Newmark-beta method

The Newmark-beta method is a method of numerical integration used to solve differential equations. It is used in finite element analysis to model dynamic systems.

Recalling the continuous time equation of motion,

${\displaystyle u={\dot {u}}t+{\begin{matrix}{\frac {1}{2}}\end{matrix}}{\ddot {u}}t^{2}}$

Using the extended mean value theorem, The Newmark-${\displaystyle \beta }$ method states that the first time derivative (velocity in the equation of motion) can be solved as,

${\displaystyle {\dot {u}}_{n+1}={\dot {u}}_{n}+{\Delta }t~{\ddot {u}}_{\gamma }}$

where

${\displaystyle {\ddot {u}}_{\gamma }=(1-\gamma ){\ddot {u}}_{n}+\gamma {\ddot {u}}_{n+1}~~~~0\leq \gamma \leq 1}$

therefore

${\displaystyle {\dot {u}}_{n+1}={\dot {u}}_{n}+(1-\gamma ){\Delta }t~{\ddot {u}}_{n}+\gamma {\Delta }t~{\ddot {u}}_{n+1}}$.

Because acceleration also varies with time, however, the extended mean value theorem must also be extended to the second time derivative to obtain the correct displacement. Thus,

${\displaystyle {u}_{n+1}=u_{n}+{\Delta }t~{\dot {u}}_{n+1}+{\begin{matrix}{\frac {1}{2}}\end{matrix}}{\Delta }t^{2}~{\ddot {u}}_{\beta }}$

where again

${\displaystyle {\ddot {u}}_{\beta }=(1-2\beta ){\ddot {u}}_{n}+2\beta {\ddot {u}}_{n+1}~~~~0\leq \beta \leq 1}$

Newmark showed that a reasonable value of ${\displaystyle \gamma }$ is 0.5, therefore,

${\displaystyle {u}_{n+1}=u_{n}+{\Delta }t~{\dot {u}}_{n}+{\begin{matrix}{\frac {1-2\beta }{2}}\end{matrix}}{\Delta }t^{2}{\ddot {u}}_{n}+\beta {\Delta }t^{2}{\ddot {u}}_{n+1}}$

Setting ${\displaystyle \beta }$ to various values between 0 and 1 can give a wide range of results. Typically ${\displaystyle \beta =1/4}$, which yields the constant average acceleration method, is used.