Existence and Non-Existence of Finite-Dimensional Globally Attracting Invariant Manifolds in Semilinear Damped Wave Equations

“…The desired attracting invariant manifolds wili then be sought for as graphs of mappings giving the fast components as a function of the slow ones. In [8], this was done for e ^ 0 by working on the first-order system (1.9) as a perturbation of the one corresponding to F = 0, and decomposing the variable according to the spectrum of A c . Here, we adopt a somewhat different approach, the différences lying both in the way of decomposing the variable and of choosing the « unperturbed » linear system.…”

“…In the following, the orthogonal projections of E onto E t (i = l> 2) will be denoted as P n and the corresponding parts of A will be denoted as A t . Parallel to this décomposition of E, the spaces E a /a = -5 décompose also orthogonally as E a = Ef © E% 9 where Ef -P t E a . The spaces E l7 El /2 , El consist all in the same n-dimensional vector space provided with different but equivalent inner products.…”

“…For E = 0, the state variable is thus decomposed into the two components u x and w 2 , which are to be considered as taking values respectively in E x 2 and E 2 2 . For e ^ 0, the state variable will be considered as decomposed into the four components u x , u 2 ) and in fact to C\W l9 El) 9 where W 1 is a certain bounded domain in E x . Here, this result will be accompanied by an extension to small non-zero values of s. Specifically, it will be shown that, under the same gap condition there exists an ê>0 such that, for e e (0, ê), the global attractor of the hyperbolic system (1.5) is also contained in a local invariant manifold of class C 1 and dimension n, M £ , which is described by a set of relations giving u 2 , ü 1 , and ü 2 as functions of u x :…”

“…by Xavier MORA Q), Joan SOLÀ-MORALES ( 2 ) In the present communication we give an account of the results obtained by the authors in [8], [9], and [10], with some slight improvements in what refers to [9]. We are concerned with the qualitative dynamics of a onedimensional semilinear damped wave équation and its dependence with respect to the coefficient of the second-order time derivative, hereafter denoted by e 2 , this parameter being considered to vary right up to the limiting value e 2 = 0, in which case the équation turns into a semilinear diffusion one.…”

“…In the finitedimensional case, our result is included essentially in that of Hartman (1960) [6, Theorem (I)], which instead of our condition (3.2) requires only that Lbea contraction. For the proofs of the following statements, the reader is referred to [9] …”

Inertial manifolds of damped semilinear wave equations

“…The desired attracting invariant manifolds wili then be sought for as graphs of mappings giving the fast components as a function of the slow ones. In [8], this was done for e ^ 0 by working on the first-order system (1.9) as a perturbation of the one corresponding to F = 0, and decomposing the variable according to the spectrum of A c . Here, we adopt a somewhat different approach, the différences lying both in the way of decomposing the variable and of choosing the « unperturbed » linear system.…”

“…In the following, the orthogonal projections of E onto E t (i = l> 2) will be denoted as P n and the corresponding parts of A will be denoted as A t . Parallel to this décomposition of E, the spaces E a /a = -5 décompose also orthogonally as E a = Ef © E% 9 where Ef -P t E a . The spaces E l7 El /2 , El consist all in the same n-dimensional vector space provided with different but equivalent inner products.…”

“…For E = 0, the state variable is thus decomposed into the two components u x and w 2 , which are to be considered as taking values respectively in E x 2 and E 2 2 . For e ^ 0, the state variable will be considered as decomposed into the four components u x , u 2 ) and in fact to C\W l9 El) 9 where W 1 is a certain bounded domain in E x . Here, this result will be accompanied by an extension to small non-zero values of s. Specifically, it will be shown that, under the same gap condition there exists an ê>0 such that, for e e (0, ê), the global attractor of the hyperbolic system (1.5) is also contained in a local invariant manifold of class C 1 and dimension n, M £ , which is described by a set of relations giving u 2 , ü 1 , and ü 2 as functions of u x :…”

“…by Xavier MORA Q), Joan SOLÀ-MORALES ( 2 ) In the present communication we give an account of the results obtained by the authors in [8], [9], and [10], with some slight improvements in what refers to [9]. We are concerned with the qualitative dynamics of a onedimensional semilinear damped wave équation and its dependence with respect to the coefficient of the second-order time derivative, hereafter denoted by e 2 , this parameter being considered to vary right up to the limiting value e 2 = 0, in which case the équation turns into a semilinear diffusion one.…”

“…In the finitedimensional case, our result is included essentially in that of Hartman (1960) [6, Theorem (I)], which instead of our condition (3.2) requires only that Lbea contraction. For the proofs of the following statements, the reader is referred to [9] …”

Inertial manifolds of damped semilinear wave equations

Essential Manifolds for an Elliptic Problem in an Infinite Strip

Attractors for Nonautonomous Navier–Stokes System and Other Partial Differential Equations