# C-theorem

C-theorem In quantum field theory the C-theorem states that there exists a positive real function, {Anzeigestil C(g_{ich}^{},in )} , depending on the coupling constants of the quantum field theory considered, {Anzeigestil g_{ich}^{}} , and on the energy scale, {displaystyle ihn _{}^{}} , which has the following properties: {Anzeigestil C(g_{ich}^{},in )} decreases monotonically under the renormalization group (RG) flow. At fixed points of the RG flow, which are specified by a set of fixed-point couplings {Anzeigestil g_{ich}^{*}} , die Funktion {Anzeigestil C(g_{ich}^{*},in )=C_{*}} is a constant, independent of energy scale.

The theorem formalizes the notion that theories at high energies have more degrees of freedom than theories at low energies and that information is lost as we flow from the former to the latter.

Inhalt 1 Two-dimensional case 2 Four-dimensional case: A-theorem 3 Siehe auch 4 References Two-dimensional case Alexander Zamolodchikov proved in 1986 that two-dimensional quantum field theory always has such a C-function. Darüber hinaus, at fixed points of the RG flow, which correspond to conformal field theories, Zamolodchikov's C-function is equal to the central charge of the corresponding conformal field theory,[1] which lends the name C to the theorem.

Four-dimensional case: A-theorem John Cardy in 1988 considered the possibility to generalise C-theorem to higher-dimensional quantum field theory. He conjectured[2] that in four spacetime dimensions, the quantity behaving monotonically under renormalization group flows, and thus playing the role analogous to the central charge c in two dimensions, is a certain anomaly coefficient which came to be denoted as a. Deshalb, the analog of the C-theorem in four dimensions is called the A-theorem.

In perturbation theory, that is for renormalization flows which do not deviate much from free theories, the A-theorem in four dimensions was proved by Hugh Osborn[3] using the local renormalization group equation. Jedoch, the problem of finding a proof valid beyond perturbation theory remained open for many years.

Im 2011, Zohar Komargodski and Adam Schwimmer of the Weizmann Institute of Science proposed a nonperturbative proof for the A-theorem, which has gained acceptance.[4][5] (Still, simultaneous monotonic and cyclic (limit cycle) or even chaotic RG flows are compatible with such flow functions when multivalued in the couplings, as evinced in specific systems.[6]) RG flows of theories in 4 dimensions and the question of whether scale invariance implies conformal invariance, is a field of active research and not all questions are settled.

See also Conformal field theory References ^ Zamolodchikov, EIN. B. (1986). ""Irreversibility" of the Flux of the Renormalization Group in a 2-D Field Theory" (Pdf). JETP Lett. 43: 730–732. Bibcode:1986JETPL..43..730Z. ^ Cardy, John (1988). "Is there a c-theorem in four dimensions?". Physics Letters B. 215 (4): 749–752. Bibcode:1988PhLB..215..749C. doi:10.1016/0370-2693(88)90054-8. ^ Osborn, Hugh (1989). "Derivation of a Four-Dimensional c Theorem". Physics Letters B. 222 (1): 97. Bibcode:1989PhLB..222...97O. doi:10.1016/0370-2693(89)90729-6. Jan, Jack; Osborn, Hugh (1990). "Analogs for the c Theorem for Four-Dimensional Renormalizable Field Theories". Nuclear Physics B. 343 (3): 647–688. Bibcode:1990NuPhB.343..647J. doi:10.1016/0550-3213(90)90584-Z. ^ Reich, E. S. (2011). "Proof found for unifying quantum principle". Natur. doi:10.1038/nature.2011.9352. ^ Komargodski, Z.; Schwimmer, EIN. (2011). "On renormalization group flows in four dimensions". Journal of High Energy Physics. 2011 (12): 99. arXiv:1107.3987. Bibcode:2011JHEP...12..099K. doi:10.1007/JHEP12(2011)099. ^ Curtright, T.; Jin, X.; Zachos, C. (2012). "Renormalization Group Flows, Cycles, and c-Theorem Folklore". Briefe zur körperlichen Überprüfung. 108 (13): 131601. arXiv:1111.2649. Bibcode:2012PhRvL.108m1601C. doi:10.1103/PhysRevLett.108.131601. PMID 22540692. Kategorien: Conformal field theoryRenormalization groupMathematical physicsTheorems in quantum mechanics

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