stands for Digital Object Identifier
and is the unique identifier for objects on the internet. It can be used to create persistent link and to cite articles.
Using DOI as a persistent link
To create a persistent link, add「http://dx.doi.org/」
before a DOI.
For instance, if the DOI of an article is 10.5297/ser.1201.002 , you can link persistently to the article by entering the following link in your browser: http://dx.doi.org/ 10.5297/ser.1201.002 。
The DOI link will always direct you to the most updated article page no matter how the publisher changes the document's position, avoiding errors when engaging in important research.
Cite a document with DOI
When citing references, you should also cite the DOI if the article has one. If your citation guideline does not include DOIs, you may cite the DOI link.
DOIs allow accurate citations, improve academic contents connections, and allow users to gain better experience across different platforms. Currently, there are more than 70 million DOIs registered for academic contents. If you want to understand more about DOI, please visit airiti DOI Registration （ doi.airiti.com ） 。
洪浩迪 , Masters Advisor：高英哲
英文 DOI： 10.6342/NTU201802766
張量網路 ； 矩陣乘積態 ； 均勻矩陣乘積態的變分優化演算法 ； 時間相依變分原理 ； Tirring 模型 ； 量子演化 ； 動態相變 ； tensor network (TN) ； matrix product state (MPS) ； variational optimization algorithm for uniform matrix product state (VUMPS) ； time-dependent variational principle (TDVP) ； Thirring model ； quantum quench ； dynamical phase transition (DPT)
-  R. Orús, “A practical introduction to tensor networks: Matrix product states and projected entangled pair states,” Annals of Physics, vol. 349, pp. 117 – 158, 2014.
-  U. Schollwöck, “The density-matrix renormalization group in the age of matrix product states,” Annals of Physics, vol. 326, no. 1, pp. 96 – 192, 2011. January 2011 Special Issue.
-  S. R. White, “Density matrix formulation for quantum renormalization groups,” Phys. Rev. Lett., vol. 69, pp. 2863–2866, Nov 1992.
-  G. Vidal, “Classical Simulation of Infinite-Size Quantum Lattice Systems in One Spatial Dimension,” Phys. Rev. Lett., vol. 98, p. 070201, Feb 2007.
-  V. Zauner-Stauber, L. Vanderstraeten, M. T. Fishman, F. Verstraete, and J. Haegeman, “Variational optimization algorithms for uniform matrix product states,” Phys. Rev. B, vol. 97, p. 045145, Jan 2018.
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