A generalized solution scheme using implicit time integrators for piecewise linear and nonlinear systems is developed. The piecewise linear characteristic has been well-discussed in previous studies, in which the original problem has been transformed into linear complementarity problems (LCPs) and then solved via the Lemke algorithm for each time step. The proposed scheme, instead, uses the projection function to describe the discontinuity in the dynamics equations, and solves for each step the nonlinear equations obtained from the implicit integrator by the semismooth Newton iteration. Compared with the LCP-based scheme, the new scheme offers a more general choice by allowing other nonlinearities in the governing equations. To assess its p...
We propose a generalized Newton method for solving the system of nonlinear equations with linear com...
We compare several methods for approximate implicitization by piecewise polynomials which have been ...
A new time integration scheme is presented for solving the differential equation of motion with nonl...
A generalized solution scheme using implicit time integrators for piecewise linear and nonlinear sys...
A generalized solution scheme using an implicit time integrator for piecewise linear and nonlinear s...
In this paper a new method is proposed for direct time integration of nonlinear structural dynamics ...
University of Minnesota M.S. thesis. August 2013. Major: Mechanical Engineering. Advisor:Kumar K. Ta...
peer reviewedWhen an implicit integration scheme is used, variable step strategies are especially we...
A new implicit algorithm for time step integration of finite element structural dynamic equations is...
A new family of higher-order implicit, one-step integration algorithms has been developed and evalua...
En el presente trabajo se expondrá un nuevo método implícito de integración numérica paso a paso en ...
AbstractPiecewise linear methods had their beginning in the mid-1960s with Lemke's algorithm for cal...
A new family of implicit, single-step time integration methods is presented for solving structural d...
An automatic time stepping algorithm for non-linear problems, solved by implicit schemes, is present...
This chapter describes implicit time integration methods developed by four TILDA partners for the ap...
We propose a generalized Newton method for solving the system of nonlinear equations with linear com...
We compare several methods for approximate implicitization by piecewise polynomials which have been ...
A new time integration scheme is presented for solving the differential equation of motion with nonl...
A generalized solution scheme using implicit time integrators for piecewise linear and nonlinear sys...
A generalized solution scheme using an implicit time integrator for piecewise linear and nonlinear s...
In this paper a new method is proposed for direct time integration of nonlinear structural dynamics ...
University of Minnesota M.S. thesis. August 2013. Major: Mechanical Engineering. Advisor:Kumar K. Ta...
peer reviewedWhen an implicit integration scheme is used, variable step strategies are especially we...
A new implicit algorithm for time step integration of finite element structural dynamic equations is...
A new family of higher-order implicit, one-step integration algorithms has been developed and evalua...
En el presente trabajo se expondrá un nuevo método implícito de integración numérica paso a paso en ...
AbstractPiecewise linear methods had their beginning in the mid-1960s with Lemke's algorithm for cal...
A new family of implicit, single-step time integration methods is presented for solving structural d...
An automatic time stepping algorithm for non-linear problems, solved by implicit schemes, is present...
This chapter describes implicit time integration methods developed by four TILDA partners for the ap...
We propose a generalized Newton method for solving the system of nonlinear equations with linear com...
We compare several methods for approximate implicitization by piecewise polynomials which have been ...
A new time integration scheme is presented for solving the differential equation of motion with nonl...