We investigate the vacuum moduli space of supersymmetric gauge theories en masse by probing the space of such vacua from a statistical standpoint. Using quiver gauge theories with N = 1 supersymmetry as a testing ground, we sample over a large number of vacua as algebraic varieties, computing explicitly their dimension, degree and Hilbert series. We study the distribution of these geometrical quantities, and also address the question of how likely it is for the moduli space to be Calabi-Yau
We study the statistics of the metric on Kähler moduli space in compactifications of string theory o...
We study the vacuum statistics of ensembles of M theory compactifications on G(2) holonomy manifolds...
We present a complete classification of the vacuum geometries of all renormalizable superpotentials ...
We investigate the vacuum moduli space of supersymmetric gauge theories en masse by probing the spac...
We propose a new computational method to understand the vacuum moduli space of (supersymmetric) fiel...
We propose a new guiding principle for phenomenology: special geometry in the vacuum space. New algo...
Using techniques of algorithmic algebraic geometry, we present a new and efficient method for explic...
AbstractWe propose a new guiding principle for phenomenology: special geometry in the vacuum space. ...
Using techniques of algorithmic algebraic geometry, we present a new and efficient method for explic...
We propose a new computational method to understand the vacuum moduli space of (supersymmetric) fiel...
We present an intriguing and precise interplay between algebraic geometry and the phenomenology of g...
We initiate a systematic investigation of the space of 2+1 dimensional quiver gauge theories, emphas...
Supersymmetric gauge theories have been at the heart of research in theoretical physics for the pas...
The study of quantum field theories and supersymmetric quantum field theories has thrived in the rec...
We study the vacuum geometry prescribed by the gauge invariant operators of the minimal supersymmetr...
We study the statistics of the metric on Kähler moduli space in compactifications of string theory o...
We study the vacuum statistics of ensembles of M theory compactifications on G(2) holonomy manifolds...
We present a complete classification of the vacuum geometries of all renormalizable superpotentials ...
We investigate the vacuum moduli space of supersymmetric gauge theories en masse by probing the spac...
We propose a new computational method to understand the vacuum moduli space of (supersymmetric) fiel...
We propose a new guiding principle for phenomenology: special geometry in the vacuum space. New algo...
Using techniques of algorithmic algebraic geometry, we present a new and efficient method for explic...
AbstractWe propose a new guiding principle for phenomenology: special geometry in the vacuum space. ...
Using techniques of algorithmic algebraic geometry, we present a new and efficient method for explic...
We propose a new computational method to understand the vacuum moduli space of (supersymmetric) fiel...
We present an intriguing and precise interplay between algebraic geometry and the phenomenology of g...
We initiate a systematic investigation of the space of 2+1 dimensional quiver gauge theories, emphas...
Supersymmetric gauge theories have been at the heart of research in theoretical physics for the pas...
The study of quantum field theories and supersymmetric quantum field theories has thrived in the rec...
We study the vacuum geometry prescribed by the gauge invariant operators of the minimal supersymmetr...
We study the statistics of the metric on Kähler moduli space in compactifications of string theory o...
We study the vacuum statistics of ensembles of M theory compactifications on G(2) holonomy manifolds...
We present a complete classification of the vacuum geometries of all renormalizable superpotentials ...