Exponential stability of the semigroup associated with a thermoelastic system

Abstract: Abstract. In this paper it is proved that the semigroup associated with the onedimensional thermoelastic system with Dirichlet boundary conditions is an exponen-12 2 tially stable C0-semigroup of contraction on the space H0 x L x L . The technique of the proof is completely different from the usual energy method. It is shown that the exponential decay in 3 (s/) recently obtained by Revira is a consequence of our main result. An important application of our main result to the Linear-QuadraticGaussian optimal co… Show more

“…In this direction, we quote some works dealing with thermoelasic rods and plates. 1,10,11,[15][16][17][19][20][21]23,25 The plan of the paper is as follows. In Sec.…”

Stability of Abstract Linear Thermoelastic Systems With Memory

“…In this direction, we quote some works dealing with thermoelasic rods and plates. 1,10,11,[15][16][17][19][20][21]23,25 The plan of the paper is as follows. In Sec.…”

Stability of Abstract Linear Thermoelastic Systems With Memory

“…Note that condition (1.2) is weaker than the following usual condition on the Lame coefficients (see [44] and [13, p. 414]) nX + 2fx > 0. (1)(2)(3) Extensive work has been done on the problem of stabilization for system (1.1) (see [5,9,7,12,17,20,27,33,37,40,42,43,45,46,47,48]). We give here a brief description of the existing literature.…”

“…Furthermore, in the case of one space dimension, it has been shown (see [9,17,20,40]) that the energy E(u, 6, t) of system (1.1) associated with various boundary conditions decays to zero exponentially.…”

Uniform stabilization of the higher-dimensional system of thermoelasticity with a nonlinear boundary feedback

“…The interest here is that, in the one-dimensional case (the one-dimensional thermoelasticity system), the exponential stability remains even if a ≡ 0 (see [8]). …”

Stability of coupled systems