CHARACTERIZATION OF THE SEQUENTIAL PRODUCT ON
... any sequential product will be convex in its second variable which, with a little work and our other assumptions, will grant continuity in the second variable automatically. However, we also wish some form of continuity on the first variable. We state: Condition 4. (Continuity) Let B ∈ E (H) be give ...
... any sequential product will be convex in its second variable which, with a little work and our other assumptions, will grant continuity in the second variable automatically. However, we also wish some form of continuity on the first variable. We state: Condition 4. (Continuity) Let B ∈ E (H) be give ...
The Beh-MechaNiSM, iNTeracTioNS wiTh ShorT
... On July 4, 2012, CERN announced the long awaited discovery of a new fundamental particle with properties similar to those expected for the missing link of the Standard Model (SM) of particle physics, the Higgs boson. The discovery was made independently by two experimental collaborations – ATLAS and ...
... On July 4, 2012, CERN announced the long awaited discovery of a new fundamental particle with properties similar to those expected for the missing link of the Standard Model (SM) of particle physics, the Higgs boson. The discovery was made independently by two experimental collaborations – ATLAS and ...
Closed and Open String Theories in Non-Critical Backgrounds
... theory of gravity. Next we shall briefly describe the tool used to compute amplitudes for processes in this theory which is the two-dimensional quantum field theory living on the surface that a propagating string sweeps out in spacetime. We shall then turn to general conditions that this theory must ...
... theory of gravity. Next we shall briefly describe the tool used to compute amplitudes for processes in this theory which is the two-dimensional quantum field theory living on the surface that a propagating string sweeps out in spacetime. We shall then turn to general conditions that this theory must ...
Paper
... function – a complex probability amplitude. Our approach clarifies relation between classical and quantum statistical models (and hence relation between classical and quantum information theories). In particular, it can be considered as a step toward demystification of quantum theory. The notion of ...
... function – a complex probability amplitude. Our approach clarifies relation between classical and quantum statistical models (and hence relation between classical and quantum information theories). In particular, it can be considered as a step toward demystification of quantum theory. The notion of ...
Heavy gravitons on-shell decay of the Higgs boson at high
... Background (CMB) temperature anisotropy, suggest that our Universe is essentially flat and that it consists mainly of dark matter and dark energy [15]. A theory about the origin of dark matter and dark energy is to regard them as consisting of massive gravitons. There are indications that those mass ...
... Background (CMB) temperature anisotropy, suggest that our Universe is essentially flat and that it consists mainly of dark matter and dark energy [15]. A theory about the origin of dark matter and dark energy is to regard them as consisting of massive gravitons. There are indications that those mass ...
... Eq. (2) one finds that A commutes with H and, therefore, if A does not depend on the time, then A is conserved. It should be pointed out that Refs. 8 and 9 also consider the Galilean transformations, which are related to a constant of motion that depends explicitly on the time (see Sec. 3.1, below). ...
Basics of Open String Field Theory
... The discovery of D–branes has been a key element to understand that the five distinct string theories just mentioned above (plus a still not defined theory, dubbed M–Theory, whose low energy limit is eleven dimensional supergravity) are related to each others by suitable duality transformations. Thi ...
... The discovery of D–branes has been a key element to understand that the five distinct string theories just mentioned above (plus a still not defined theory, dubbed M–Theory, whose low energy limit is eleven dimensional supergravity) are related to each others by suitable duality transformations. Thi ...
Commentary_Basti
... domains, like as many SSB conditions of the quantum vacuum ground state, gives a new light to the Schrödinger notion of information as neghentropy in fundamental physics. “Neghentropy” is indeed “free energy”, that is energy “properly channeled” toward the “right places” where it can perform “work”. ...
... domains, like as many SSB conditions of the quantum vacuum ground state, gives a new light to the Schrödinger notion of information as neghentropy in fundamental physics. “Neghentropy” is indeed “free energy”, that is energy “properly channeled” toward the “right places” where it can perform “work”. ...
Generalized Entropies
... combination of Hmin and Hmax gives an expression for the classical capacity of a classical[29] or a quantum[30] channel, as well as its “reverse” capacity[31]. Additional applications can be found particularly in quantum cryptography (see, e.g., [8, 32, 33]). Smooth entropies also have operational i ...
... combination of Hmin and Hmax gives an expression for the classical capacity of a classical[29] or a quantum[30] channel, as well as its “reverse” capacity[31]. Additional applications can be found particularly in quantum cryptography (see, e.g., [8, 32, 33]). Smooth entropies also have operational i ...
Are Quantum States Exponentially Long Vectors?
... For me, the main weakness in the arguments of quantum computing skeptics has always been their failure to suggest an answer to the following question: what criterion separates the quantum states we’re sure we can prepare, from the states that arise in Shor’s factoring algorithm? I call such a criter ...
... For me, the main weakness in the arguments of quantum computing skeptics has always been their failure to suggest an answer to the following question: what criterion separates the quantum states we’re sure we can prepare, from the states that arise in Shor’s factoring algorithm? I call such a criter ...
Continuous Matrix Product States for Quantum Fields
... [1] and the density matrix renormalization group (DMRG) of White [2] revolutionized the way strongly correlated quantum systems can be simulated and understood. The applicability of those approaches has been better understood during the last 5 years by rephrasing those methods in terms of matrix pro ...
... [1] and the density matrix renormalization group (DMRG) of White [2] revolutionized the way strongly correlated quantum systems can be simulated and understood. The applicability of those approaches has been better understood during the last 5 years by rephrasing those methods in terms of matrix pro ...
Semiclassical methods in solid state physics : two examples
... phases approach reduces the problem to the case of independent charged particles in a lattice and a magnetic field. Even though this last approximation is questioned nowadays, it led many physicists to go back to the question of the 2D electronic lattice motion in a uniform magnetic ...
... phases approach reduces the problem to the case of independent charged particles in a lattice and a magnetic field. Even though this last approximation is questioned nowadays, it led many physicists to go back to the question of the 2D electronic lattice motion in a uniform magnetic ...
A phase-space study of the quantum Loschmidt Echo in the
... ~ L. Then we assume: (H2) L ∈ S(R2d ) if (H1) is satisfied, (H’2) L ∈ C0∞ (Ω) if (H’1) is satisfied, where C0∞ (Ω) is the linear space of C ∞ -smooth functions with compact support in Ω. Let us consider the time evolution unitary operator Uδ (t), in the Hilbert space H = L2 (Rd ), ...
... ~ L. Then we assume: (H2) L ∈ S(R2d ) if (H1) is satisfied, (H’2) L ∈ C0∞ (Ω) if (H’1) is satisfied, where C0∞ (Ω) is the linear space of C ∞ -smooth functions with compact support in Ω. Let us consider the time evolution unitary operator Uδ (t), in the Hilbert space H = L2 (Rd ), ...
Less reality more security
... recorded results were generated takes cryptography to an entirely different level, even when compared with the quantum “prepare and measure” cryptography [10]. Although the key distribution protocol is basically the same as the one I proposed some time ago [8] more recent work by Antonio Acı́n, Nico ...
... recorded results were generated takes cryptography to an entirely different level, even when compared with the quantum “prepare and measure” cryptography [10]. Although the key distribution protocol is basically the same as the one I proposed some time ago [8] more recent work by Antonio Acı́n, Nico ...
Tyaglov_Fourier_and_Real_Analysis_Syllabus_Form
... The course is introduction to the theory of Fourier series and transform as well as to the theory of Lebesque integration. Fundamental ideas and rigorous proof will be presented. Topics of the course to be covered include Fourier series, their convergence and applications, Poisson kernel, Cesaro and ...
... The course is introduction to the theory of Fourier series and transform as well as to the theory of Lebesque integration. Fundamental ideas and rigorous proof will be presented. Topics of the course to be covered include Fourier series, their convergence and applications, Poisson kernel, Cesaro and ...