580 research outputs found
Fieldwork interviews: From phonebooks to fascists
Fieldwork interviews in Eastern Europe can make big demands of young researchers. Careful preparation, creativity and persistence are the key to success, argue Erin Marie Saltman and Philipp Köker
Applications of patching to quadratic forms and central simple algebras
This paper provides applications of patching to quadratic forms and central
simple algebras over function fields of curves over henselian valued fields. In
particular, we use a patching approach to reprove and generalize a recent
result of Parimala and Suresh on the u-invariant of p-adic function fields, for
p odd. The strategy relies on a local-global principle for homogeneous spaces
for rational algebraic groups, combined with local computations.Comment: 48 pages; connectivity now required in the definition of rational
group; beginning of Section 4 reorganized; other minor change
Quaternion algebras with the same subfields
G. Prasad and A. Rapinchuk asked if two quaternion division F -algebras that
have the same subfields are necessarily isomorphic. The answer is known to be
"no" for some very large fields. We prove that the answer is "yes" if F is an
extension of a global field K so that F /K is unirational and has zero
unramified Brauer group. We also prove a similar result for Pfister forms and
give an application to tractable fields
Open Problems on Central Simple Algebras
We provide a survey of past research and a list of open problems regarding
central simple algebras and the Brauer group over a field, intended both for
experts and for beginners.Comment: v2 has some small revisions to the text. Some items are re-numbered,
compared to v
Systematics of String Loop Corrections in Type IIB Calabi-Yau Flux Compactifications
We study the behaviour of the string loop corrections to the N=1 4D
supergravity Kaehler potential that occur in flux compactifications of IIB
string theory on general Calabi-Yau three-folds. We give a low energy
interpretation for the conjecture of Berg, Haack and Pajer for the form of the
loop corrections to the Kaehler potential. We check the consistency of this
interpretation in several examples. We show that for arbitrary Calabi-Yaus, the
leading contribution of these corrections to the scalar potential is always
vanishing, giving an "extended no-scale structure". This result holds as long
as the corrections are homogeneous functions of degree -2 in the 2-cycle
volumes. We use the Coleman-Weinberg potential to motivate this cancellation
from the viewpoint of low-energy field theory. Finally we give a simple formula
for the 1-loop correction to the scalar potential in terms of the tree-level
Kaehler metric and the correction to the Kaehler potential. We illustrate our
ideas with several examples. A companion paper will use these results in the
study of Kaehler moduli stabilisation.Comment: 34 pages and 3 figures; typos corrected and references adde
"Big" Divisor D3/D7 Swiss Cheese Phenomenology
We review progress made over the past couple of years in the field of Swiss
Cheese Phenomenology involving a mobile space-time filling D3-brane and
stack(s) of fluxed D7-branes wrapping the "big" (as opposed to the "small")
divisor in (the orientifold of a) Swiss-Cheese Calabi-Yau. The topics reviewed
include reconciliation of large volume cosmology and phenomenology, evaluation
of soft supersymmetry breaking parameters, one-loop RG-flow equations'
solutions for scalar masses, obtaining fermionic (possibly first two
generations' quarks/leptons) mass scales in the O(MeV-GeV)-regime as well as
(first two generations') neutrino masses (and their one-loop RG flow) of around
an eV. The heavy sparticles and the light fermions indicate the possibility of
"split SUSY" large volume scenario.Comment: Invited review for MPLA, 14 pages, LaTe
Rationality of quotients by linear actions of affine groups
Let G be the (special) affine group, semidirect product of SL_n and C^n. In
this paper we study the representation theory of G and in particular the
question of rationality for V/G where V is a generically free G-representation.
We show that the answer to this question is positive if the dimension of V is
sufficiently large and V is indecomposable. We have a more precise theorem if V
is a two-step extension 0 -> S -> V -> Q -> 0 with S, Q completely reducible.Comment: 18 pages; dedicated to Fabrizio Catanese on the occasion of his 60th
birthda
Stable de Sitter vacua in N=2, D=5 supergravity
We find 5D gauged supergravity theories exhibiting stable de Sitter vacua.
These are the first examples of stable de Sitter vacua in higher-dimensional
(D>4) supergravity. Non-compact gaugings with tensor multiplets and R-symmetry
gauging seem to be the essential ingredients in these models. They are however
not sufficient to guarantee stable de Sitter vacua, as we show by investigating
several other models. The qualitative behaviour of the potential also seems to
depend crucially on the geometry of the scalar manifold.Comment: 26 pages, v2:typos corrected, published versio
Nonrenormalization of Flux Superpotentials in String Theory
Recent progress in understanding modulus stabilization in string theory
relies on the existence of a non-renormalization theorem for the 4D
compactifications of Type IIB supergravity which preserve N=1 supersymmetry. We
provide a simple proof of this non-renormalization theorem for a broad class of
Type IIB vacua using the known symmetries of these compactifications, thereby
putting them on a similar footing as the better-known non-renormalization
theorems of heterotic vacua without fluxes. The explicit dependence of the
tree-level flux superpotential on the dilaton field makes the proof more subtle
than in the absence of fluxes.Comment: 16 pages, no figures. Final version, to appear in JHEP. Arguments for
validity of R-symmetry made more explicit. Minor extra comments and
references adde
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