Thesis - Archive ouverte UNIGE
... Three theories of gravitation – general relativity, the chameleon and Horava gravity - are confronted with experiment, using standard and adapted post-Newtonian (PN) tools. The laboratory is provided by the Solar System, binary pulsars and future detections at gravitational wave observatories. We te ...
... Three theories of gravitation – general relativity, the chameleon and Horava gravity - are confronted with experiment, using standard and adapted post-Newtonian (PN) tools. The laboratory is provided by the Solar System, binary pulsars and future detections at gravitational wave observatories. We te ...
Analog Quantum Simulators - Kirchhoff
... opened new opportunities to explore many-body dynamics, addressing fundamental questions both in and out of equilibrium. As always in such systems, a key experimental challenge is found in the need to cool systems to lower temperatures. However, the time-dependent control available over these dynami ...
... opened new opportunities to explore many-body dynamics, addressing fundamental questions both in and out of equilibrium. As always in such systems, a key experimental challenge is found in the need to cool systems to lower temperatures. However, the time-dependent control available over these dynami ...
Cryptographic distinguishability measures for quantum
... of the photons to B. As far as B is concerned, his photon’s polarization will be described by the completely mixed state. On the other hand, if A and B measure both photons with respect to the same polarization (vertical, eliptical, etc.), we can predict from the overall state that their measurement ...
... of the photons to B. As far as B is concerned, his photon’s polarization will be described by the completely mixed state. On the other hand, if A and B measure both photons with respect to the same polarization (vertical, eliptical, etc.), we can predict from the overall state that their measurement ...
Chapter 6 Groups and Representations in Quantum Mechanics
... The direct product provides a way of enlarging the number of elements in a group while retaining the group properties. Direct products occur in several contexts. For example, if a Hamiltonian or Lagrangian contains different types of coordinates, such as spatial coordinates for different particles, ...
... The direct product provides a way of enlarging the number of elements in a group while retaining the group properties. Direct products occur in several contexts. For example, if a Hamiltonian or Lagrangian contains different types of coordinates, such as spatial coordinates for different particles, ...
Fibonacci Quanta - University of Illinois at Chicago
... converges to the positive solution of x 2 = x + 1, which is the golden ratio, φ = (1 + _5)/2. On the other hand, the quadratic equation may have imaginary roots. (This happens when a 2 + 4b is less than zero.) Under these circumstances, the formal solution does not represent a real number. For examp ...
... converges to the positive solution of x 2 = x + 1, which is the golden ratio, φ = (1 + _5)/2. On the other hand, the quadratic equation may have imaginary roots. (This happens when a 2 + 4b is less than zero.) Under these circumstances, the formal solution does not represent a real number. For examp ...
The Einstein-Podolsky-Rosen Argument in Quantum Theory (http
... of the Heisenberg uncertainty relation that sets a lower bound on the simultaneous uncertainty of energy and time (Uncertainty Principle). The uncertainty relations, understood not just as a prohibition on what is co-measurable, but on what is simultaneously real, were a central component in the irr ...
... of the Heisenberg uncertainty relation that sets a lower bound on the simultaneous uncertainty of energy and time (Uncertainty Principle). The uncertainty relations, understood not just as a prohibition on what is co-measurable, but on what is simultaneously real, were a central component in the irr ...
Duality of Strong Interaction - Indiana University Bloomington
... leads not only to consistent results with the standard model, but also to many new insights and predictions. One important feature of the unified field model is a natural duality between the interacting fields (g, A, W a , S k ), corresponding to graviton, photon, intermediate vector bosons W ± and ...
... leads not only to consistent results with the standard model, but also to many new insights and predictions. One important feature of the unified field model is a natural duality between the interacting fields (g, A, W a , S k ), corresponding to graviton, photon, intermediate vector bosons W ± and ...
computational
... Approximating cycles of shortest basis of the first homology group Approximating Reeb graph ...
... Approximating cycles of shortest basis of the first homology group Approximating Reeb graph ...
A definite resolution of the mystery of
... which include the photon [1-4]. This number is related to the 12 generators of three combined Lie symmetry groups of the standard model [4,5]. All the said 12 particles are real and found experimentally [2,3]. Consequently and again from a particle physicist viewpoint reality is much richer than a w ...
... which include the photon [1-4]. This number is related to the 12 generators of three combined Lie symmetry groups of the standard model [4,5]. All the said 12 particles are real and found experimentally [2,3]. Consequently and again from a particle physicist viewpoint reality is much richer than a w ...
Self-Reference, Biologic and the Structure of Reproduction
... make the mathematician a reductionist. We think of geometry as the consequences of certain axioms for the purpose of organizing our knowledge, not to insist that these axioms are in any way other than logically prior to the theorems of the system. Just so, we look for fundamental patterns from which ...
... make the mathematician a reductionist. We think of geometry as the consequences of certain axioms for the purpose of organizing our knowledge, not to insist that these axioms are in any way other than logically prior to the theorems of the system. Just so, we look for fundamental patterns from which ...
Information Flow in Entangled Quantum Systems
... computational step (counting the Ôunit wireÕ I, which has no effect on the ö the dynamical evolution of any computational state of a qubit, as a gate with UI = 1), qubit of N during one step is fully specified by an expression of the form (7), where G is the gate acting on that qubit during that ste ...
... computational step (counting the Ôunit wireÕ I, which has no effect on the ö the dynamical evolution of any computational state of a qubit, as a gate with UI = 1), qubit of N during one step is fully specified by an expression of the form (7), where G is the gate acting on that qubit during that ste ...
The Action, The Lagrangian and Hamilton`s Principle
... form e h̄ S[r] , where S[r] is the action functional for the trajectory. The action functional assigns a number to each path connecting r1 to r2 . The specific way in which the action assigns numbers to paths depends upon the physics (degrees of freedom, masses, potentials, etc. ) of the system bein ...
... form e h̄ S[r] , where S[r] is the action functional for the trajectory. The action functional assigns a number to each path connecting r1 to r2 . The specific way in which the action assigns numbers to paths depends upon the physics (degrees of freedom, masses, potentials, etc. ) of the system bein ...