Decay rates for elastic-thermoelastic star-shaped networks
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Publication:1680944
DOI10.3934/nhm.2017020zbMath1377.35022OpenAlexW2752478354MaRDI QIDQ1680944
Publication date: 17 November 2017
Published in: Networks and Heterogeneous Media (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3934/nhm.2017020
Diophantine approximationresolvent estimatesexponential decaypolynomial decayirrationality conditions
Rods (beams, columns, shafts, arches, rings, etc.) (74K10) Asymptotic behavior of solutions to PDEs (35B40) Thermal effects in solid mechanics (74F05) Asymptotic stability in control theory (93D20)
Related Items
Exponential and polynomial stability results for networks of elastic and thermo-elastic rods, Polynomial stability in viscoelastic network of strings, Stability of a variable coefficient star-shaped network with distributed delay, On the existence of a solution of a boundary value problem on a graph for a nonlinear equation of the fourth order, A collocation method for time‐fractional diffusion equation on a metric star graph with η$$ \eta $$ edges, A difference scheme for the time-fractional diffusion equation on a metric star graph, Exponential stability of a damped beam-string-beam transmission problem, Existence and uniqueness results for a nonlinear Caputo fractional boundary value problem on a star graph
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Cites Work
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- Spectrum and stability analysis for a transmission problem in thermoelasticity with a concentrated mass
- Optimal polynomial decay of functions and operator semigroups
- Energy decay rate of the thermoelastic Bresse system
- Non-uniform stability for bounded semi-groups on Banach spaces
- Semigroups of linear operators and applications to partial differential equations
- Singular internal stabilization of the wave equation
- Modeling, analysis and control of dynamic elastic multi-link structures
- Null-controllability of a system of linear thermoelasticity
- Spectral boundary controllability of networks of strings
- Stabilization of generic trees of strings
- Decay rates for the three-dimensional linear system of thermoelasticity
- Polynomial decay and control of a 1D hyperbolic-parabolic coupled system
- Controllability of the linear system of thermoelasticity
- Spectrum and dynamical behavior of a kind of planar network of non-uniform strings with non-collocated feedbacks
- Stabilization of star-shaped networks of strings.
- Stabilization of the wave equation on 1-D networks with a delay term in the nodal feedbacks
- Characterization of polynomial decay rate for the solution of linear evolution equation
- Simultaneous approximation to algebraic numbers by rationals
- Wave propagation, observation and control in 1-\(d\) flexible multi-structures.
- Controllability of star-shaped networks of strings
- Controllability of tree-shaped networks of vibrating strings
- Output feedback stabilisation of a tree-shaped network of vibrating strings with non-collocated observation
- Energy decay in a transmission problem in thermoelasticity of type III
- Asymptotic behavior of some elastic planar networks of Bernoulli–Euler beams
- Stabilization of the Wave Equation on 1-d Networks
- On the Spectrum of C 0 -Semigroups
- Asymptotic stability of linear differential equations in Banach spaces
- Spectral Theory for Contraction Semigroups on Hilbert Space
- On the essential spectrum of a semigroup of thermoelasticity
- Transmission problem in thermoelasticity with symmetry
- Spectral Methods in MATLAB
- Thermoelasticity with second sound?exponential stability in linear and non-linear 1-d
- Asymptotic behaviour and exponential stability for a transmission problem in thermoelasticity
- Exponential stability of a network of elastic and thermoelastic materials
- Spectral analysis and stability of thermoelastic Bresse system with second sound and boundary viscoelastic damping
- Abstract Second Order Hyperbolic System and Applications to Controlled Network of Strings
- The Lack of Exponential Stability in Certain Transmission Problems with Localized Kelvin--Voigt Dissipation
