I have a set of data which correspond to ages (in steps of 0.1) along the x axis, and probabilities along the y axis. I'm trying to interpolate the data so I can find the maximum and a range of ages which covers 95% of the probability.
I've tried a simple interpolation using the code below, taken from the SciPy help pages, and it produces good results (I change the x and y variables to read my data), except for one feature.
from scipy.interpolate import interp1d
x = np.linspace(72, 100, num=29, endpoint=True)
y = df.iloc[:,0].values
f = interp1d(x, y)
f2 = interp1d(x, y, kind='cubic')
xnew = np.linspace(0, 10, num=41, endpoint=True)
import matplotlib.pyplot as plt
plt.plot(x, y, 'o', xnew, f(xnew), '-', xnew, f2(xnew), '--')
plt.legend(['data', 'linear', 'cubic'], loc='best')
plt.show()
The problem is, the cubic function works best, with the smoothest fit. However, it gives negative values for some parts of the probability curve, which is obviously not acceptable. Is there some way of setting a floor at y=0? I thought maybe switching to a quadratic kind would fix it, but it doesn't seem to. The linear fit does, but it's not smoothed, so is not a very good match.
I'm also not sure how to perform the second part of what I'm trying to do. It's probably very simple, but I don't know how to find the mean when I don't have a frequency table, but a grid of interpolated points which form a function. If I knew the function, I could integrate it, but I'm not sure how to do that in Python.
EDIT to include some data:
This is what my y data looks like:
array([3.41528917e-08, 7.81041275e-05, 9.60711716e-04, 5.75868934e-05,
6.50260297e-05, 2.95556411e-05, 2.37331370e-05, 9.11990619e-05,
1.08003254e-04, 4.16800419e-05, 6.63673113e-05, 2.57934035e-04,
3.42235937e-03, 5.07534495e-03, 1.76603165e-02, 1.69535370e-01,
2.67624254e-01, 4.29420872e-01, 8.25165926e-02, 2.08367339e-02,
2.01227453e-03, 1.15405995e-04, 5.40163098e-07, 1.66905537e-10,
8.31862858e-18, 4.14093219e-23, 8.32103362e-29, 5.65637769e-34,
7.93547444e-40])
