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Linear and Multilinear Algebra Volume 29, 1991 - Issue 3-4
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Original Articles

Some properties of the campbell baker hausdorff series

J. Day Department of Mathematics, San Jose State University, San Jose, CA, 95192
,
W. So Department of Mathematics, University of California, Santa Barbara, CA, 93106
&
Robert C. Thompson Department of Mathematics, University of California, Santa Barbara, CA, 93106
Pages 207-224 | Received 20 Aug 1990, Published online: 30 May 2007

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Read on this site (2)

Stefano Biagi, Andrea Bonfiglioli & Marco Matone. (2020) On the Baker-Campbell-Hausdorff Theorem: non-convergence and prolongation issues. Linear and Multilinear Algebra 68:7, pages 1310-1328.
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S. Biagi & A. Bonfiglioli. (2014) On the convergence of the Campbell–Baker–Hausdorff–Dynkin series in infinite-dimensional Banach–Lie algebras. Linear and Multilinear Algebra 62:12, pages 1591-1615.
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Articles from other publishers (8)

Philip James McCarthy & Christopher Nielsen. (2022) Global Sampled-Data Regulation of a Class of Fully Actuated Invariant Systems on Simply Connected Nilpotent Matrix Lie Groups. IEEE Transactions on Automatic Control 67:1, pages 436-442.
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Philip James McCarthy & Christopher Nielsen. (2020) Global Synchronization of Sampled-Data Invariant Systems on Exponential Lie Groups. IEEE Transactions on Control of Network Systems 7:3, pages 1080-1089.
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Philip James McCarthy & Christopher Nielsen. (2020) Global stability of a class of difference equations on solvable Lie algebras. Mathematics of Control, Signals, and Systems 32:2, pages 177-208.
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Fernando Casas. 2018. Discrete Mechanics, Geometric Integration and Lie–Butcher Series. Discrete Mechanics, Geometric Integration and Lie–Butcher Series 185 229 .
Rüdiger Achilles & Andrea Bonfiglioli. (2012) The early proofs of the theorem of Campbell, Baker, Hausdorff, and Dynkin. Archive for History of Exact Sciences 66:3, pages 295-358.
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Sergio Blanes & Fernando Casas. (2004) On the convergence and optimization of the Baker–Campbell–Hausdorff formula. Linear Algebra and its Applications 378, pages 135-158.
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J. D. Franson & Michelle M. Donegan. (2002) Perturbation theory for quantum-mechanical observables. Physical Review A 65:5.
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Robert C. Thompson. (1992) High, low, and quantitative roads in linear algebra. Linear Algebra and its Applications 162-164, pages 23-64.
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