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- Quantum_no-deleting_theorem abstract "In physics, the no-deleting theorem of quantum information theory is a no-go theorem which states that, in general, given two copies of some arbitrary quantum state, it is impossible to delete one of the copies. It is a time-reversed dual to the no-cloning theorem, which states that arbitrary states cannot be copied. This theorem seems remarkable, because, in many senses, quantum states are fragile; the theorem asserts that, in a particular case, they are also robust. Physicist Arun K. Pati along with Samuel L. Braunstein proved this theorem.The no-deleting theorem, together with the no-cloning theorem, underpin the interpretation of quantum mechanics in terms of category theory, and, in particular, as a dagger symmetric monoidal category. This formulation, known as categorical quantum mechanics, in turn allows a connection to be made from quantum mechanics to linear logic as the logic of quantum information theory (in exact analogy to classical logic being founded on Cartesian closed categories.)".
- Quantum_no-deleting_theorem wikiPageID "19092774".
- Quantum_no-deleting_theorem wikiPageLength "7519".
- Quantum_no-deleting_theorem wikiPageOutDegree "32".
- Quantum_no-deleting_theorem wikiPageRevisionID "706137304".
- Quantum_no-deleting_theorem wikiPageWikiLink Arun_K._Pati.
- Quantum_no-deleting_theorem wikiPageWikiLink Cartesian_closed_category.
- Quantum_no-deleting_theorem wikiPageWikiLink Categorical_quantum_mechanics.
- Quantum_no-deleting_theorem wikiPageWikiLink Category:Quantum_information_science.
- Quantum_no-deleting_theorem wikiPageWikiLink Category_theory.
- Quantum_no-deleting_theorem wikiPageWikiLink Dagger_symmetric_monoidal_category.
- Quantum_no-deleting_theorem wikiPageWikiLink EPR_paradox.
- Quantum_no-deleting_theorem wikiPageWikiLink Hilbert_space.
- Quantum_no-deleting_theorem wikiPageWikiLink Linear_logic.
- Quantum_no-deleting_theorem wikiPageWikiLink No-broadcast_theorem.
- Quantum_no-deleting_theorem wikiPageWikiLink No-cloning_theorem.
- Quantum_no-deleting_theorem wikiPageWikiLink No-communication_theorem.
- Quantum_no-deleting_theorem wikiPageWikiLink No-go_theorem.
- Quantum_no-deleting_theorem wikiPageWikiLink No-hiding_theorem.
- Quantum_no-deleting_theorem wikiPageWikiLink Physics.
- Quantum_no-deleting_theorem wikiPageWikiLink Quantum_cloning.
- Quantum_no-deleting_theorem wikiPageWikiLink Quantum_computing.
- Quantum_no-deleting_theorem wikiPageWikiLink Quantum_entanglement.
- Quantum_no-deleting_theorem wikiPageWikiLink Quantum_information.
- Quantum_no-deleting_theorem wikiPageWikiLink Quantum_information_science.
- Quantum_no-deleting_theorem wikiPageWikiLink Quantum_mechanics.
- Quantum_no-deleting_theorem wikiPageWikiLink Quantum_state.
- Quantum_no-deleting_theorem wikiPageWikiLink Quantum_teleportation.
- Quantum_no-deleting_theorem wikiPageWikiLink Qubit.
- Quantum_no-deleting_theorem wikiPageWikiLink Samuel_L._Braunstein.
- Quantum_no-deleting_theorem wikiPageWikiLink Uncertainty_principle.
- Quantum_no-deleting_theorem wikiPageWikiLinkText "Quantum no-deleting theorem".
- Quantum_no-deleting_theorem wikiPageWikiLinkText "Quantum_no-deleting_theorem".
- Quantum_no-deleting_theorem wikiPageWikiLinkText "quantum no-deleting theorem".
- Quantum_no-deleting_theorem wikiPageUsesTemplate Template:Reflist.
- Quantum_no-deleting_theorem subject Category:Quantum_information_science.
- Quantum_no-deleting_theorem hypernym Theorem.
- Quantum_no-deleting_theorem type Mechanic.
- Quantum_no-deleting_theorem comment "In physics, the no-deleting theorem of quantum information theory is a no-go theorem which states that, in general, given two copies of some arbitrary quantum state, it is impossible to delete one of the copies. It is a time-reversed dual to the no-cloning theorem, which states that arbitrary states cannot be copied. This theorem seems remarkable, because, in many senses, quantum states are fragile; the theorem asserts that, in a particular case, they are also robust. Physicist Arun K.".
- Quantum_no-deleting_theorem label "Quantum no-deleting theorem".
- Quantum_no-deleting_theorem sameAs Q7269076.
- Quantum_no-deleting_theorem sameAs m.04jhjxp.
- Quantum_no-deleting_theorem sameAs Q7269076.
- Quantum_no-deleting_theorem wasDerivedFrom Quantum_no-deleting_theorem?oldid=706137304.
- Quantum_no-deleting_theorem isPrimaryTopicOf Quantum_no-deleting_theorem.