Category:Quantum information theory
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Here is a list of articles in the category Quantum information theory of the Computing portal that unifies foundations of mathematics and computations using computers. Quantum information theory is a generalization of classical information theory to use quantum-mechanical particles and interference. It is used in the study of quantum computation and quantum cryptography.
Subcategories
This category has only the following subcategory.
Q
Pages in category "Quantum information theory"
The following 41 pages are in this category, out of 41 total.
B
- Bennett's laws (computing)
C
- Channel-state duality (computing)
- Choi–Jamiołkowski isomorphism (computing)
- Classical capacity (computing)
- Coherent information (computing)
- Time crystal (physics)
D
- Diamond norm (computing)
E
- Entanglement monotone (computing)
- Entanglement witness (computing)
G
- Gisin–Hughston–Jozsa–Wootters theorem (computing)
- Greenberger–Horne–Zeilinger state (computing)
H
- Hayden-Preskill thought experiment (computing)
- Holevo's theorem (computing)
J
- Joint quantum entropy (computing)
L
- Lieb-Robinson bounds (computing)
M
- Mutually unbiased bases (computing)
N
- No-teleportation theorem (computing)
- No-hiding theorem (computing)
P
- Path integral Monte Carlo (computing)
- Peres–Horodecki criterion (computing)
- POVM (computing)
Q
- Quantum capacity (computing)
- Quantum channel (computing)
- Quantum cognition (computing)
- Quantum complex network (computing)
- Quantum Computing Since Democritus (computing)
- Quantum depolarizing channel (computing)
- Quantum finite automata (computing)
- Quantum information (computing)
- Quantum mutual information (computing)
- Quantum relative entropy (computing)
- Quantum spin model (computing)
- Quantum memory (physics)
- Quantum steering (computing)
- Quantum t-design (physics)
S
- Schmidt decomposition (computing)
- SCOP formalism (computing)
- Solovay–Kitaev theorem (computing)
- Superoperator (computing)
T
- Typical subspace (computing)
W
- W state (computing)