Finding vacua for the four-dimensional effective theories for supergravity which descend from flux compactifications and analyzing them according to their stability is one of the central problems in string phenomenology. Except for some simple toy models, it is, however, difficult to find all the vacua analytically. Recently developed algorithmic methods based on symbolic computer algebra can be of great help in the more realistic models. However, they suffer from serious algorithmic complexities and are limited to small system sizes. In this paper, we review a numerical method called the numerical polynomial homotopy continuation (NPHC) method, first used in the areas of lattice field theories, which by construction finds all of the vacua ...
Many applications modeled by polynomial systems have positive dimensional solution components (e.g.,...
Many applications modeled by polynomial systems have positive dimensional solution components (e.g.,...
An efficient technique for solving polynomial systems with a particular struc-ture is presented. Thi...
41 pages, 4 figuresWe develop a new and efficient method to systematically analyse four dimensional ...
We propose a new computational method to understand the vacuum moduli space of (supersymmetric) fiel...
27 pages, 5 .eps figuresOne of the central problems of string-phenomenology is to find stable vacua ...
One of the central problems of string-phenomenology is to find stable vacua in the four dimensional ...
Abstract: We explicitly construct all supersymmetric flux vacua of a particular Calabi-Yau compactif...
There is a rich interplay between algebraic geometry and string and gauge theories which has been re...
We propose a new computational method to understand the vacuum moduli space of (supersymmetric) fiel...
This program has been imported from the CPC Program Library held at Queen's University Belfast (1969...
The analysis of the extremal structure of the scalar potentials of gauged maximally extended supergr...
In this thesis we provide new tools to determine and explore the Landscape of four-dimensional effec...
The analysis of the extremal structure of the scalar potentials of gauged maximally extended supergr...
Many applications modeled by polynomial systems have positive dimensional solution components (e.g.,...
Many applications modeled by polynomial systems have positive dimensional solution components (e.g.,...
An efficient technique for solving polynomial systems with a particular struc-ture is presented. Thi...
41 pages, 4 figuresWe develop a new and efficient method to systematically analyse four dimensional ...
We propose a new computational method to understand the vacuum moduli space of (supersymmetric) fiel...
27 pages, 5 .eps figuresOne of the central problems of string-phenomenology is to find stable vacua ...
One of the central problems of string-phenomenology is to find stable vacua in the four dimensional ...
Abstract: We explicitly construct all supersymmetric flux vacua of a particular Calabi-Yau compactif...
There is a rich interplay between algebraic geometry and string and gauge theories which has been re...
We propose a new computational method to understand the vacuum moduli space of (supersymmetric) fiel...
This program has been imported from the CPC Program Library held at Queen's University Belfast (1969...
The analysis of the extremal structure of the scalar potentials of gauged maximally extended supergr...
In this thesis we provide new tools to determine and explore the Landscape of four-dimensional effec...
The analysis of the extremal structure of the scalar potentials of gauged maximally extended supergr...
Many applications modeled by polynomial systems have positive dimensional solution components (e.g.,...
Many applications modeled by polynomial systems have positive dimensional solution components (e.g.,...
An efficient technique for solving polynomial systems with a particular struc-ture is presented. Thi...