| 研究課題/領域番号 |
18K03328
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| 研究種目 |
基盤研究(C)
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| 配分区分 | 基金 |
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| 応募区分 | 一般 |
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| 審査区分 |
小区分12010:基礎解析学関連
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| 研究機関 | 名古屋大学 |
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研究代表者 |
Richard Serge 名古屋大学, 多元数理科学研究科(国際), G30特任教授 (70725241)
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| 研究期間 (年度) |
2018-04-01 – 2022-03-31
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| 研究課題ステータス |
完了 (2021年度)
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| 配分額 *注記 |
4,420千円 (直接経費: 3,400千円、間接経費: 1,020千円)
2020年度: 1,430千円 (直接経費: 1,100千円、間接経費: 330千円)
2019年度: 1,430千円 (直接経費: 1,100千円、間接経費: 330千円)
2018年度: 1,560千円 (直接経費: 1,200千円、間接経費: 360千円)
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| キーワード | Scattering theory / Wave operators / Index theorems / Integrable models / Bibliometric analaysis / Epidemiology / Decay estimates / Reproduction number / Epidemic propagation / Integrable model / Bibliometric analysis / scattering theory / wave operators / index theorem |
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| 研究成果の概要 |
We developed analytical tools in the context of quantum scattering theory. They exhibit properties of physical systems which are robust under perturbations. We also performed bibliometric research on mathematical papers, and developed new tools for computing the effective reproduction number.
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| 研究成果の学術的意義や社会的意義 |
Stability results of quantum systems are important, since these systems are constantly subject to perturbations. Bibliometric investigations provide a clear link between international collaborations and citations. New methods for computing the effective reproduction number can have a huge impact.
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