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The Estimates L_(1)-L_(∞) for the Reduced Radial Equation of Schrodinger
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作者 Herminio Blancarte 《Advances in Pure Mathematics》 2019年第5期480-522,共43页
Estimates of the type L1-L∞ for the Schr&#246;dinger Equation on the Line and on Half-Line with a regular potential V(x), express the dispersive nature of the Schr&#246;dinger Equation and are the essential e... Estimates of the type L1-L∞ for the Schr&#246;dinger Equation on the Line and on Half-Line with a regular potential V(x), express the dispersive nature of the Schr&#246;dinger Equation and are the essential elements in the study of the problems of initial values, the asymptotic times for large solutions and Scattering Theory for the Schr&#246;dinger equation and non-linear in general;for other equations of Non-linear Evolution. In general, the estimates Lp-Lp' express the dispersive nature of this equation. And its study plays an important role in problems of non-linear initial values;likewise, in the study of problems nonlinear initial values;see [1] [2] [3]. On the other hand, following a series of problems proposed by V. Marchenko [4], that we will name Marchenko’s formulation, and relate it to a generalized version of Theorem 1 given in [1], the main theorem (Theorem 1) of this article provides a transformation operator W?that transforms the Reduced Radial Schr&#246;dinger Equation (RRSE) (whose main characteristic is the addition a singular term of quadratic order to a regular potential V(x)) in the Schr&#246;dinger Equation on Half-Line (RSEHL) under W. That is to say;W?eliminates the singular term of quadratic order of potential V(x) in the asymptotic development towards zero and adds to the potential V(x) a bounded term and a term exponentially decrease fast enough in the asymptotic development towards infinity, which continues guaranteeing the uniqueness of the potential V(x) in the condition of the infinity boundary. Then the L1-L∞ estimates for the (RRSE) are preserved under the transformation operator , as in the case of (RSEHL) where they were established in [3]. Finally, as an open question, the possibility of extending the L1-L∞ estimates for the case (RSEHL), where added to the potential V(x) an analytical perturbation is mentioned. 展开更多
关键词 The Schrodinger Equation on the Half-Line Reduced Radial Equation of Schrodinger Conditions Sufficient to Establish the Uniqueness of the potential and Boundary Conditions Are Named the Generalized Theorem 1 The Marchenko’s Formulation Reduction of Estimates L_(1)-L_(∞) for the Reduced Radial Equation of Schrodinger to Equation on Half-Line
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