Titlebook: Global Pseudo-differential Calculus on Euclidean Spaces; Fabio Nicola,Luigi Rodino Book 2010 Birkh?user Basel 2010 Schr?dinger operator.ca

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https://doi.org/10.1007/978-3-642-18675-2ns . of the equation . belong to .. In particular then, all the solutions . of the equation . = 0 belong to .. An important tool for deducing global regularity, when . is a pseudo-differential operator, is given by Theorem 1.3.6, namely: the existence of a left parametrix . of ., i.e., . where .: .,

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Exponential Decay and Holomorphic Extension of Solutions,eous equation belong to .. In particular, for the self-adjoint operators discussed in Chapter 4, all the eigenfunctions belong to .. In the present chapter we show that this information can be strongly improved for . and Γ operators, namely we may give precise results of exponential decay and holomo

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Exploring the ResultSet Interface,Pseudo-differential operators, in a broad sense, are linear operators of the type . The function .(., ξ), satisfying suitable estimates in ?., is called the . of .. In fact, (1.0.1) makes sense as a temperate distribution even for ..

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