数值符号问题和回火Lefschetz顶针法

Proceedings of Corfu Summer Institute 2021 "School and Workshops on Elementary Particle Physics and Gravity" — PoS(CORFU2021) Pub Date : 2022-05-02 DOI:10.22323/1.406.0254

M. Fukuma, N. Matsumoto, Y. Namekawa

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引用次数: 2

摘要

数值符号问题是用第一性原理计算定量理解许多重要物理系统的主要障碍。这类系统的典型例子包括有限密度QCD、强相关电子系统和受挫自旋系统，以及量子系统的实时动力学。在这个演讲中，我们论证了缓变Lefschetz顶针法(TLTM) [M。[j] .世界体积回火Lefschetz顶针法(WV-TLTM)。Fukuma and N. Matsumoto， [j] .， 2014(4): 1 - 2。通过将WV-TLTM成功应用于有限密度QCD的重要模型Stephanov模型，我们证明了该算法的有效性。我们还讨论了WV-TLTM的计算尺度。

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Numerical sign problem and the tempered Lefschetz thimble method

The numerical sign problem is a major obstacle to thequantitative understanding of manyimportant physical systems with ﬁrst-principles calculations. Typical examples for such systems include ﬁnite-density QCD, strongly-correlated electron systems and frustrated spin systems, as well as the real-time dynamics of quantum systems. In this talk, we argue that the tempered Lefschetz thimble method (TLTM) [M. Fukuma and N. Umeda, arXiv:1703.00861] and its extension, the worldvolume tempered Lefschetz thimble method (WV-TLTM) [M. Fukuma and N. Matsumoto, arXiv:2012.08468], may be a reliable and versatile solution to the sign problem. We demonstrate the eﬀectiveness of the algorithm by exemplifying a successful application of WV-TLTM to the Stephanov model, which is an important toy model of ﬁnite-density QCD. We also discuss the computational scaling of WV-TLTM.

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Proceedings of Corfu Summer Institute 2021 "School and Workshops on Elementary Particle Physics and Gravity" — PoS(CORFU2021)

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