nLab boundary conformal field theory

Redirected from "twisted sector".
Contents

Context

Quantum Field Theory

algebraic quantum field theory (perturbative, on curved spacetimes, homotopical)

Introduction

Concepts

field theory:

Lagrangian field theory

quantization

quantum mechanical system, quantum probability

free field quantization

gauge theories

interacting field quantization

renormalization

Theorems

States and observables

Operator algebra

Local QFT

Perturbative QFT

String theory

Contents

Idea

The study of conformal field theory on manifolds with boundary, hence conformal boundary field theory, is known as boundary conformal field theory (often abbreviated as BCFT).

For the special case of 2d CFT understood as the quantum field theory on the worldsheet of strings, boundary conformal field theory is the key ingredient of perturbative string theory with prescribed boundary conditions for the open strings. From the target spacetime-perspective these boundary conditions are interpreted as the D-branes that the open strings may “end on”.

In this way 2d BCFT can serve to give an algebraic definition of D-branes, independent of or complementary to their incarnation in the target-spacetime geometry. In particular fractional D-branes may be described this way as boundary conditions for the 2d CFTs describing open strings propagating in orbifolds.

A key tool of BCFT is the boundary state formalism, where one interprets boundary conditions for the open string as coherent states of the corresponding closed string 2d CFT. The physical interpretation of this algebraic fact is that the D-brane, being massive (see also at black brane) emits and absorbs gravitons, which, in string theory, are excitations of the closed string.

It has been argued that, therefore, for sigma-model 2d CFTs the classification of equivalence classes of BCFT boundary states under renormalization group flow should reproduce the expected classification of D-branes by the (equivariant, twisted K-theory) topological K-theory of the target spacetime (Moore 03, section 3).

While this gives, in principle, a precise algebraic definition of D-brane charge from the worldsheet-perspective, in practice it is hard to follow the renormalization group flow of the boundary states. The proposal has been checked in some special cases (e.g. Braun & Schaefer-Nameki 05). Other authors reported some discrepancies (Quiroz-Stefanski 01)

Specifically for fractional D-branes at GG-orbifold singularities the relevant boundary states are sums of boundary states for each “gg-twisted sector” of the closed string 2d CFT, consisting of those string configurations that are closed in the covering space up to the action of the element gGg \in G:

graphics grabbed from BCR 00

Here the coefficient of the gg-twisted sector in the total boundary state is proprotional to the value χ V(g)\chi_V(g) of the character χ V\chi_V of some GG-representation VR (G)=KU G(*)V \in R_{\mathbb{C}}(G) = KU_G(\ast) (e.g. Recknagel-Schomerus 13 (4.102)). This makes it plausible that the RG-flow-equivalence classes of the boundary states for fractional D-branes do coincide with the equivariant K-theory KU G(*)=R (G)KU_G(\ast) = R_{\mathbb{C}}(G) of the orbifold singularity (the representation ring of GG).

But maybe this has not yet been actually proven?

Results

There are some mistakes in the literature. A clean account is in Fuchs-Schweigert-Walcher 00, Fuchs-Kaste-Lerche-Lutken-Schweigert 00

Computer scan of Gepner-model compactifications

Discussion of string phenomenology of intersecting D-brane models KK-compactified with non-geometric fibers such that the would-be string sigma-models with these target spaces are in fact Gepner models (in the sense of Spectral Standard Model and String Compactifications) is in (Dijkstra-Huiszoon-Schellekens 04a, Dijkstra-Huiszoon-Schellekens 04b):

A plot of standard model-like coupling constants in a computer scan of Gepner model-KK-compactification of intersecting D-brane models according to Dijkstra-Huiszoon-Schellekens 04b.

The blue dot indicates the couplings in SU(5)SU(5)-GUT theory. The faint lines are NOT drawn by hand, but reflect increased density of Gepner models as seen by the computer scan.

singularityfield theory with singularities
boundary condition/braneboundary field theory
domain wall/bi-braneQFT with defects

References

General

The boundary state formalism in BCFT is due to

  • C. G. Callan, C. Lovelace, C. R. Nappi and S. A. Yost, Adding holes and crosscaps to the superstring, Nucl. Phys. B 293 (1987) 83 (doi:10.1016/0550-3213(87)90065-4)

  • C. G. Callan, C. Lovelace, C. R. Nappi and S. A. Yost, Loop corrections to superstring equations of motion, Nucl. Phys. B308 (1988) 221 (pdf)

  • N. Ishibashi, Boundary and Crosscap States in Conformal Field Theories, Mod. Phys. Lett. A4(1989) 251 (pdf)

  • N. Ishibashi and T. Onogi, Open string model building, Nucl. Phys. B318(1989) 239 (doi:10.1016/0550-3213(89)90054-0)

  • Dixon-Friedan-Martinec-Shenker 87

See also

Textbook accounts

Relation to K-theory

The suggestion that renormalization group flow-equivalence classes of boundary states in 2d BCFT should realize the expected classification of D-brane charge in (equivariant) topological K-theory apparntly goes back to

This has been checked in examples in

A mismatch was claimed in

For rational CFT, WZW models and Gepner models

For rational CFT, specifically Gepner models and WZW models

On orbifolds

Discussion specifically concerning fractional D-branes on orbifolds includes

Last revised on December 17, 2022 at 12:49:18. See the history of this page for a list of all contributions to it.