On the Rank of the Reduced Density Symmetric Polynomials Babak Majidzadeh Garjani
... Landau’s theory is very successful in explaining phases and the transitions between them. However, Landau’s theory does not capture all phases of matter. As is explained in Chapter 2 in more detail, the German physicist Klaus von Klitzing found that at low temperatures, and in a strong magnetic fiel ...
... Landau’s theory is very successful in explaining phases and the transitions between them. However, Landau’s theory does not capture all phases of matter. As is explained in Chapter 2 in more detail, the German physicist Klaus von Klitzing found that at low temperatures, and in a strong magnetic fiel ...
Disorder and entropy rate in discrete time quantum walks
... to quantify the entanglement also allows for studying the thermodynamical aspects of quantum walks [67, 68]. Similarly to transport [39–43], perfect state transfer [69] can be understood in terms of quantum walks. Decoherence in quantum walks can also lead to interesting behaviors, for a review see ...
... to quantify the entanglement also allows for studying the thermodynamical aspects of quantum walks [67, 68]. Similarly to transport [39–43], perfect state transfer [69] can be understood in terms of quantum walks. Decoherence in quantum walks can also lead to interesting behaviors, for a review see ...
Spin-current-induced charge accumulation and electric
... Besides, we notice that the electric effects induced by different spin currents are actually contributed by different ranks of power with respect to ␣, which is also manifested when the sign of ␣ is reversed. Specifically, when the spin current is polarized along x̂ or ŷ, it is mainly the linear ␣ ...
... Besides, we notice that the electric effects induced by different spin currents are actually contributed by different ranks of power with respect to ␣, which is also manifested when the sign of ␣ is reversed. Specifically, when the spin current is polarized along x̂ or ŷ, it is mainly the linear ␣ ...
Quantum Error Correction (QEC) - ETH E
... topic is already very profound. But it is still a hot topic for scientists. This paper is not a general introduction in quantum computation. It focuses on the aspect of quantum error correction and requires basic understandings of quantum mechanics, classical computation and a bit group theory. Anyw ...
... topic is already very profound. But it is still a hot topic for scientists. This paper is not a general introduction in quantum computation. It focuses on the aspect of quantum error correction and requires basic understandings of quantum mechanics, classical computation and a bit group theory. Anyw ...
Local unitary transformation, long-range quantum
... reversal and parity symmetries but not the spin rotation symmetry.11 However, it was quickly realized that there are many different chiral spin states that have exactly the same symmetry, so symmetry alone is not enough to characterize different chiral spin states. This means that the chiral spin st ...
... reversal and parity symmetries but not the spin rotation symmetry.11 However, it was quickly realized that there are many different chiral spin states that have exactly the same symmetry, so symmetry alone is not enough to characterize different chiral spin states. This means that the chiral spin st ...
Transport Properties of Interacting Edge Modes in 2D Topological
... with in-plane coupled to Kondo impurities. It is shown, that the conductance is still ideal as long as the coupling between electrons and spins is isotropic in the plane, so that the total sz component of electrons and spins is conserved. In contrast, it vanishes, if one adds random anisotropy, whic ...
... with in-plane coupled to Kondo impurities. It is shown, that the conductance is still ideal as long as the coupling between electrons and spins is isotropic in the plane, so that the total sz component of electrons and spins is conserved. In contrast, it vanishes, if one adds random anisotropy, whic ...
Stochastic thermodynamics: A brief introduction
... on this occasion will be most useful in stochastic thermodynamics. Prigogine introduced the concepts of entropy flow and entropy production. Entropy flow is the contribution to the entropy change due to the (reversible) exchange with the environment. Entropy production is an additional entropy increas ...
... on this occasion will be most useful in stochastic thermodynamics. Prigogine introduced the concepts of entropy flow and entropy production. Entropy flow is the contribution to the entropy change due to the (reversible) exchange with the environment. Entropy production is an additional entropy increas ...
Quantum Money from Hidden Subspaces
... These early ideas about quantum money inspired the field of quantum cryptography [13]. But strangely, the subject of quantum money itself lay dormant for more than two decades, even as interest in quantum computing exploded. However, the past few years have witnessed a “quantum money renaissance.” ...
... These early ideas about quantum money inspired the field of quantum cryptography [13]. But strangely, the subject of quantum money itself lay dormant for more than two decades, even as interest in quantum computing exploded. However, the past few years have witnessed a “quantum money renaissance.” ...
Entropy - Molecular Diversity Preservation International
... By "appropriately associated with a given concept", we mean an interpretation leading to correct predictions of the observed phenomena, and allowing a better understanding of the underlying equations. For instance, connecting entropy with lack of information is meaningful when studying the evolution ...
... By "appropriately associated with a given concept", we mean an interpretation leading to correct predictions of the observed phenomena, and allowing a better understanding of the underlying equations. For instance, connecting entropy with lack of information is meaningful when studying the evolution ...
Aggregation Operations from Quantum Computing
... The non well-defined borders sets called fuzzy sets (FS) were introduced in order to overcome the fact that classical sets present limitations to deal with problems where the transitions from one class to another happen smoothly. The definition, properties and operations of FSs are obtained from the ...
... The non well-defined borders sets called fuzzy sets (FS) were introduced in order to overcome the fact that classical sets present limitations to deal with problems where the transitions from one class to another happen smoothly. The definition, properties and operations of FSs are obtained from the ...
