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物理的模型如下:
在这个系统里有两个物体,它们的质量分别是m1和m2,被两个弹簧连接在一起,伸缩系统为k1和k2,左端固定。假定没有外力时,两个弹簧的长度为L1和L2。
由于两物体有重力,那么在平面上形成摩擦力,那么摩擦系数分别为b1和b2。所以可以把微分方程写成这样:
这是一个二阶的微分方程,为了使用python来求解,需要把它转换为一阶微分方程。所以引入下面两个变量:
这两个相当于运动的速度。通过运算可以改为这样:
这时可以线性方程改为向量数组的方式,就可以使用python定义了
代码如下:
# Use ODEINT to solve the differential equations defined by the
vector field
from scipy.integrate import odeint
def vectorfield(w, t, p):
# Parameter values
# Masses:
m1 = 1.0
m2 = 1.5
# Spring constants
k1 = 8.0
k2 = 40.0
# Natural lengths
L1 = 0.5
L2 = 1.0
# Friction coefficients
b1 = 0.8
b2 = 0.5
# Initial conditions
# x1 and x2 are the initial displacements; y1 and y2 are the
initial velocities
x1 = 0.5
y1 = 0.0
x2 = 2.25
y2 = 0.0
# ODE solver parameters
abserr = 1.0e-8
relerr = 1.0e-6
stoptime = 10.0
numpoints = 250
# Create the time samples for the output of the ODE
solver.
# I use a large number of points, only because I want to
make
# a plot of the solution that looks nice.
t = [stoptime * float(i) / (numpoints - 1) for i in
range(numpoints)]
# Pack up the parameters and initial
conditions:
p = [m1, m2, k1, k2, L1, L2, b1, b2]
w0 = [x1, y1, x2, y2]
# Call the ODE solver.
wsol = odeint(vectorfield, w0, t,
args=(p,),
with open('two_springs.dat', 'w') as f:
在这里把结果输出到文件two_springs.dat,接着写一个程序来把数据显示成图片,就可以发表论文了,代码如下:
# Plot the solution that was generated
from numpy import loadtxt
from pylab import figure, plot, xlabel, grid, hold, legend, title,
savefig
from matplotlib.font_manager import
FontProperties
t, x1, xy, x2, y2 = loadtxt('two_springs.dat',
unpack=True)
figure(1, figsize=(6, 4.5))
xlabel('t')
grid(True)
lw = 1
plot(t, x1, 'b', linewidth=lw)
plot(t, x2, 'g', linewidth=lw)
legend((r'$x_1$', r'$x_2$'),
prop=FontProperties(size=16))
title('Mass Displacements for the
Coupled Spring-Mass
System')
savefig('two_springs.png', dpi=100)
最后来查看一下输出的png图片如下:
总结
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