One-point Functions in AdS/dCFT and Integrability

Niels Bohr Institutet

One-point Functions in AdS/dCFT and Integrability

Publikation: Bog/antologi/afhandling/rapport › Ph.d.-afhandling

Standard

One-point Functions in AdS/dCFT and Integrability. / Buhl-Mortensen, Isak.

The Niels Bohr Institute, Faculty of Science, University of Copenhagen, 2017.

Publikation: Bog/antologi/afhandling/rapport › Ph.d.-afhandling

Harvard

Buhl-Mortensen, I 2017, One-point Functions in AdS/dCFT and Integrability. The Niels Bohr Institute, Faculty of Science, University of Copenhagen. <https://soeg.kb.dk/permalink/45KBDK_KGL/fbp0ps/alma99122574564205763>

APA

Buhl-Mortensen, I. (2017). One-point Functions in AdS/dCFT and Integrability. The Niels Bohr Institute, Faculty of Science, University of Copenhagen. https://soeg.kb.dk/permalink/45KBDK_KGL/fbp0ps/alma99122574564205763

Vancouver

Buhl-Mortensen I. One-point Functions in AdS/dCFT and Integrability. The Niels Bohr Institute, Faculty of Science, University of Copenhagen, 2017.

Author

Buhl-Mortensen, Isak. / One-point Functions in AdS/dCFT and Integrability. The Niels Bohr Institute, Faculty of Science, University of Copenhagen, 2017.

Bibtex

@phdthesis{6d6ee59b3a334d0cab0687b0e6e4ab83,

title = "One-point Functions in AdS/dCFT and Integrability",

abstract = "Super Yang-Mills with a co-dimension one defect is studied, in particular, the field theory setup that arises in the D3-probe-D5 brane construction of the Karch-Randal idea. We look at the case where k ≥ 2 D3-branes are absorbed by the D5, giving rise to a domain wall defect that separates the field theory into an SU(N − k) theory and a broken SU(N) theory. The defect allows for interesting one-point functions in the SU(2) sub-sector already at tree-level. One-point functions in this sub-sector are computed, key results include the closed determinant formula at tree-level valid for all k, and subsequently a concise one-loop result for k = 2. The one-loop result is conjectured to be exact for the BMN vacuum. A major feat is the diagonalization of the bulk action around the fuzzy-funnel background, as it opens up for many novel tests of the AdS/dCFT correspondence. Results for the BMN one-point functions are compared with string theory in the double-scaling limit. Agreement is found at tree-level and subsequently an all loop conjecture is made based on integrability.",

author = "Isak Buhl-Mortensen",

year = "2017",

language = "English",

publisher = "The Niels Bohr Institute, Faculty of Science, University of Copenhagen",

}

RIS

TY - BOOK

T1 - One-point Functions in AdS/dCFT and Integrability

AU - Buhl-Mortensen, Isak

PY - 2017

Y1 - 2017

N2 - Super Yang-Mills with a co-dimension one defect is studied, in particular, the field theory setup that arises in the D3-probe-D5 brane construction of the Karch-Randal idea. We look at the case where k ≥ 2 D3-branes are absorbed by the D5, giving rise to a domain wall defect that separates the field theory into an SU(N − k) theory and a broken SU(N) theory. The defect allows for interesting one-point functions in the SU(2) sub-sector already at tree-level. One-point functions in this sub-sector are computed, key results include the closed determinant formula at tree-level valid for all k, and subsequently a concise one-loop result for k = 2. The one-loop result is conjectured to be exact for the BMN vacuum. A major feat is the diagonalization of the bulk action around the fuzzy-funnel background, as it opens up for many novel tests of the AdS/dCFT correspondence. Results for the BMN one-point functions are compared with string theory in the double-scaling limit. Agreement is found at tree-level and subsequently an all loop conjecture is made based on integrability.

AB - Super Yang-Mills with a co-dimension one defect is studied, in particular, the field theory setup that arises in the D3-probe-D5 brane construction of the Karch-Randal idea. We look at the case where k ≥ 2 D3-branes are absorbed by the D5, giving rise to a domain wall defect that separates the field theory into an SU(N − k) theory and a broken SU(N) theory. The defect allows for interesting one-point functions in the SU(2) sub-sector already at tree-level. One-point functions in this sub-sector are computed, key results include the closed determinant formula at tree-level valid for all k, and subsequently a concise one-loop result for k = 2. The one-loop result is conjectured to be exact for the BMN vacuum. A major feat is the diagonalization of the bulk action around the fuzzy-funnel background, as it opens up for many novel tests of the AdS/dCFT correspondence. Results for the BMN one-point functions are compared with string theory in the double-scaling limit. Agreement is found at tree-level and subsequently an all loop conjecture is made based on integrability.

UR - https://soeg.kb.dk/permalink/45KBDK_KGL/fbp0ps/alma99122574564205763

M3 - Ph.D. thesis

BT - One-point Functions in AdS/dCFT and Integrability

PB - The Niels Bohr Institute, Faculty of Science, University of Copenhagen

ER -

ID: 186419690