Quantum topology information

Quantum topology is a branch of mathematics that connects quantum mechanics with low-dimensional topology. Dirac notation provides a viewpoint of quantum...

Topology (from the Greek words τόπος, 'place, location', and λόγος, 'study') is the part of mathematics concerned with the properties of a geometric object...

Witten-type TQFT. Quantum topology Topological defect Topological entropy in physics Topological order Topological quantum number Topological quantum computer...

theory of quantum groups and in quantum topology. He and Vladimir Turaev constructed invariants of 3-manifolds which are expected to describe quantum Chern-Simons...

Dislocation Quantum mechanics Quantum topology Quantum vortex Topological entropy in physics Topological manifold Topological order Topological quantum field...

In topology, knot theory is the study of mathematical knots. While inspired by knots which appear in daily life, such as those in shoelaces and rope, a...

Computational topology Digital topology Network topology Topological computing Topological Quantum Computing Topological quantum computer Combinatorial topology Counterexamples...

Central charge Quantum invariant Quantum topology Topological defect Topological entropy in physics Topological order Topological quantum field theory Topological...

i}{24}}\left(b^{2}+b^{-2}\right)}.} The quantum dilogarithm finds applications in mathematical physics, quantum topology, cluster algebra theory. The precise...

dependent on the topology of the materials' bulk wave functions, etc. Quantum anomalies such as the chiral magnetic effect link some quantum materials with...

research deals with low-dimensional topology, quantum topology, and knot theory and their interconnections with quantum field theory. In 1991, Reshetikhin...

of all quantum physics, which includes quantum chemistry, quantum field theory, quantum technology, and quantum information science. Quantum mechanics...

Algebraic topology is a branch of mathematics that uses tools from abstract algebra to study topological spaces. The basic goal is to find algebraic invariants...

Algorithmic topology, or computational topology, is a subfield of topology with an overlap with areas of computer science, in particular, computational...

derivations require a fixed choice of the topology, while any consistent quantum theory of gravity should include topology change as a dynamical process.[citation...

of Illinois at Chicago. He does research in topology, knot theory, topological quantum field theory, quantum information theory, and diagrammatic and categorical...

Homotopical algebra; Topology using categories, including algebraic topology, categorical topology, quantum topology, low-dimensional topology; Categorical logic...

H. (2004). "Hyperbolic Universes with a Horned Topology and the CMB Anisotropy". Classical and Quantum Gravity. 21 (21): 4901–4926. arXiv:astro-ph/0403597...

This list contains quantum processors, also known as quantum processing units (QPUs). Some devices listed below have only been announced at press conferences...

topological quantum field theory, which can be used to compute topological invariants of smooth spaces. Famous theorems in differential topology include the...

(2011), A Bibliography for Categories and Algebraic Topology Applications in Theoretical Physics Quantum Algebraic Topology (QAT)[permanent dead link]...

Kuratowski closure axioms (topology) Peano's axioms (natural numbers) Probability axioms Separation axiom (topology) Wightman axioms (quantum field theory) Action...

Institute of Professional Development and Retraining Laboratory of Quantum Topology Management Faculty Russian language Courses Faculty of Eurasia and...

other mathematicians to explore hidden algebraic structures in topology and in quantum field theory. Interview at MIPT (in Russian)：https://vk...

Mathematica Publications of the Research Institute for Mathematical Sciences Quantum Topology Rendiconti del Seminario Matematico della Università di Padova Rendiconti...

Ehresmann's theorem (differential topology) Eilenberg–Zilber theorem (algebraic topology) Elitzur's theorem (quantum field theory, statistical field theory)...

In mathematics, nonabelian algebraic topology studies an aspect of algebraic topology that involves (inevitably noncommutative) higher-dimensional algebras...