...

Logical error rate in the Pauli twirling approximation Amara Katabarwa

Tight bounds on quantum searching

JLab 12 GeV upgrade (3) [C3]

... (GluEx and heavy baryon and meson spectroscopy) The transverse structure of the hadrons (rated) (Elastic and transition Form Factors) The longitudinal structure of the hadrons (rated) (Unpolarized and polarized parton distribution functions) The 3D structure of the hadrons (unrated) (Generalized Par ...

Is a random state entangled ?

... (counterexample to the additivity conjecture). An important pioneering work by Hayden–Leung–Winter: “Aspects of generic entanglement”. This motivates the study the properties of random states or random channels, which might become a basic tool in future years. Guillaume Aubrun (Lyon) ...

ZONOIDS AND SPARSIFICATION OF QUANTUM

... A classical result by Lyapounov ([26], Theorem 5.5) asserts that the range of a non-atomic Rn -valued vector measure is closed and convex. Convex sets in Rn obtained in this way are called zonoids. Zonoids are equivalently characterized as convex sets which can be approximated by finite sums of segm ...

Mechanical Proof of the Second Law of Thermodynamics Based on

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Bell's theorem

Bell's theorem is a ‘no-go theorem’ that draws an important distinction between quantum mechanics (QM) and the world as described by classical mechanics. This theorem is named after John Stewart Bell.In its simplest form, Bell's theorem states:Cornell solid-state physicist David Mermin has described the appraisals of the importance of Bell's theorem in the physics community as ranging from ""indifference"" to ""wild extravagance"". Lawrence Berkeley particle physicist Henry Stapp declared: ""Bell's theorem is the most profound discovery of science.""Bell's theorem rules out local hidden variables as a viable explanation of quantum mechanics (though it still leaves the door open for non-local hidden variables). Bell concluded:Bell summarized one of the least popular ways to address the theorem, superdeterminism, in a 1985 BBC Radio interview:

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Bell's theorem