A truly-mixed approach for the analysis of viscoelastic structures and continua is presented. An additive decomposition of the stress state into a viscoelastic part and a purely elastic one is introduced along with an Hellinger-Reissner variational principle wherein the stress represents the main variable of the formulation whereas the kinematic descriptor (that in the case at hand is the velocity field) acts as Lagrange multiplier. The resulting problem is a Differential Algebraic Equation (DAE) because of the need to introduce static Lagrange multipliers to comply with the Cauchy boundary condition on the stress. The associated eigenvalue problem is known in the literature as constrained eigenvalue problem and poses several difficul...
A new approach to structural optimization in dynamic regime is presented that is based on the minimi...
An alternative formulation for the eigenvalue optimization of structures made of rubber- like materi...
The book covers new developments in structural topology optimization. Basic features and limitations...
A truly-mixed approach for the analysis of viscoelastic structures and continua is presented. An add...
In the first part of this paper, a truly-mixed approach of the Hellinger-Reissner type for the analy...
We present an innovative method for the analysis of viscoleastic plane systems based on a truly-mixe...
We present a novel topology optimization formulation capable to handle the presence of stress constr...
We present an alternative topology optimization formulation capable of handling the presence of stre...
A new truly-mixed finite element for the analysis of viscoelastic beams is presented that is based o...
The paper presents a topology optimization formulation that uses mixedfinite elements, here speciali...
The paper deals with a topology optimization formulation that uses mixed-finite elements. The discre...
Under the assumption of small displacements and strains, we formulate new variational principles for...
Topology optimization of continuum structures is a relatively new branch of the structural opti-miza...
The progress made during the past decade in the application of mixed finite element methods to solve...
A new approach to structural optimization in dynamic regime is presented that is based on the minimi...
An alternative formulation for the eigenvalue optimization of structures made of rubber- like materi...
The book covers new developments in structural topology optimization. Basic features and limitations...
A truly-mixed approach for the analysis of viscoelastic structures and continua is presented. An add...
In the first part of this paper, a truly-mixed approach of the Hellinger-Reissner type for the analy...
We present an innovative method for the analysis of viscoleastic plane systems based on a truly-mixe...
We present a novel topology optimization formulation capable to handle the presence of stress constr...
We present an alternative topology optimization formulation capable of handling the presence of stre...
A new truly-mixed finite element for the analysis of viscoelastic beams is presented that is based o...
The paper presents a topology optimization formulation that uses mixedfinite elements, here speciali...
The paper deals with a topology optimization formulation that uses mixed-finite elements. The discre...
Under the assumption of small displacements and strains, we formulate new variational principles for...
Topology optimization of continuum structures is a relatively new branch of the structural opti-miza...
The progress made during the past decade in the application of mixed finite element methods to solve...
A new approach to structural optimization in dynamic regime is presented that is based on the minimi...
An alternative formulation for the eigenvalue optimization of structures made of rubber- like materi...
The book covers new developments in structural topology optimization. Basic features and limitations...