Tadpole conjecture in non-geometric backgrounds
Tadpole conjecture in non-geometric backgrounds
About this item
Full title
Author / Creator
Publisher
Berlin/Heidelberg: Springer Berlin Heidelberg
Journal title
Language
English
Formats
Publication information
Publisher
Berlin/Heidelberg: Springer Berlin Heidelberg
Subjects
More information
Scope and Contents
Contents
A
bstract
Calabi-Yau compactifications have typically a large number of complex structure and/or Kähler moduli that have to be stabilised in phenomenologically-relevant vacua. The former can in principle be done by fluxes in type IIB solutions. However, the tadpole conjecture proposes that the number of stabilised moduli can at most grow line...
Alternative Titles
Full title
Tadpole conjecture in non-geometric backgrounds
Authors, Artists and Contributors
Author / Creator
Identifiers
Primary Identifiers
Record Identifier
TN_cdi_doaj_primary_oai_doaj_org_article_0d1a2fa6f80e4893bc891c6b473fa272
Permalink
https://devfeature-collection.sl.nsw.gov.au/record/TN_cdi_doaj_primary_oai_doaj_org_article_0d1a2fa6f80e4893bc891c6b473fa272
Other Identifiers
ISSN
1029-8479,1126-6708
E-ISSN
1029-8479
DOI
10.1007/JHEP10(2024)021
