Not So Flat Metrics
In order to be in control of the $\alpha'$ derivative expansion, geometric string compactifications are understood in the context of a large volume approximation. In this letter, we consider the reduction of these higher derivative terms, and propose an improved estimate on the large volume app...
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| creator | Fraser-Taliente, Cristofero S Harvey, Thomas R Kim, Manki |
| description | In order to be in control of the $\alpha'$ derivative expansion, geometric
string compactifications are understood in the context of a large volume
approximation. In this letter, we consider the reduction of these higher
derivative terms, and propose an improved estimate on the large volume
approximation using numerical Calabi-Yau metrics obtained via machine learning
methods. Further to this, we consider the $\alpha'^3$ corrections to numerical
Calabi-Yau metrics in the context of IIB string theory. This correction
represents one of several important contributions for realistic string
compactifications -- alongside, for example, the backreaction of fluxes and
local sources -- all of which have important consequences for string
phenomenology. As a simple application of the corrected metric, we compute the
change to the spectrum of the scalar Laplacian. |
| doi_str_mv | 10.48550/arxiv.2411.00962 |
| format | Article |
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string compactifications are understood in the context of a large volume
approximation. In this letter, we consider the reduction of these higher
derivative terms, and propose an improved estimate on the large volume
approximation using numerical Calabi-Yau metrics obtained via machine learning
methods. Further to this, we consider the $\alpha'^3$ corrections to numerical
Calabi-Yau metrics in the context of IIB string theory. This correction
represents one of several important contributions for realistic string
compactifications -- alongside, for example, the backreaction of fluxes and
local sources -- all of which have important consequences for string
phenomenology. As a simple application of the corrected metric, we compute the
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string compactifications are understood in the context of a large volume
approximation. In this letter, we consider the reduction of these higher
derivative terms, and propose an improved estimate on the large volume
approximation using numerical Calabi-Yau metrics obtained via machine learning
methods. Further to this, we consider the $\alpha'^3$ corrections to numerical
Calabi-Yau metrics in the context of IIB string theory. This correction
represents one of several important contributions for realistic string
compactifications -- alongside, for example, the backreaction of fluxes and
local sources -- all of which have important consequences for string
phenomenology. As a simple application of the corrected metric, we compute the
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string compactifications are understood in the context of a large volume
approximation. In this letter, we consider the reduction of these higher
derivative terms, and propose an improved estimate on the large volume
approximation using numerical Calabi-Yau metrics obtained via machine learning
methods. Further to this, we consider the $\alpha'^3$ corrections to numerical
Calabi-Yau metrics in the context of IIB string theory. This correction
represents one of several important contributions for realistic string
compactifications -- alongside, for example, the backreaction of fluxes and
local sources -- all of which have important consequences for string
phenomenology. As a simple application of the corrected metric, we compute the
change to the spectrum of the scalar Laplacian.</abstract><doi>10.48550/arxiv.2411.00962</doi><oa>free_for_read</oa></addata></record> |
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| subjects | Physics - High Energy Physics - Theory |
| title | Not So Flat Metrics |
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