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- Topological_quantum_number abstract "In physics, a topological quantum number (also called topological charge) is any quantity, in a physical theory, that takes on only one of a discrete set of values, due to topological considerations. Most commonly, topological quantum numbers are topological invariants associated with topological defects or soliton-type solutions of some set of differential equations modeling a physical system, as the solitons themselves owe their stability to topological considerations. The specific "topological considerations" are usually due to the appearance of the fundamental group or a higher-dimensional homotopy group in the description of the problem, quite often because the boundary, on which the boundary conditions are specified, has a non-trivial homotopy group that is preserved by the differential equations. The topological quantum number of a solution is sometimes called the winding number of the solution, or, more precisely, it is the degree of a continuous mapping.Recent ideas about the nature of phase transitions indicates that topological quantum numbers, and their associated solitons, can be created or destroyed during a phase transition.".
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- Topological_quantum_number wikiPageRevisionID "678783860".
- Topological_quantum_number wikiPageWikiLink 3-sphere.
- Topological_quantum_number wikiPageWikiLink Baryon_number.
- Topological_quantum_number wikiPageWikiLink Boundary_conditions.
- Topological_quantum_number wikiPageWikiLink Boundary_value_problem.
- Topological_quantum_number wikiPageWikiLink Category:Exactly_solvable_models.
- Topological_quantum_number wikiPageWikiLink Category:Quantum_field_theory.
- Topological_quantum_number wikiPageWikiLink Category:Quantum_mechanics.
- Topological_quantum_number wikiPageWikiLink Category:Solitons.
- Topological_quantum_number wikiPageWikiLink Central_charge.
- Topological_quantum_number wikiPageWikiLink Closure_(mathematics).
- Topological_quantum_number wikiPageWikiLink Degree_of_a_continuous_mapping.
- Topological_quantum_number wikiPageWikiLink Differential_equation.
- Topological_quantum_number wikiPageWikiLink Dislocation.
- Topological_quantum_number wikiPageWikiLink Exactly_solvable_model.
- Topological_quantum_number wikiPageWikiLink Fermion.
- Topological_quantum_number wikiPageWikiLink Fermions.
- Topological_quantum_number wikiPageWikiLink Fundamental_group.
- Topological_quantum_number wikiPageWikiLink Germanium.
- Topological_quantum_number wikiPageWikiLink Germanium_whisker.
- Topological_quantum_number wikiPageWikiLink Homotopy_group.
- Topological_quantum_number wikiPageWikiLink Integrable_system.
- Topological_quantum_number wikiPageWikiLink Inverse_scattering_transform.
- Topological_quantum_number wikiPageWikiLink Ishimori_equation.
- Topological_quantum_number wikiPageWikiLink Isospin.
- Topological_quantum_number wikiPageWikiLink Korteweg–de_Vries_equation.
- Topological_quantum_number wikiPageWikiLink Max_Planck.
- Topological_quantum_number wikiPageWikiLink Particle_physics.
- Topological_quantum_number wikiPageWikiLink Phase_transition.
- Topological_quantum_number wikiPageWikiLink Physics.
- Topological_quantum_number wikiPageWikiLink Planck.
- Topological_quantum_number wikiPageWikiLink Quantum_topology.
- Topological_quantum_number wikiPageWikiLink Renormalization.
- Topological_quantum_number wikiPageWikiLink SU(2).
- Topological_quantum_number wikiPageWikiLink Screw_dislocation.
- Topological_quantum_number wikiPageWikiLink Sine-Gordon_equation.
- Topological_quantum_number wikiPageWikiLink Skyrmion.
- Topological_quantum_number wikiPageWikiLink Solid-state_physics.
- Topological_quantum_number wikiPageWikiLink Solid_state_physics.
- Topological_quantum_number wikiPageWikiLink Soliton.
- Topological_quantum_number wikiPageWikiLink Special_unitary_group.
- Topological_quantum_number wikiPageWikiLink Thirring_model.
- Topological_quantum_number wikiPageWikiLink Topological_defect.
- Topological_quantum_number wikiPageWikiLink Topological_entropy_in_physics.
- Topological_quantum_number wikiPageWikiLink Topological_invariant.
- Topological_quantum_number wikiPageWikiLink Topological_order.
- Topological_quantum_number wikiPageWikiLink Topological_property.
- Topological_quantum_number wikiPageWikiLink Topological_quantum_field_theory.
- Topological_quantum_number wikiPageWikiLink Topological_string_theory.
- Topological_quantum_number wikiPageWikiLink Topology.
- Topological_quantum_number wikiPageWikiLink Wess-Zumino-Witten_model.
- Topological_quantum_number wikiPageWikiLink Wess–Zumino–Witten_model.
- Topological_quantum_number wikiPageWikiLink Winding_number.
- Topological_quantum_number wikiPageWikiLinkText "Topological quantum number".
- Topological_quantum_number wikiPageWikiLinkText "topological index".
- Topological_quantum_number wikiPageWikiLinkText "topological quantum number".
- Topological_quantum_number hasPhotoCollection Topological_quantum_number.
- Topological_quantum_number wikiPageUsesTemplate Template:Citation_needed.
- Topological_quantum_number wikiPageUsesTemplate Template:Cite_book.
- Topological_quantum_number wikiPageUsesTemplate Template:Expert-subject.
- Topological_quantum_number wikiPageUsesTemplate Template:When.
- Topological_quantum_number subject Category:Exactly_solvable_models.
- Topological_quantum_number subject Category:Quantum_field_theory.
- Topological_quantum_number subject Category:Quantum_mechanics.
- Topological_quantum_number subject Category:Solitons.
- Topological_quantum_number type Article.
- Topological_quantum_number type Model.
- Topological_quantum_number type Article.
- Topological_quantum_number type Mechanic.
- Topological_quantum_number type Model.
- Topological_quantum_number type Physic.
- Topological_quantum_number comment "In physics, a topological quantum number (also called topological charge) is any quantity, in a physical theory, that takes on only one of a discrete set of values, due to topological considerations. Most commonly, topological quantum numbers are topological invariants associated with topological defects or soliton-type solutions of some set of differential equations modeling a physical system, as the solitons themselves owe their stability to topological considerations.".
- Topological_quantum_number label "Topological quantum number".
- Topological_quantum_number sameAs Número_cuántico_topológico.
- Topological_quantum_number sameAs Carica_topologica.
- Topological_quantum_number sameAs m.07ybq8.
- Topological_quantum_number sameAs Топологическое_квантовое_число.
- Topological_quantum_number sameAs Q634781.
- Topological_quantum_number sameAs Q634781.
- Topological_quantum_number wasDerivedFrom Topological_quantum_number?oldid=678783860.
- Topological_quantum_number isPrimaryTopicOf Topological_quantum_number.