On quantitative unique continuation properties of fractional Schrödinger equations: Doubling, vanish...
On quantitative unique continuation properties of fractional Schrödinger equations: Doubling, vanishing order and nodal domain estimates
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Providence, Rhode Island: American Mathematical Society
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English
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Providence, Rhode Island: American Mathematical Society
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In this article we determine bounds on the maximal order of vanishing for eigenfunctions of a generalized Dirichlet-to-Neumann map (which is associated with fractional Schrödinger equations) on a compact, smooth Riemannian manifold, (M,g)(M,g), without boundary. Moreover, with only slight modifications these results generalize to equations with C1C...
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Full title
On quantitative unique continuation properties of fractional Schrödinger equations: Doubling, vanishing order and nodal domain estimates
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TN_cdi_crossref_primary_10_1090_tran_6758
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https://devfeature-collection.sl.nsw.gov.au/record/TN_cdi_crossref_primary_10_1090_tran_6758
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ISSN
0002-9947
E-ISSN
1088-6850
DOI
10.1090/tran/6758
