Composite methods for structural dynamics

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Composite methods are an approach applied in structural dynamics and related fields. They combine various methods in each time step, in order to acquire the advantages of different methods. The existing composite methods show satisfactory accuracy and powerful numerical dissipation, which is particularly useful for solving stiff problems^[1] and differential-algebraic equations.^[2]

After spatial discretization, structural dynamics problems are generally described by the second-order ordinary differential equation:

${\displaystyle M\ddot{u}+C\dot{u}+f(u,t)=R(t)}$.

Here ${\displaystyle u}$, ${\displaystyle \dot{u}}$ and ${\displaystyle \ddot{u}}$ denote the displacement, velocity and acceleration vectors respectively, ${\displaystyle M}$ is the mass matrix, ${\displaystyle C}$ is the damping matrix, ${\displaystyle f(u,t)}$ collects the internal force, and ${\displaystyle R(t)}$ is the external load. At the initial time ${\displaystyle t_0}$, the initial displacement and velocity are supposed to be given as ${\displaystyle u_0}$ and ${\displaystyle {\dot{u}}_0}$, respectively, and the initial acceleration can be solved as

${\displaystyle {\ddot{u}}_0=M^{-1}(R(t_0)-C{\dot{u}}_0-f(u_0,t_0))}$.

For numerical analysis, the overall time domain ${\displaystyle [t_0,t_N]}$ is divided into a series of time steps by ${\displaystyle t_1}$, ${\displaystyle t_2}$, ${\displaystyle \cdots }$, ${\displaystyle t_k}$, ${\displaystyle t_{k+1}}$, ${\displaystyle \cdots }$. Taking the step ${\displaystyle [t_k,t_{k+1}]}$ (${\displaystyle t_{k+1}-t_k=h}$ is the step size), the main concept of composite methods is to subdivide the current step to several sub-steps ${\displaystyle [t_k,t_{k+{\gamma }_1}]}$, ${\displaystyle [t_{k+{\gamma }_1},t_{k+{\gamma }_2}]}$, ${\displaystyle \cdots }$, and to use different numerical methods in each sub-step.

Although there are lots of available methods, see the review,^[3] the existing composite methods basically employ the combination of the trapezoidal rule and linear multistep methods. However, to acquire at least second-order accuracy and unconditional stability, the scalar parameters of each method and the division of sub-steps need to be determined carefully.

The Bathe method ^[4][5] is a two-sub-step method. In the first sub-step ${\displaystyle [t_k,t_{k+\gamma }]}$ (${\displaystyle t_{k+\gamma }-t_k=\gamma h}$, ${\displaystyle \gamma \in (0,1)}$), the trapezoidal rule is used as:

${\displaystyle u_{k+\gamma }=u_k+\frac{\gamma h}{2}({\dot{u}}_k+{\dot{u}}_{k+\gamma })}$

${\displaystyle {\dot{u}}_{k+\gamma }={\dot{u}}_k+\frac{\gamma h}{2}({\ddot{u}}_k+{\ddot{u}}_{k+\gamma })}$

${\displaystyle M{\ddot{u}}_{k+\gamma }+C{\dot{u}}_{k+\gamma }+f(u_{k+\gamma },t_{k+\gamma })=R(t_{k+\gamma })}$

In the second sub-step ${\displaystyle [t_{k+\gamma },t_{k+1}]}$ (${\displaystyle t_{k+1}-t_{k+\gamma }=(1-\gamma )h}$), the 3-point Euler backward method is employed as

${\displaystyle {\dot{u}}_{k+1}=\frac{1-\gamma }{\gamma h}{u}_k-\frac{1}{(1-\gamma )\gamma h}{u}_{k+\gamma }+\frac{2-\gamma }{(1-\gamma )h}{u}_{k+1}}$

${\displaystyle {\ddot{u}}_{k+1}=\frac{1-\gamma }{\gamma h}{\dot{u}}_k-\frac{1}{(1-\gamma )\gamma h}{\dot{u}}_{k+\gamma }+\frac{2-\gamma }{(1-\gamma )h}{\dot{u}}_{k+1}}$

${\displaystyle M{\ddot{u}}_{k+1}+C{\dot{u}}_{k+1}+f(u_{k+1},t_{k+1})=R(t_{k+1})}$

For nonlinear dynamics, that is, the internal force ${\displaystyle f}$ is a nonlinear function with respect to ${\displaystyle u}$, the Newton-Raphson iterations can be used to solve the nonlinear equations per step. The parameter ${\displaystyle \gamma }$ is usually set as ${\displaystyle \frac{1}{2}}$ and ${\displaystyle 2-\sqrt{2}}$ in practice.

The Bathe method is second-order accurate and unconditionally stable from linear analysis. Besides, this method can provide strong numerical dissipation for high-frequency content, which is helpful to damp out the stiff components and enhance the stability for nonlinear dynamics.

On this basis, to acquire prescribed degree of numerical dissipation, the ${\displaystyle {\rho }_{\mathrm{\infty }}}$-Bathe method ^[6] was developed by replacing the 3-point Euler backward method in the second sub-step with a general formula:

${\displaystyle u_{k+1}=u_k+h(q_0{\dot{u}}_k+q_1{\dot{u}}_{k+\gamma }+q_2{\dot{u}}_{k+1})}$

${\displaystyle {\dot{u}}_{k+1}={\dot{u}}_k+h(q_0{\ddot{u}}_k+q_1{\ddot{u}}_{k+\gamma }+q_2{\ddot{u}}_{k+1})}$

${\displaystyle M{\ddot{u}}_{k+1}+C{\dot{u}}_{k+1}+f(u_{k+1},t_{k+1})=R(t_{k+1})}$

The parameters are selected as recommended

${\displaystyle \gamma =\frac{2-\sqrt{2(1+{\rho }_{\mathrm{\infty }})}}{1-{\rho }_{\mathrm{\infty }}}\text{ if }{\rho }_{\mathrm{\infty }}\in [0,1);\gamma =\frac{1}{2}\text{ if }{\rho }_{\mathrm{\infty }}=1}$

${\displaystyle q_1=\frac{{\rho }_{\mathrm{\infty }}+1}{2\gamma ({\rho }_{\mathrm{\infty }}-1)+4},q_0=(\gamma -1)q_1+\frac{1}{2},q_2=-\gamma q_1+\frac{1}{2}}$

With the set of parameters, the ${\displaystyle {\rho }_{\mathrm{\infty }}}$-Bathe method can also achieve second-order accuracy and unconditional stability. Moreover, by adjusting the parameter ${\displaystyle {\rho }_{\mathrm{\infty }}}$, this method can provide tunable degree of numerical dissipation. The method with a smaller ${\displaystyle {\rho }_{\mathrm{\infty }}}$ shows stronger numerical dissipation, but lower accuracy in the low-frequency content. When ${\displaystyle {\rho }_{\mathrm{\infty }}=0}$, it is equivalent to the original Bathe method with ${\displaystyle \gamma =2-\sqrt{2}}$.

Following the idea of the Bathe method, the three-sub-step composite methods that use the trapezoidal rule in the first two sub-steps were also discussed.^[7][8][9] They divides the current step into ${\displaystyle [t_k,t_{k+{\gamma }_1}]}$, ${\displaystyle [t_{k+{\gamma }_1},t_{k+{\gamma }_2}]}$ and ${\displaystyle [t_{k+{\gamma }_2},t_{k+1}]}$, and generally, the first two sub-steps are set as equal size, that is ${\displaystyle {\gamma }_2=2{\gamma }_1}$. In the first two sub-steps, the trapezoidal rule is used, as

${\displaystyle u_{k+{\gamma }_1}=u_k+\frac{{\gamma }_{1}h}{2}({\dot{u}}_k+{\dot{u}}_{k+{\gamma }_1})}$

${\displaystyle {\dot{u}}_{k+{\gamma }_1}={\dot{u}}_k+\frac{{\gamma }_{1}h}{2}({\ddot{u}}_k+{\ddot{u}}_{k+{\gamma }_1})}$

${\displaystyle M{\ddot{u}}_{k+{\gamma }_1}+C{\dot{u}}_{k+{\gamma }_1}+f(u_{k+{\gamma }_1},t_{k+{\gamma }_1})=R(t_{k+{\gamma }_1})}$

and

${\displaystyle u_{k+{\gamma }_2}=u_{k+{\gamma }_1}+\frac{({\gamma }_2-{\gamma }_1)h}{2}({\dot{u}}_{k+{\gamma }_1}+{\dot{u}}_{k+{\gamma }_2})}$

${\displaystyle {\dot{u}}_{k+{\gamma }_2}={\dot{u}}_{k+{\gamma }_1}+\frac{({\gamma }_2-{\gamma }_1)h}{2}({\ddot{u}}_{k+{\gamma }_1}+{\ddot{u}}_{k+{\gamma }_2})}$

${\displaystyle M{\ddot{u}}_{k+{\gamma }_2}+C{\dot{u}}_{k+{\gamma }_2}+f(u_{k+{\gamma }_2},t_{k+{\gamma }_2})=R(t_{k+{\gamma }_2})}$

In the last sub-step, a general formula is utilized as

${\displaystyle u_{k+1}=u_k+h(c_0{\dot{u}}_k+c_1{\dot{u}}_{k+{\gamma }_1}+c_2{\dot{u}}_{k+{\gamma }_2}+c_3{\dot{u}}_{k+1})}$

${\displaystyle {\dot{u}}_{k+1}={\dot{u}}_k+h(c_0{\ddot{u}}_k+c_1{\ddot{u}}_{k+{\gamma }_1}+c_2{\ddot{u}}_{k+{\gamma }_2}+c_3{\ddot{u}}_{k+1})}$

${\displaystyle M{\ddot{u}}_{k+1}+C{\dot{u}}_{k+1}+f(u_{k+1},t_{k+1})=R(t_{k+1})}$

For this method, Li et al.^[8] offered two optimal set of parameters, as

${\displaystyle a=\frac{1}{2}(1\pm {\rho }_{\mathrm{\infty }}),c_0=\frac{-(a+1){\gamma }_1^2+4{\gamma }_1-1}{4{\gamma }_1},c_1=\frac{1+(a-1){\gamma }_1}{2},c_2=\frac{(1-a){\gamma }_1^2-2{\gamma }_1+1}{4{\gamma }_1},c_3=\frac{{\gamma }_1}{2}}$

Here ${\displaystyle {\gamma }_2=2{\gamma }_1}$ is assumed, and ${\displaystyle {\gamma }_1}$ is the minimum value that satisfies ${\displaystyle 48(a-1){\gamma }_1^4-32(a-5){\gamma }_1^3-192{\gamma }_1^2+96{\gamma }_1-16\ge 0}$.

The resulting two sub-families are all second-order accurate, unconditionally stable, and can provide tunable numerical dissipation by adjusting ${\displaystyle {\rho }_{\mathrm{\infty }}}$. They become the same when ${\displaystyle {\rho }_{\mathrm{\infty }}=0}$. When ${\displaystyle 0<{\rho }_{\mathrm{\infty }}<1}$, the sub-family with ${\displaystyle a=\frac{1}{2}(1-{\rho }_{\mathrm{\infty }})}$ shows better amplitude and period accuracy than the ${\displaystyle {\rho }_{\mathrm{\infty }}}$-Bathe method under the same computational costs, and the sub-family with ${\displaystyle a=\frac{1}{2}(1+{\rho }_{\mathrm{\infty }})}$ further improves the period accuracy at the cost of lower amplitude accuracy.

In structural dynamics, the test model for property analysis is the single degree-of-freedom homogeneous equation, as

${\displaystyle \ddot{u}+2\xi \omega \dot{u}+{\omega }^{2}u=0}$

Here ${\displaystyle \xi }$ is the damping ratio and ${\displaystyle \omega }$ is the natural frequency. Applying the composite method to the test model yields the compact scheme

${\displaystyle X_{k+1}=A{X}_k}$

Here ${\displaystyle X_k=\{u_k;{\dot{u}}_k;{\ddot{u}}_k\}}$ and ${\displaystyle A}$ is the amplitude matrix, which governs the properties of a method. Generally, ${\displaystyle A}$ has one zero characteristic root and a pair of conjugate complex roots ${\displaystyle {\lambda }_{1,2}}$, which can be solved from

${\displaystyle {\lambda }^2-A_1\lambda +A_2=0}$

Here ${\displaystyle A_1}$ is the trace of ${\displaystyle A}$ and ${\displaystyle A_2}$ is the sum of second-order principal minors of ${\displaystyle A}$. They are functions of ${\displaystyle \xi }$, ${\displaystyle \omega h}$, and the parameters of the method.

From the compact scheme, the difference equation only with respect to the displacement can be written as

${\displaystyle u_{k+1}-A_1{u}_k+A_2{u}_{k-1}=0}$

The local truncation error ${\displaystyle \sigma }$ is defined as

${\displaystyle \sigma =u(t_{k+1})-A_{1}u(t_k)+A_{2}u(t_{k-1})}$

The method is called ${\displaystyle s}$th-order accurate if ${\displaystyle \sigma =O(h^{s+1})}$.

For physically stable systems (${\displaystyle \xi \ge 0}$, ${\displaystyle \omega \ge 0}$), the method can give stable solutions if the spectral radius ${\displaystyle \rho =\max \{|\lambda |\}\le 1}$. A method is called unconditionally stable if the condition ${\displaystyle \rho \le 1}$ is satisfied for any ${\displaystyle h\ge 0}$, otherwise it is called conditionally stable. The spectral radius at the high-frequency limit, i.e. ${\displaystyle \omega h\to +\mathrm{\infty }}$, is denoted as ${\displaystyle {\rho }_{\mathrm{\infty }}}$, which is usually employed to indicate the degree of numerical dissipation, as used above.

In addition to the accuracy order, the amplitude decay ratio and period elongation ratio are also usually evaluated to measure the amplitude and period accuracy in the low-frequency content. The exact solution of the test model is

${\displaystyle u(t)={\text{e}}^{-\xi \omega t}(c_1\cos {\omega }_{d}t+c_2\sin {\omega }_{d}t),{\omega }_d=\omega \sqrt{1-{\xi }^2}}$

Here ${\displaystyle c_1}$ and ${\displaystyle c_2}$ are constants determined by the initial conditions. The numerical solution can be also expressed as a similar form, as

${\displaystyle u_k={\text{e}}^{-\bar{\xi }\bar{\omega }{t}_k}({\bar{c}}_1\cos {\bar{\omega }}_d{t}_k+{\bar{c}}_2\sin {\bar{\omega }}_d{t}_k),{\bar{\omega }}_d=\bar{\omega }\sqrt{1-\stackrel{2}{\stackrel{‾}{\xi }}}}$

Likewise, ${\displaystyle {\bar{c}}_1}$ and ${\displaystyle {\bar{c}}_2}$ are also determined by the initial conditions and they should be close to ${\displaystyle c_1}$ and ${\displaystyle c_2}$ respectively for a convergent method. The damping ratio ${\displaystyle \bar{\xi }}$ and frequency ${\displaystyle \bar{\omega }}$ can be obtained from the norm ${\displaystyle |\lambda |}$ and phase ${\displaystyle \mathrm{\angle }\lambda }$, as^[10]

${\displaystyle \bar{\xi }=-\frac{\ln |\lambda |}{\sqrt{(\mathrm{\angle }\lambda {)}^2+(\ln |\lambda |{)}^2}},\bar{\omega }=\frac{\sqrt{(\mathrm{\angle }\lambda {)}^2+(\ln |\lambda |{)}^2}}{h}}$

Here ${\displaystyle \bar{\xi }}$ is called the amplitude decay ratio, and ${\displaystyle \frac{\bar{T}-T}{T}}$ (${\displaystyle \bar{T}=\frac{2\pi }{\bar{\omega }},T=\frac{2\pi }{\omega }}$) is called the period elongation ratio.

Consider the Bathe method, ${\displaystyle A_1}$ and ${\displaystyle A_2}$ have the form as

${\displaystyle A_1=\frac{2({\gamma }^4-4{\gamma }^3+6{\gamma }^2-4){\omega }^2{h}^2+8(\gamma -2{)}^2}{({\gamma }^2{\omega }^2{h}^2+4)((\gamma -1{)}^2{\omega }^2{h}^2+(\gamma -2{)}^2)}}$

${\displaystyle A_2=\frac{({\gamma }^4-4{\gamma }^3+8{\gamma }^2-8\gamma +4){\omega }^2{h}^2+4(\gamma -2{)}^2}{({\gamma }^2{\omega }^2{h}^2+4)((\gamma -1{)}^2{\omega }^2{h}^2+(\gamma -2{)}^2)}}$

Here the undamped case, i.e. ${\displaystyle \xi =0}$, is considered for simplicity. One can check that this method can satisfy the conditions of second-order accuracy and unconditional stability. With ${\displaystyle \gamma =\frac{1}{2}}$ and ${\displaystyle 2-\sqrt{2}}$, the spectral radius, amplitude decay ratio, and period elongation ratio are shown here. It can be observed that this method can provide good amplitude and period accuracy in the low-frequency content, while strong numerical dissipation, as ${\displaystyle {\rho }_{\mathrm{\infty }}=0}$, in the high-frequency content.

• Runge-Kutta method
• List of Runge–Kutta methods
• Numerical ordinary differential equations
• Linear multistep method
• Lie group integrator

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