J
2019
Massless bosons on domain walls: Jackiw-Rebbi-like mechanism for bosonic fields
MASATO, Arai, Filip BLASCHKE, Minoru ETO and Norisuke SAKAI
Basic information
Original name
Massless bosons on domain walls: Jackiw-Rebbi-like mechanism for bosonic fields
Authors
MASATO, Arai (392 Japan),
Filip BLASCHKE (203 Czech Republic, guarantor, belonging to the institution), Minoru ETO (392 Japan) and Norisuke SAKAI (392 Japan)
Edition
Physical Review D, 2019, 2470-0010
Other information
Type of outcome
Článek v odborném periodiku
Field of Study
10303 Particles and field physics
Country of publisher
United States of America
Confidentiality degree
není předmětem státního či obchodního tajemství
RIV identification code
RIV/47813059:19240/19:A0000434
Organization unit
Faculty of Philosophy and Science in Opava
Keywords in English
domain walls; massless bosons; bosonic fields; Jackiw-Rebbi-like mechanism
Tags
International impact, Reviewed
Links
GB14-37086G, research and development project.
V originále
It is important to obtain (nearly) massless localized modes for the low-energy four-dimensional effective field theory in the brane-world scenario. We propose a mechanism for bosonic zero modes using the field-dependent kinetic function in the classical field theory setup. As a particularly simple case, we consider a domain wall in five dimensions and show that massless states for scalar (0-form), vector (1-form), and tensor (2-form) fields appear on a domain wall, which may be called topological because of the robustness of their existence (insensitive to continuous deformations of parameters). The spin of localized massless bosons is selected by the shape of the nonlinear kinetic function, analogously to the chirality selection of the fermion by the well-known Jackiw-Rebbi mechanism. Several explicitly solvable examples are given. We consider not only (anti) Bogomol’nyi-Prasad-Sommerfield (BPS) domain walls in a noncompact extra dimension but also non-BPS domain walls in a compact extra dimension.
Displayed: 16/11/2024 12:17