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The journal Asymptotic Analysis fulfills a twofold function. It aims at publishing original mathematical results in the asymptotic theory of problems affected by the presence of small or large parameters on the one hand, and at giving specific indications of their possible applications to different fields of natural sciences on the other hand.
Asymptotic Analysis thus provides mathematicians with a concentrated source of newly acquired information which they may need in the analysis of asymptotic problems.
Authors: Wang, Yonghai | Zhong, Chengkui
Article Type: Research Article
Abstract: In this paper, we mainly prove the upper semicontinuity of global attractors for a damped wave equations with perturbations.
Keywords: damped wave equations, global attractors, upper semicontinuity
DOI: 10.3233/ASY-141253
Citation: Asymptotic Analysis, vol. 91, no. 1, pp. 1-10, 2015
Authors: Royer, Julien
Article Type: Research Article
Abstract: We study the high frequency limit for the dissipative Helmholtz equation when the source term concentrates on a submanifold of Rn . We prove that the solution has a unique semi-classical measure, which is precisely described in terms of the classical properties of the problem. This result is already known when the micro-support of the source is bounded, we now consider the general case.
Keywords: non-selfadjoint operators, resolvent estimates, Helmholtz equation, semiclassical measures
DOI: 10.3233/ASY-141255
Citation: Asymptotic Analysis, vol. 91, no. 1, pp. 11-32, 2015
Authors: Grigis, Alain | Martinez, André
Article Type: Research Article
Abstract: Motivated by the study of resonances for molecular systems in the Born–Oppenheimer approximation, we consider a semiclassical 2×2 matrix Schrödinger operator of the form P=−h2 ΔI2 +diag (xn −μ,τV2 (x))+hR(x,hDx ), where μ and τ are two small positive constants, V2 is real-analytic and admits a nondegenerate minimum at 0, and R=(rj,k (x,hDx ))1≤j,k≤2 is a symmetric off-diagonal 2×2 matrix of first-order differential operators with analytic coefficients. Then, denoting by e1 the first eigenvalue of −Δ+〈τV2 ″(0)x,x〉/2, and under some ellipticity condition on r1,2 =r2,1 * , we show that, for any μ sufficiently small, and …for 0<τ≤τ(μ) with some τ(μ)>0, the unique resonance ρ of P such that ρ=τV2 (0)+(e1 +r2,2 (0,0))h+𝒪(h2 ) (as h→0+ ) satisfies Im ρ=−h3/2 f(h,ln 1/h)e−2S/h , where f(h,ln 1/h)~Σ0≤m≤ℓ fℓ,m hℓ (ln 1/h)m is a symbol with f0,0 >0, and S is the imaginary part of the complex action along some convenient closed path containing (0,0) and consisting of a union of complex nul-bicharacteristics of p1 :=ξ2 −xn −μ and p2 :=ξ2 +τV2 (x) (broken instanton). This broken instanton is described in terms of the outgoing and incoming complex Lagrangian manifolds associated with p2 at the point (0,0), and their intersections with the characteristic set p1 −1 (0) of p1 . Show more
Keywords: resonances, Born–Oppenheimer approximation, microlocal tunneling, pseudodifferential operators
DOI: 10.3233/ASY-141256
Citation: Asymptotic Analysis, vol. 91, no. 1, pp. 33-90, 2015
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