A parabolic integro differential operator L, suitable to describe many phenomena in various physical fields, is considered. By means of equivalence between L and the third order equation describing the evolution inside an exponentially shaped Josephson junction (ESJJ), an asymptotic analysis for (ESJJ) is achieved, explicitly evaluating, boundary contributions related to the Dirichlet problem.
On Asymptotic Effects of Boundary Perturbations in Exponentially Shaped Josephson Junctions / DE ANGELIS, Monica; Renno, Pasquale. - In: ACTA APPLICANDAE MATHEMATICAE. - ISSN 1572-9036. - 132:1(2014), pp. 251-259. [10.1007/s10440-014-9898-8]
On Asymptotic Effects of Boundary Perturbations in Exponentially Shaped Josephson Junctions
DE ANGELIS, MONICA;RENNO, PASQUALE
2014
Abstract
A parabolic integro differential operator L, suitable to describe many phenomena in various physical fields, is considered. By means of equivalence between L and the third order equation describing the evolution inside an exponentially shaped Josephson junction (ESJJ), an asymptotic analysis for (ESJJ) is achieved, explicitly evaluating, boundary contributions related to the Dirichlet problem.File in questo prodotto:
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