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|a Zhang, Zhibai
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|a Massachusetts Institute of Technology. Center for Theoretical Physics
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|a Massachusetts Institute of Technology. Department of Physics
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|a Wang, Yinan
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|a Wang, Yinan
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|a Learning non-Higgsable gauge groups in 4D F-theory
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|b Springer Berlin Heidelberg,
|c 2018-08-14T17:23:27Z.
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|z Get fulltext
|u http://hdl.handle.net/1721.1/117358
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|a We apply machine learning techniques to solve a specific classification problem in 4D F-theory. For a divisor D on a given complex threefold base, we want to read out the non-Higgsable gauge group on it using local geometric information near D. The input features are the triple intersection numbers among divisors near D and the output label is the non-Higgsable gauge group. We use decision tree to solve this problem and achieved 85%-98% out-of-sample accuracies for different classes of divisors, where the data sets are generated from toric threefold bases without (4,6) curves. We have explicitly generated a large number of analytic rules directly from the decision tree and proved a small number of them. As a crosscheck, we applied these decision trees on bases with (4,6) curves as well and achieved high accuracies. Additionally, we have trained a decision tree to distinguish toric (4,6) curves as well. Finally, we present an application of these analytic rules to construct local base configurations with interesting gauge groups such as SU(3). Keywords: Differential and Algebraic Geometry, F-Theory
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|a United States. Department of Energy (Contract DE-SC00012567)
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|a Article
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|t Journal of High Energy Physics
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