Searching for Infinitely Many Symmetries and Exact Solutions via Repeated Similarity Reductions
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Abstract
A simple symmetry reduction procedure is repeatedly used to obtain infinitely many symmetries and then the exact solutions of the Burgers equation. Some sets of exact solutions such as the rational solutions, rational-kink solutions and error function solutions are explicitly given. As a byproduct the recursion operators can be re-obtained at the same time.
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Cite this article:
LOU Sen-Yue, LAIN Zeng-Ju. Searching for Infinitely Many Symmetries and Exact Solutions via Repeated Similarity Reductions[J]. Chin. Phys. Lett., 2005, 22(1): 1-4.
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LOU Sen-Yue, LAIN Zeng-Ju. Searching for Infinitely Many Symmetries and Exact Solutions via Repeated Similarity Reductions[J]. Chin. Phys. Lett., 2005, 22(1): 1-4.
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LOU Sen-Yue, LAIN Zeng-Ju. Searching for Infinitely Many Symmetries and Exact Solutions via Repeated Similarity Reductions[J]. Chin. Phys. Lett., 2005, 22(1): 1-4.
|
LOU Sen-Yue, LAIN Zeng-Ju. Searching for Infinitely Many Symmetries and Exact Solutions via Repeated Similarity Reductions[J]. Chin. Phys. Lett., 2005, 22(1): 1-4.
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