Quantum Energy–based P Systems - Computational Biology and
... set {|x1 , . . . , xn i : xi ∈ Ld } of all n–configurations is an orthonormal basis of this space, called the n–register computational basis. Notice that the set Ld can also be interpreted as a set of truth values, where 0 denotes falsity, 1 denotes truth and the other elements indicate different de ...
... set {|x1 , . . . , xn i : xi ∈ Ld } of all n–configurations is an orthonormal basis of this space, called the n–register computational basis. Notice that the set Ld can also be interpreted as a set of truth values, where 0 denotes falsity, 1 denotes truth and the other elements indicate different de ...
How Quantum Theory Helps us Explain
... particular circumstances and able to reason from them. But critics have objected that such an argument is genuinely explanatory only if its premises state what caused the phenomenon, where it is assumed that any cause of an instance of the phenomenon bears an asymmetric relation of causal influence ...
... particular circumstances and able to reason from them. But critics have objected that such an argument is genuinely explanatory only if its premises state what caused the phenomenon, where it is assumed that any cause of an instance of the phenomenon bears an asymmetric relation of causal influence ...
“Anticoherent” Spin States via the Majorana Representation
... In the foregoing sections, we exhibited anticoherent states for all integral spin quantum numbers s ≥ 2. For s = 1/2, s = 1, and s = 3/2, it is possible to show that no anticoherent states exist.[13] In general, one expects anticoherent states to exist for all s ≥ 2, based on the following count of ...
... In the foregoing sections, we exhibited anticoherent states for all integral spin quantum numbers s ≥ 2. For s = 1/2, s = 1, and s = 3/2, it is possible to show that no anticoherent states exist.[13] In general, one expects anticoherent states to exist for all s ≥ 2, based on the following count of ...
Classification of completely positive maps
... Without going into the full details of the remarkable range of quantum phenomena, to say the least the world of quantum mechanics is very strange and different from the “classical” world in which we live most directly. Famous and confirmed phenomena include particles tunneling through walls, telepor ...
... Without going into the full details of the remarkable range of quantum phenomena, to say the least the world of quantum mechanics is very strange and different from the “classical” world in which we live most directly. Famous and confirmed phenomena include particles tunneling through walls, telepor ...
Two constructions of quantum graphs and two types of
... scattering matrix in [21]). The matrix D(λ) is an explicitly specified diagonal matrix. We describe the above constructions in more detail in Section 2. A simple but important question is whether the two constructions are fully analogous. A straightforward observation is that most authors, when usin ...
... scattering matrix in [21]). The matrix D(λ) is an explicitly specified diagonal matrix. We describe the above constructions in more detail in Section 2. A simple but important question is whether the two constructions are fully analogous. A straightforward observation is that most authors, when usin ...
Quantum dynamics of cold trapped ions with application to quantum
... in a network of quantum mechanical two-level systems, such as spin-1/2 particles or two-level atoms. The quantum mechanical nature of such systems allows the possibility of a powerful new feature to be incorporated into data processing, namely, the capability of performing logical operations upon qu ...
... in a network of quantum mechanical two-level systems, such as spin-1/2 particles or two-level atoms. The quantum mechanical nature of such systems allows the possibility of a powerful new feature to be incorporated into data processing, namely, the capability of performing logical operations upon qu ...
Qubit metrology for building a fault-tolerant quantum
... can vary in amplitude, duration and frequency. More fundamentally, the Heisenberg uncertainty principle states that it is impossible to directly stabilise a single qubit as any measurement of a bit-flip error will produce a random flip in phase. The key to quantum error correction is measuring qubit p ...
... can vary in amplitude, duration and frequency. More fundamentally, the Heisenberg uncertainty principle states that it is impossible to directly stabilise a single qubit as any measurement of a bit-flip error will produce a random flip in phase. The key to quantum error correction is measuring qubit p ...
Quantum connection and Poincare19 e-
... spacetime and the cosymplectic form. Our analysis of Poincaré–Cartan forms plays a key role in the proof of the theorem. We end the introduction with some mathematical conventions. In this paper, all manifolds and maps between manifolds are C ∞ . As for sheaves, we shall use the definitions and the ...
... spacetime and the cosymplectic form. Our analysis of Poincaré–Cartan forms plays a key role in the proof of the theorem. We end the introduction with some mathematical conventions. In this paper, all manifolds and maps between manifolds are C ∞ . As for sheaves, we shall use the definitions and the ...
