Characterizing spectra of closed operators through existence of slowly growing solutions of their Cauchy problems
Studia Mathematica, Tome 116 (1995) no. 1, pp. 23-41
Voir la notice de l'article provenant de la source Institute of Mathematics Polish Academy of Sciences
Let A be a closed linear operator in a Banach space E. In the study of the nth-order abstract Cauchy problem $u^{(n)}(t) = Au(t)$, t ∈ ℝ, one is led to considering the linear Volterra equation (AVE) $u(t) = p(t) + A ʃ_{0}^{t} a(t-s)u(s)ds$, t ∈ ℝ, where $a(·) ∈ L_{loc}^{1}(ℝ)$ and p(·) is a vector-valued polynomial of the form $p(t) = ∑_{j=0}^n 1/(j!) x_j t^j$ for some elements $x_j ∈ E$. We describe the spectral properties of the operator A through the existence of slowly growing solutions of the (AVE). The main tool is the notion of Carleman spectrum of a vector-valued function. Moreover, an extension of a theorem of Pólya in complex analysis is obtained and applied to the individual "Ax = 0" and "Tx = x" problem.
Keywords:
Volterra equation, Carleman transform, spectrum, $C_0$-groups
Affiliations des auteurs :
Sen Zhong Huang 1
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author = {Sen Zhong Huang},
title = {Characterizing spectra of closed operators through existence of slowly growing solutions of their {Cauchy} problems},
journal = {Studia Mathematica},
pages = {23--41},
publisher = {mathdoc},
volume = {116},
number = {1},
year = {1995},
doi = {10.4064/sm-116-1-23-41},
language = {en},
url = {http://geodesic.mathdoc.fr/articles/10.4064/sm-116-1-23-41/}
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Sen Zhong Huang. Characterizing spectra of closed operators through existence of slowly growing solutions of their Cauchy problems. Studia Mathematica, Tome 116 (1995) no. 1, pp. 23-41. doi: 10.4064/sm-116-1-23-41
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