Particle theory

Boundary Logarithmic Conformal Field Theory

ArXiv hep-th/0003184 (2000)

Authors:

Ian I Kogan, John F Wheater

Abstract:

We discuss the effect of boundaries in boundary logarithmic conformal field theory and show, with reference to both $c=-2$ and $c=0$ models, how they produce new features even in bulk correlation functions which are not present in the corresponding models without boundaries. We discuss the modification of Cardy's relation between boundary states and bulk quantities.

Boundary Logarithmic Conformal Field Theory

(2000)

Authors:

Ian I Kogan, John F Wheater

Resummation of thrust distributions in DIS

Journal of High Energy Physics Springer Nature 2000:02 (2000) 001

Authors:

Vito Antonelli, Mrinal Dasgupta, Gavin P Salam

Compact Hyperbolic Extra Dimensions: Branes, Kaluza-Klein Modes and Cosmology

(2000)

Authors:

Nemanja Kaloper, John March-Russell, Glenn D Starkman, Mark Trodden

Boundary inflation

Physical Review D - Particles, Fields, Gravitation and Cosmology 61:2 (2000)

Abstract:

Inflationary solutions are constructed in a specific five-dimensional model with boundaries motivated by heterotic M theory. We concentrate on the case where the vacuum energy is provided by potentials on those boundaries. It is pointed out that the presence of such potentials necessarily excites bulk fields. We distinguish a linear and a non-linear regime for those modes. In the linear regime, inflation can be discussed in an effective four-dimensional theory in the conventional way. This effective action is derived by integrating out the bulk modes. Therefore, these modes do not give rise to excited Kaluza-Klein modes from a four-dimensional perspective. We lift a four-dimensional inflating solution up to five dimensions where it represents an inflating domain wall pair. This shows explicitly the inhomogeneity in the fifth dimension. We also demonstrate the existence of inflating solutions with unconventional properties in the non-linear regime. Specifically, we find solutions with and without an horizon between the two boundaries. These solutions have certain problems associated with the stability of the additional dimension and the persistence of initial excitations of the Kaluza-Klein modes. © 1999 The American Physical Society.