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Bose-Einstein condensates with balanced gain and loss

IS THERE A UNIQUE PHYSICAL ENTROPY? MICRO VERSUS

The Polarizable Continuum Model Goes Viral! - Munin

... needed to understand and predict the physics and chemistry of such complex systems is still an open question. I will present our efforts in answering this question based on the development of the polarizable continuum model for solvation. While the solute is described by a quantum mechanical method, ...

Introduction to Quantum Fields in Curved Spacetime

Axiomatic description of mixed states from Selinger`s CPM

... underlying JSV-trace in some other categories they enjoy an autonomous existence. This same idea can also be implemented at the level of graphical calculus. While the passage from †-symmetric monoidal to †-compact introduces for each type a new primitive ingredient, e.g. ‘pink triangle’ in [4], whic ...

Multipartite entanglement, quantum- error

... whenever |S| = m. Thus |ψi is m-uniform and Qm (ψ) = 1. Note that any state |ψi ∈ Q, where Q is a pure ((n, K, m + 1))D QECC, is itself an ((n, 1, m + 1))D QECC. Consequently, pure ((n, K, m + 1))D codes define entire subspaces of maximally entangled states. The connection between quantum codes an ...

Constant-Time LCA Retrieval

Heisenberg Spin Chains : from Quantum Groups to

Quantum Biology at the Cellular Level

Chapter 3. Foundations of Quantum Theory II

... where the operators {M a } obey the completeness relation eq.(3.25). Being linear, E acts as in eq.(3.32) not just on pure states, but on any density operator. A linear map of the form eq.(3.32), where the {M a } obey eq.(3.25), is called a quantum channel. The word “channel” is drawn from communica ...

(pdf)

... the domain of H is in L2 (Rn ), but the image of H must also be in L2 (Rn ). This means that the second derivatives should also be in L2 (Rn ) due to the Laplacian. The following construction creates a natural space in which this should occur. Definition 2.1. Let α = (α1 , . . . , αn ) be an n-tuple ...

Codes and designs for quantum error correction

... decoded by the sum-product algorithm. Such linear codes with sparse parity-check matrices suited for iterative decoding are called low-density parity-check (LDPC) codes. In this section we give a brief summary of how combinatorial designs have been applied to LDPC codes in the context of quantum err ...

Current State of Quantum Computing

Extended criticality, phase spaces and enablement in biology

... As a matter of fact, Poincaré’s analysis of chaotic dynamics was essentially based on his invention of the socalled Poincaré section (analyze planetary orbits only by their crossing a given plane) and by the use of momentum as a key observable. In his analysis of chaoticity, stable and unstable tr ...

Renormalization Group Flows for Quantum Gravity

Quantum coding with finite resources

The minimum mass of a charged spherically symmetric object

... quantum theory, and MLURs predicted by phenomenological quantum gravity, the identification (15) can be explicitly obtained by saturation of the quantum gravitational stability condition for the electron. Furthermore, our results show this identification to be broadly consistent with the results obt ...

progress in quantum foundations - Department of Computer Science

... macroscopically distinguishable initializations and outcomes expressed in classical terms. In this operational interpretation, the only role of a physical theory is to provide a minimal explanation of experimental phenomena. This can generally be done by providing a description of physical preparati ...

Energy loss by a fast charged particle moving parallel to a surface

... of reaction cross sections in different inelastic channels can occur already in a semi-infinite medium. Here new physical The surface of the medium is responsible for a number of properties of the inelastic scattering of fast particles inter- effects can arise. An interesting fact which develops is ...

Mean-field limit of Bose systems: rigorous results

Overview of Hamiltonian Systems

... Integrability of a Hamiltonian system plays an enormous role in the perturbation of that system. In fact, as it will be discussed in the following section, chaos can occur when a system becomes perturbed. Thus, integrability of a system is a necessary factor when studying Hamiltonian systems. Furthe ...