Remark on interpolation by L-almost periodic functions
Remarques sur les fonctions multiplicatives
Remotely -almost periodic type functions in
In this paper, we relate the notions of remote almost periodicity and quasi-asymptotical almost periodicity; in actual fact, we observe that a remotely almost periodic function is nothing else but a bounded, uniformly continuous quasi-asymptotically almost periodic function. We introduce and analyze several new classes of remotely -almost periodic functions in slowly oscillating functions in and further analyze the recently introduced class of quasi-asymptotically -almost periodic functions...
Semigroup compactifications by generalized distal functions and a fixed point theorem.
Semigroupes de contractions linéaires sur C(X) : irrédductibilité et théorèmes de convergence.
Series trigonometriques speciales et corps quadratiques
Sidon sets and Bohr cluster points
It is shown that a Sidon set cannot have an integer cluster point in the Bohr topology.
Some algebraic universal semigroup compactifications.
SOME GENERAL RESULTS ON FIXED POINTS AND INVARIANT MEANS.
Some problems concerning different types of vector valued almost periodic functions [Book]
Some results in spectral analysis and synthesis at infinity.
Some special W-almost periodic sets on the integers.
Stepanov-like almost automorphic solutions for nonautonomous evolution equations.
Strong stabilization of controlled vibrating systems
This paper deals with feedback stabilization of second order equations of the form ytt + A0y + u (t) B0y (t) = 0, t ∈ [0, +∞[, where A0 is a densely defined positive selfadjoint linear operator on a real Hilbert space H, with compact inverse and B0 is a linear map in diagonal form. It is proved here that the classical sufficient ad-condition of Jurdjevic-Quinn and Ball-Slemrod with the feedback control u = ⟨yt, B0y⟩H implies the strong stabilization. This result is derived from a general compactness...
Strong stabilization of controlled vibrating systems
This paper deals with feedback stabilization of second order equations of the form ytt + A0y + u (t) B0y (t) = 0, t ∈ [0, +∞[, where A0 is a densely defined positive selfadjoint linear operator on a real Hilbert space H, with compact inverse and B0 is a linear map in diagonal form. It is proved here that the classical sufficient ad-condition of Jurdjevic-Quinn and Ball-Slemrod with the feedback control u = ⟨yt, B0y⟩H implies the strong stabilization. This result is derived from a general compactness theorem...
Strongly mixing groups.
Subspaces of with unique topological left invariant mean
Suites algébriques, automates et substitutions
Suites uniformément distribuées et fonctions faiblement presque-périodiques
The Bohr Almost Periodic Functions Do Not Form a Linear Space.