à paraitreInternational audienceGreen's functions are important mathematical tools in mechanics and in other parts of physics. For instance, the boundary element method needs to know the Green's function of the problem to compute its numerical solution. However, Green's functions are only known in a limited number of cases, often under the form of complex analytical expressions. In this article, a new method is proposed to calculate Green's functions for any linear homogeneous medium from a simple finite element model. The method relies on the theory of wave propagation in periodic media and requires the knowledge of the finite element dynamic stiffness matrix of only one period. Several examples are given to check the accuracy and the effi...
We describe an implementation technique for boundary element methods that greatly reduces the requir...
An asymptotic Green's function in homogeneous anisotropic viscoelastic media is derived. The Green's...
The forced response of two-dimensional, infinite, homogenous media subjected to time harmonic loadin...
à paraitreInternational audienceGreen's functions are important mathematical tools in mechanics and ...
In this report dynamic solution of unbounded domains using pure finite element method is presented. ...
Displacement Green's function is the building block for some semi-analytical methods like Boundary E...
Numerical methods which are based on boundary integral formulations require the numerical evaluation...
International audienceThis paper presents a new Green's operator (Gamma-operator) for mixed periodic...
The homogeneous Green’s function is the Green’s function minus its timereversal. Many wavefield imag...
The paper deals with the boundary element method formulation of the steady-state wave propagation th...
This work presents analytical Green's functions for the steady state response of a homogeneous three...
In this book mathematical techniques for integral transforms are described in detail but concisely. ...
The Green’s function is widely used in solving boundary value problems for differential equations, t...
A new analytical method for the approximate computation of the time-dependent Green's function for t...
The homogeneous Green’s function is the difference between an impulse response and its time-reversal...
We describe an implementation technique for boundary element methods that greatly reduces the requir...
An asymptotic Green's function in homogeneous anisotropic viscoelastic media is derived. The Green's...
The forced response of two-dimensional, infinite, homogenous media subjected to time harmonic loadin...
à paraitreInternational audienceGreen's functions are important mathematical tools in mechanics and ...
In this report dynamic solution of unbounded domains using pure finite element method is presented. ...
Displacement Green's function is the building block for some semi-analytical methods like Boundary E...
Numerical methods which are based on boundary integral formulations require the numerical evaluation...
International audienceThis paper presents a new Green's operator (Gamma-operator) for mixed periodic...
The homogeneous Green’s function is the Green’s function minus its timereversal. Many wavefield imag...
The paper deals with the boundary element method formulation of the steady-state wave propagation th...
This work presents analytical Green's functions for the steady state response of a homogeneous three...
In this book mathematical techniques for integral transforms are described in detail but concisely. ...
The Green’s function is widely used in solving boundary value problems for differential equations, t...
A new analytical method for the approximate computation of the time-dependent Green's function for t...
The homogeneous Green’s function is the difference between an impulse response and its time-reversal...
We describe an implementation technique for boundary element methods that greatly reduces the requir...
An asymptotic Green's function in homogeneous anisotropic viscoelastic media is derived. The Green's...
The forced response of two-dimensional, infinite, homogenous media subjected to time harmonic loadin...