A Sonoran Afternoon - Quantum Consciousness
... hydrogen and carbon atoms, just as proteins emerge from the nonlinear attractions among amino acids. Tornadoes emerge from the nonlinear dynamics of air and sunshine, just as cities and cultural configurations emerge from the very nonlinear interactions among human beings. Each of these is indeed "o ...
... hydrogen and carbon atoms, just as proteins emerge from the nonlinear attractions among amino acids. Tornadoes emerge from the nonlinear dynamics of air and sunshine, just as cities and cultural configurations emerge from the very nonlinear interactions among human beings. Each of these is indeed "o ...
An Introduction to Quantum Control
... where N is a ∗-algebra of operators on a finite-dimensional Hilbert space and P is a state on N , is called a (finite-dimensional) quantum probability space. A ∗-algebra N is a vector space with multiplication and involution (e.g. B(H)). A linear map P : N → C that is positive (P(A) ≥ 0 if A ≥ 0) an ...
... where N is a ∗-algebra of operators on a finite-dimensional Hilbert space and P is a state on N , is called a (finite-dimensional) quantum probability space. A ∗-algebra N is a vector space with multiplication and involution (e.g. B(H)). A linear map P : N → C that is positive (P(A) ≥ 0 if A ≥ 0) an ...
Integrated devices for quantum information with polarization
... Framework of the project Quantum optics represents an experimental test bench for various novel concepts introduced within the framework of Quantum Information (QI) theory. Photons are natural candidates for QI transmission since they are practically immune from decoherence and can be distributed ov ...
... Framework of the project Quantum optics represents an experimental test bench for various novel concepts introduced within the framework of Quantum Information (QI) theory. Photons are natural candidates for QI transmission since they are practically immune from decoherence and can be distributed ov ...
ABSTRACTS Workshop on “Higher topological quantum field theory
... Dichromatic state sum models and four-dimensional topological quantum field theories from pivotal functors There is a scarcity of four-dimensional topological state sum models. Apart from the Crane-Yetter model, defined in the 90s, little is known. In this talk, a family of invariants of four-dimens ...
... Dichromatic state sum models and four-dimensional topological quantum field theories from pivotal functors There is a scarcity of four-dimensional topological state sum models. Apart from the Crane-Yetter model, defined in the 90s, little is known. In this talk, a family of invariants of four-dimens ...
can life explain quantum mechanics?
... selective dynamical process which is invariant to initial conditions, we must, in effect, introduce a new 'equation of motion' for the system, and this is clearly contradictory if we have assumed the original equations of motion are complete and deterministic. All records are statistical. One way ou ...
... selective dynamical process which is invariant to initial conditions, we must, in effect, introduce a new 'equation of motion' for the system, and this is clearly contradictory if we have assumed the original equations of motion are complete and deterministic. All records are statistical. One way ou ...
1 Simulating Classical Circuits
... How can a classical circuit C which takes an n bit input x and computes f (x) be made into a reversible quantum circuit that computes the same function? The circuit must never lose any information, so how could it compute a function mapping n bits to m < n bits (e.g. a boolean function, where m = 1) ...
... How can a classical circuit C which takes an n bit input x and computes f (x) be made into a reversible quantum circuit that computes the same function? The circuit must never lose any information, so how could it compute a function mapping n bits to m < n bits (e.g. a boolean function, where m = 1) ...
The fractional quantum Hall effect I
... case of a state described by Laughlin’s wave function for the ⌫ = 1/3 plateau. Consider an operator Tx (Ty ) that creates a quasi-particle – quasi-hole pair, moves the quasi-hole around the torus in x (y) direction an annihilates the two again, cf. Fig. 7.5(a). We consider now the action of Tx Ty Tx ...
... case of a state described by Laughlin’s wave function for the ⌫ = 1/3 plateau. Consider an operator Tx (Ty ) that creates a quasi-particle – quasi-hole pair, moves the quasi-hole around the torus in x (y) direction an annihilates the two again, cf. Fig. 7.5(a). We consider now the action of Tx Ty Tx ...
Design and proof of concept for silicon-based quantum dot
... exchange coupling primitives (like SWAP)12. The error level for such primitives should then be about 10 −5 , at least until error correction techniques can be optimized for this scheme. The decoherence time τ φ associated with spin-phonon relaxation is large for electron spins in Si. For donor-bound ...
... exchange coupling primitives (like SWAP)12. The error level for such primitives should then be about 10 −5 , at least until error correction techniques can be optimized for this scheme. The decoherence time τ φ associated with spin-phonon relaxation is large for electron spins in Si. For donor-bound ...
The Copenhagen Interpretation
... seem to say what you want to know. They weave a web of words around the Copenhagen interpretation but do not say exactly what it is. Heisenberg's writings are more direct. But his way of speaking suggests a subjective interpretation that appears quite contrary to the apparent intentions of Bohr. The ...
... seem to say what you want to know. They weave a web of words around the Copenhagen interpretation but do not say exactly what it is. Heisenberg's writings are more direct. But his way of speaking suggests a subjective interpretation that appears quite contrary to the apparent intentions of Bohr. The ...
UNITARY OPERATORS AND SYMMETRY TRANSFORMATIONS
... transformations are induced by unitary. This is the content of the well known Wigner theorem. In this paper we determine those unitary operators U are either parallel with or orthogonal to . We give some examples of simple unitary transforms, or ”quantum gates.” A quantum operation which copied stat ...
... transformations are induced by unitary. This is the content of the well known Wigner theorem. In this paper we determine those unitary operators U are either parallel with or orthogonal to . We give some examples of simple unitary transforms, or ”quantum gates.” A quantum operation which copied stat ...
