In this paper we present a method for nonlinear frequency response analysis of mechanical vibrations of 3-dimensional solid structures. For computing nonlinear frequency response to periodic excitations, we employ the well-established harmonic balance method. A fundamental aspect for allowing a large-scale application of the method is model order reduction of the discretized equation of motion. Therefore we propose the utilization of a modal projection method enhanced with modal derivatives, providing second-order information. For an efficient spatial discretization of continuum mechanics nonlinear partial differential equations, including large deformations and hyperelastic material laws, we use the isogeometric finite element method, ...
In this paper, a method for obtaining nonlinear sti ness coe cients in modal coordinates for geometr...
Finite Element Models (FEMs) are widely used in order to study and predict the dynamic properties of...
Numerical integration method for calculating dynamic response of nonlinear elastic structure
In this paper we present a method for nonlinear frequency response analysis of mechanical vibrations...
Periodic vibration response of nonlinear mechanical systems can be efficiently computed using Harmon...
Nonlinear effects may play a crucial role, and therefore cannot be ignored in determining forced res...
A nonlinear modal analysis procedure is presented for the forced response of nonlinear structural sy...
The article proposes a method developed for model order reduction in a Finite Element (FE) framework...
In this paper, an equivalent linearization method considering higher order statistics based on nonli...
In this paper we analyze the vibrations of nonlinear structures by means of the novel approach of is...
International audienceNon-intrusive methods have been used since two decades to derive reduced-order...
Simulation of structural dynamics involving global nonlinearities, such as large amplitude motion, i...
Theoretical and experimental modal analysis, i.e., the computation of vibration modes from a mathema...
This paper presents a general methodology to compute nonlinear frequency responses of flat structure...
A computational algorithm for predicting the nonlinear dynamic response of a structure is presented....
In this paper, a method for obtaining nonlinear sti ness coe cients in modal coordinates for geometr...
Finite Element Models (FEMs) are widely used in order to study and predict the dynamic properties of...
Numerical integration method for calculating dynamic response of nonlinear elastic structure
In this paper we present a method for nonlinear frequency response analysis of mechanical vibrations...
Periodic vibration response of nonlinear mechanical systems can be efficiently computed using Harmon...
Nonlinear effects may play a crucial role, and therefore cannot be ignored in determining forced res...
A nonlinear modal analysis procedure is presented for the forced response of nonlinear structural sy...
The article proposes a method developed for model order reduction in a Finite Element (FE) framework...
In this paper, an equivalent linearization method considering higher order statistics based on nonli...
In this paper we analyze the vibrations of nonlinear structures by means of the novel approach of is...
International audienceNon-intrusive methods have been used since two decades to derive reduced-order...
Simulation of structural dynamics involving global nonlinearities, such as large amplitude motion, i...
Theoretical and experimental modal analysis, i.e., the computation of vibration modes from a mathema...
This paper presents a general methodology to compute nonlinear frequency responses of flat structure...
A computational algorithm for predicting the nonlinear dynamic response of a structure is presented....
In this paper, a method for obtaining nonlinear sti ness coe cients in modal coordinates for geometr...
Finite Element Models (FEMs) are widely used in order to study and predict the dynamic properties of...
Numerical integration method for calculating dynamic response of nonlinear elastic structure