We describe how simple machine learning methods successfully predict geometric properties from Hilbert series (HS). Regressors predict embedding weights in projective space to ${\sim}1$ mean absolute error, whilst classifiers predict dimension and Gorenstein index to $>90\%$ accuracy with ${\sim}0.5\%$ standard error. Binary random forest classifiers managed to distinguish whether the underlying HS describes a complete intersection with high accuracies exceeding $95\%$. Neural networks (NNs) exhibited success identifying HS from a Gorenstein ring to the same order of accuracy, whilst generation of 'fake' HS proved trivial for NNs to distinguish from those associated to the three-dimensional Fano varieties considered
We study machine learning of phenomenologically relevant properties of string compactifications, whi...
The use of quantum computing for machine learning is among the most exciting prospective application...
The appearance of strong CDCL-based propositional (SAT) solvers has greatly advanced several areas o...
We describe how simple machine learning methods successfully predict geometric properties from Hilbe...
Classical and exceptional Lie algebras and their representations are among the most important tools ...
Supervised machine learning can be used to predict properties of string geometries with previously u...
We propose a paradigm to apply machine learning various databases which have emerged in the study of...
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We revisit the classic database of weighted-P4s which admit Calabi-Yau 3-fold hypersurfaces equipped...
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This thesis describes a novel connectionist machine utilizing induction by a Hilbert hypercube repre...
We use the latest techniques in machine-learning to study whether from the landscape of Calabi-Yau m...
The transition to Euclidean space and the discretization of quantum field theories on spatial or spa...
We study machine learning of phenomenologically relevant properties of string compactifications, whi...
The use of quantum computing for machine learning is among the most exciting prospective application...
The appearance of strong CDCL-based propositional (SAT) solvers has greatly advanced several areas o...
We describe how simple machine learning methods successfully predict geometric properties from Hilbe...
Classical and exceptional Lie algebras and their representations are among the most important tools ...
Supervised machine learning can be used to predict properties of string geometries with previously u...
We propose a paradigm to apply machine learning various databases which have emerged in the study of...
Abstract We utilize machine learning to study the string landscape. Deep data dives and conjecture g...
The latest techniques from Neural Networks and Support Vector Machines (SVM) are used to investigate...
We revisit the classic database of weighted-P4s which admit Calabi-Yau 3-fold hypersurfaces equipped...
We derive machine learning algorithms from discretized Euclidean field theories, making inference an...
We study the use of machine learning for finding numerical hermitian Yang–Mills connections on line ...
This thesis describes a novel connectionist machine utilizing induction by a Hilbert hypercube repre...
We use the latest techniques in machine-learning to study whether from the landscape of Calabi-Yau m...
The transition to Euclidean space and the discretization of quantum field theories on spatial or spa...
We study machine learning of phenomenologically relevant properties of string compactifications, whi...
The use of quantum computing for machine learning is among the most exciting prospective application...
The appearance of strong CDCL-based propositional (SAT) solvers has greatly advanced several areas o...