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Asymptotic behaviour of holomorphic strips

, 2000
"... The asymptotic behaviour of a finite energy pseudoholomorphic strip with Lagrangian boundary conditions in a symplectic manifold is determined by an eigenfunction of the linearized operator at the (transverse) intersection. ..."
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Cited by 30 (7 self)
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The asymptotic behaviour of a finite energy pseudoholomorphic strip with Lagrangian boundary conditions in a symplectic manifold is determined by an eigenfunction of the linearized operator at the (transverse) intersection.
Asymptotic Behaviour of Ground States
"... We derive the asymptotic behaviour of the ground states of a system of two coupled semilinear Poisson equations with a strongly indefinite variational structure in the critical Sobolev growth case. AMS(MOS) Subject Classification. Primary 35J55, secundary 34C37. Key Words and Phrases. Systems, str ..."
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Cited by 3 (1 self)
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We derive the asymptotic behaviour of the ground states of a system of two coupled semilinear Poisson equations with a strongly indefinite variational structure in the critical Sobolev growth case. AMS(MOS) Subject Classification. Primary 35J55, secundary 34C37. Key Words and Phrases. Systems
Asymptotic Behaviour of Ground States
"... We derive the asymptotic behaviour of the ground states of a system of two coupled semilinear Poisson equations with a strongly indefinite variational structure in the critical Sobolev growth case. AMS(MOS) Subject Classification. Primary 35J55, secundary 34C37. Key Words and Phrases. Systems, str ..."
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We derive the asymptotic behaviour of the ground states of a system of two coupled semilinear Poisson equations with a strongly indefinite variational structure in the critical Sobolev growth case. AMS(MOS) Subject Classification. Primary 35J55, secundary 34C37. Key Words and Phrases. Systems
Asymptotic behaviour of curvature and matter
 in the Penrose limit, arXiv:grqc/041115
"... The asymptotic behaviour of the components of the Weyl tensor and of the energymomentum tensor in the Penrose limit is determined. In both cases a peelingoff property is found. Examples of different types of matter are provided. The expansion and shear of the congruence of null geodesics along whi ..."
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Cited by 1 (0 self)
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The asymptotic behaviour of the components of the Weyl tensor and of the energymomentum tensor in the Penrose limit is determined. In both cases a peelingoff property is found. Examples of different types of matter are provided. The expansion and shear of the congruence of null geodesics along
Asymptotic behaviour of the Urbanik semigroup
, 2013
"... We revisit the product convolution semigroup of probability densities ec(t), c> 0 on the positive halfline with moments (n!) c and determine the asymptotic behaviour of ec for large and small t> 0. This shows that (n!)c is indeterminate as Stieltjes moment sequence if and only if c> 2. 200 ..."
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We revisit the product convolution semigroup of probability densities ec(t), c> 0 on the positive halfline with moments (n!) c and determine the asymptotic behaviour of ec for large and small t> 0. This shows that (n!)c is indeterminate as Stieltjes moment sequence if and only if c> 2
ASYMPTOTIC BEHAVIOUR OF EISENSTEIN INTEGRALS
"... Let G be a noncompact connected real semisimple Lie group with finite centre. The asymptotic behaviour of Eisenstein integrals associated with a minimal parabolic subgroup of G has to a large extent been studied by HarishChandra (unpublished work, see [12] for an account, and later in a more genera ..."
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Let G be a noncompact connected real semisimple Lie group with finite centre. The asymptotic behaviour of Eisenstein integrals associated with a minimal parabolic subgroup of G has to a large extent been studied by HarishChandra (unpublished work, see [12] for an account, and later in a more
The asymptotic behaviour of algebraic approximants
, 2000
"... We study the convergence of algebraic approximants to a function represented by a power series. We consider, for an arbitrary but xed degree, approximant sequences which can be generated recursively by use of Sergeyev’s algorithm. For the exponential function, a logarithmic function and a power of ..."
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Cited by 3 (0 self)
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of a binomial, we nd explicit formulae for the coe ¯ cients that appear in a resulting linear recurrence relation. We assume that the error equation may be linearized for small errors. Analysis then yields the generic dominant term in the asymptotic behaviour of the error when a large number of terms
Asymptotic behaviour of the complexity . . .
"... The behaviour of a backtrack algorithm for graph coloring is well understood for large random graphs with constant edge density. However, sparse graphs, in which the edge density decreases with increasing graph size, are more common in practice. Therefore, in this paper we analyze the expected runt ..."
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the expected runtime grows polynomially or exponentially, depending on the edge density function. Besides, we also investigate the asymptotic behaviour of the expected number of solutions in this model.
4 Asymptotic behaviour Asymptotic behaviour for the nonlocal PME
, 2009
"... Traditional porous medium The basics 2 Nonlinear diffusion with nonlocal effects The model Other models ..."
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Traditional porous medium The basics 2 Nonlinear diffusion with nonlocal effects The model Other models
Asymptotic behaviour of the number of Eulerian circuits
"... We determine the asymptotic behaviour of the number of Eulerian circuits in undirected simple graphs with large algebraic connectivity (the secondsmallest eigenvalue of the Laplacian matrix). We also prove some new properties of the Laplacian matrix. 1 ..."
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Cited by 4 (1 self)
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We determine the asymptotic behaviour of the number of Eulerian circuits in undirected simple graphs with large algebraic connectivity (the secondsmallest eigenvalue of the Laplacian matrix). We also prove some new properties of the Laplacian matrix. 1
Results 1  10
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3,159