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New extensions in topological field theory with instanton effects
https://doi.org/10.15083/00005608
https://doi.org/10.15083/0000560893982b1d-a012-410f-9da3-c05bcf9ab0fb
名前 / ファイル | ライセンス | アクション |
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H23_nishiyama.pdf (344.1 kB)
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Item type | 学位論文 / Thesis or Dissertation(1) | |||||
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公開日 | 2014-02-24 | |||||
タイトル | ||||||
タイトル | New extensions in topological field theory with instanton effects | |||||
言語 | ||||||
言語 | eng | |||||
資源タイプ | ||||||
資源 | http://purl.org/coar/resource_type/c_46ec | |||||
タイプ | thesis | |||||
ID登録 | ||||||
ID登録 | 10.15083/00005608 | |||||
ID登録タイプ | JaLC | |||||
その他のタイトル | ||||||
その他のタイトル | インスタントン効果を含む位相的場の理論における新しい拡張 | |||||
著者 |
西山, 大輔
× 西山, 大輔 |
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著者所属 | ||||||
著者所属 | 東京大学大学院総合文化研究科広域科学専攻 | |||||
Abstract | ||||||
内容記述タイプ | Abstract | |||||
内容記述 | In this thesis, we propose two extensions of a topological field theory. One is a construction of new observables. The other is a perturbation theory around a special point of the theory. First, we construct the new observables in the supersymmetric quantum mechanics on a Riemaniann manifold. The observables of this theory correspond to the differential forms on the instanton moduli space. In our case, this space is the space of the gradient trajectories of the Morse function on the manifold, which is a subspace of the space of paths with both endpoints fixed. We consruct such differential forms by the mothod of iterated integrals. We find that the resulting observables are sensitive to the information of the non-commutativity of the fundamental group of the moduli space. Second, we develop a proper method of a perturbation theory around a special limiting point of the topological field theory. It is known that in this special point, one can compute the correlation functions beyond the topological sector of the theory. This limiting point is characterized by the infinite value of a parameter λ of the theory. However, at this point λ = ∞, the theory becomes quite different from the original theory with a finte value of λ. To get desired information, we need to know the value of the correlation functions away from the point λ = ∞. We find that it can be achieved by a kind of perturbation theory around the point λ = ∞. This perturbation theory has properties different from the usual one for a quantum mechanics. We carry out the perturbation theory by the method of the resolvent. We find that the computation on the inifinite dimensional Hilbert space can be reduced to a finite dimensional matrix computation. After reviewing some basic properties of topological field theories, we discuss the two extensions above. | |||||
書誌情報 | 発行日 2011-03-24 | |||||
日本十進分類法 | ||||||
主題 | 421 | |||||
主題Scheme | NDC | |||||
学位名 | ||||||
学位名 | 博士(学術) | |||||
学位 | ||||||
値 | doctoral | |||||
学位分野 | ||||||
Humanities and Social Sciences (学術) | ||||||
学位授与機関 | ||||||
学位授与機関名 | University of Tokyo (東京大学) | |||||
研究科・専攻 | ||||||
Department of Multi-Disciplinary Sciences, Graduate School of Arts and Sciences (総合文化研究科広域科学専攻) | ||||||
学位授与年月日 | ||||||
学位授与年月日 | 2011-03-24 | |||||
学位授与番号 | ||||||
学位授与番号 | 甲第26642号 | |||||
学位記番号 | ||||||
博総合第1059号 |