
PHOTONIC ENTANGLEMENT: NEW SOURCES AND NEW APPLICATIONS JI ˇ R´
... the last few decades. In order to be used in many different applications, sources of entanglement should satisfy several requirements as a high efficiency, broad tunability and compactness, and the possibility of integration with other optical components. The most common sources of entangled fields ...
... the last few decades. In order to be used in many different applications, sources of entanglement should satisfy several requirements as a high efficiency, broad tunability and compactness, and the possibility of integration with other optical components. The most common sources of entangled fields ...
A Topos for Algebraic Quantum Theory
... algebra is essentially the same thing as a frame, for in a frame one may define y → z = {x | x ∧ y z}. Conversely, the infinite distributivity law in a frame is automatically satisfied in a Heyting algebra. The set of subobjects of a given object in a topos forms a complete Heyting algebra (as lon ...
... algebra is essentially the same thing as a frame, for in a frame one may define y → z = {x | x ∧ y z}. Conversely, the infinite distributivity law in a frame is automatically satisfied in a Heyting algebra. The set of subobjects of a given object in a topos forms a complete Heyting algebra (as lon ...
Haag`s Theorem in Renormalisable Quantum Field Theories
... Yet it was decided that it is an apt title, if one lets ’Haag’s theorem’ stand for the triviality results that preclude a mathematically rigorous nonperturbative definition of interacting quantum field theories. There are a vast number of more or less viable attempts to give QFT a sound mathematical ...
... Yet it was decided that it is an apt title, if one lets ’Haag’s theorem’ stand for the triviality results that preclude a mathematically rigorous nonperturbative definition of interacting quantum field theories. There are a vast number of more or less viable attempts to give QFT a sound mathematical ...
Quiet Readout of Superconducting Flux States
... device and intrinsic noise in the qubit itself results in decoherence that must be quantified and reduced. A dc Superconducting QUantum Interference Device (SQUID), which involves two Josephson junctions connected in parallel on a superconducting ring, provides the most sensitive means for detecting ...
... device and intrinsic noise in the qubit itself results in decoherence that must be quantified and reduced. A dc Superconducting QUantum Interference Device (SQUID), which involves two Josephson junctions connected in parallel on a superconducting ring, provides the most sensitive means for detecting ...
Non-Perturbative Aspects of Nonlinear Sigma Models
... cover all these applications and the related aspects of NLSM in this introduction in a comprehensive way. This means that some extensive and very interesting subjects have to be omitted, like for instance the rôle of NLSM in string theories, cf. [39] for an overview, or their use in effective theori ...
... cover all these applications and the related aspects of NLSM in this introduction in a comprehensive way. This means that some extensive and very interesting subjects have to be omitted, like for instance the rôle of NLSM in string theories, cf. [39] for an overview, or their use in effective theori ...
How do you divide your (two dimensional) time? .1in SLE, CLE, the
... is a standard Gaussian on this space. Other boundary conditions: DGFF with boundary conditions f0 is the same as DGFF with zero boundary conditions plus a deterministic function, which is the (discrete) harmonic interpolation of f0 to Λ. Markov property: Given the values of f on the boundary of a su ...
... is a standard Gaussian on this space. Other boundary conditions: DGFF with boundary conditions f0 is the same as DGFF with zero boundary conditions plus a deterministic function, which is the (discrete) harmonic interpolation of f0 to Λ. Markov property: Given the values of f on the boundary of a su ...
Electron Spin and Its History - Physics Department, Princeton
... In early 1926, Erwin Schrödinger invented wave mechanics, and he later showed that it and Heisenberg’s matrix mechanics are equivalent. Meanwhile, in February 1926, Llewellyn H. Thomas, a 23-year-old Londoner born to Welsh parents, was on a traveling fellowship at Bohr’s institute in Copenhagen. Th ...
... In early 1926, Erwin Schrödinger invented wave mechanics, and he later showed that it and Heisenberg’s matrix mechanics are equivalent. Meanwhile, in February 1926, Llewellyn H. Thomas, a 23-year-old Londoner born to Welsh parents, was on a traveling fellowship at Bohr’s institute in Copenhagen. Th ...
Conceptual Rotational Inertia and Angular Momentum notes
... The lightweight wheels on racing bikes have less angular momentum than those on recreational bikes, so it takes less effort to get them turning. ...
... The lightweight wheels on racing bikes have less angular momentum than those on recreational bikes, so it takes less effort to get them turning. ...