低維度無序自旋1/2海森堡模型的基態特性

程大榕; Ta-Jung Cheng

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完整後設資料紀錄

DC 欄位	值	語言
dc.contributor.advisor	高英哲	zh_TW
dc.contributor.advisor	Ying-Jer Kao	en
dc.contributor.author	程大榕	zh_TW
dc.contributor.author	Ta-Jung Cheng	en
dc.date.accessioned	2024-03-07T16:20:37Z	-
dc.date.available	2024-03-08	-
dc.date.copyright	2024-03-07	-
dc.date.issued	2024	-
dc.date.submitted	2024-02-17	-
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dc.identifier.uri	http://tdr.lib.ntu.edu.tw/jspui/handle/123456789/92156	-
dc.description.abstract	由自旋的隨機配對組成的隨機雙重相，展現了集體和普遍的臨界行為，並統治著帶有隨機耦合的反鐵磁自旋為1/2海森堡鏈的低能量物理。隨機雙重相存在於廣泛的自旋鏈中，包括在無擾動的情況下存在能隙的自旋為1的鏈。然而，儘管自旋為1/2的海森堡雙梯子與自旋為1的鏈相似，但在耦合引入隨機性時並不會轉變為隨機雙重相。即使具有極弱的鏈間耦合，無序自旋梯子仍保持在一個具有短程相關性的格里菲斯相。在此，我們利用量子蒙地卡羅模擬和強隨機場重整化群方法，研究由兩條或更多稀疏連接的鏈組成的海森堡模型的基態性質。具體而言，我們檢查了當隨機去除部分鏈間耦合時，雙梯子是否轉變為隨機雙重相。我們的目標是了解在低維自旋系統中通過增加連接性如何破壞隨機雙重相。	zh_TW
dc.description.abstract	The random-singlet (RS) phase consists of random pairing of spins showing collective and universal critical behavior, which governs low-energy physics of the antiferromagnetic spin-1/2 Heisenberg chain with random couplings. The RS phases are found in a broad class of spin chains, including the spin-1 chain that is gapped in the absence of disorder. On the other hand, the spin-1/2 Heisenberg two-leg ladder, despite its similarity to the spin-1 chain, does not transform to an RS phase by introducing randomness in couplings. Even with extremely weak interchain couplings, the disordered spin ladder remains in a Griffiths phase with short-range correlations. Here, we employ quantum Monte Carlo simulations and the Strong Disorder Renormalized Group (SDRG) method to investigate the ground state properties of Heisenberg models composed of two or more chains with sparse connectivities. In particular, we examine whether there is a transition to the RS phase in a two-leg ladder when a fraction of interchain couplings are removed randomly. Our goal is to understand how the RS phase breaks down by increasing connectivities in low-dimensional spin systems.	en
dc.description.provenance	Submitted by admin ntu (admin@lib.ntu.edu.tw) on 2024-03-07T16:20:37Z No. of bitstreams: 0	en
dc.description.provenance	Made available in DSpace on 2024-03-07T16:20:37Z (GMT). No. of bitstreams: 0	en
dc.description.tableofcontents	口試委員審定書 i 致謝 iii 摘要 v Abstract vii Contents ix Chapter 1 Introduction 1 Chapter 2 Method 5 2.1 Stochastic Series Expansion Quantum Monte Carlo 5 2.1.1 Master Equation and Importance Sampling 5 2.1.2 Stochastic Series Expansion 8 2.1.3 Updating scheme 11 2.2 Projector Quantum Monte Carlo 15 2.2.1 Valence Bond basis and Projection operator 17 2.2.2 Updating scheme 21 2.3 Strong Disorder Renormalization Group 24 Chapter 3 Results 32 3.1 The view of different removal probabilities 32 3.1.1 spins correlation 32 3.1.2 Local susceptibility 38 3.2 The view of a fixed number of interchain couplings 42 Chapter 4 Summary and Outlook 45 References 46	-
dc.language.iso	en	-
dc.subject	隨機雙重相	zh_TW
dc.subject	量子蒙地卡羅	zh_TW
dc.subject	強隨機場重整化群	zh_TW
dc.subject	反鐵磁海森堡模型	zh_TW
dc.subject	格里菲斯相	zh_TW
dc.subject	低維度自旋系統	zh_TW
dc.subject	the random-singlet phase	en
dc.subject	Griffiths phase	en
dc.subject	antiferromagnetic Heisenberg model	en
dc.subject	low-dimensional spin systems	en
dc.subject	quantum Monte Carlo	en
dc.subject	Strong Disorder Renormalization Group	en
dc.title	低維度無序自旋1/2海森堡模型的基態特性	zh_TW
dc.title	Ground State Properties of Disordered Spin-1/2 Heisenberg Models in Low Dimensions	en
dc.type	Thesis	-
dc.date.schoolyear	112-1	-
dc.description.degree	碩士	-
dc.contributor.oralexamcommittee	林瑜琤;黃一平	zh_TW
dc.contributor.oralexamcommittee	Yu-Cheng Lin;Yi-Ping Huang	en
dc.subject.keyword	隨機雙重相,格里菲斯相,反鐵磁海森堡模型,低維度自旋系統,量子蒙地卡羅,強隨機場重整化群,	zh_TW
dc.subject.keyword	the random-singlet phase,Griffiths phase,antiferromagnetic Heisenberg model,low-dimensional spin systems,quantum Monte Carlo,Strong Disorder Renormalization Group,	en
dc.relation.page	49	-
dc.identifier.doi	10.6342/NTU202400652	-
dc.rights.note	同意授權(全球公開)	-
dc.date.accepted	2024-02-17	-
dc.contributor.author-college	理學院	-
dc.contributor.author-dept	物理學系	-
dc.date.embargo-lift	2029-02-11	-
顯示於系所單位：	物理學系

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