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I have series of measurements which are time stamped and irregularly spaced. Values in these series always represent changes of the measurement -- i.e. without a change no new value. A simple example of such a series would be:
23:00:00.100 10
23:00:01.200 8
23:00:01.600 0
23:00:06.300 4
What I want to reach is an equally spaced series of time-weighted averages. For the given example I might aim at a frequency based on seconds and hence a result like the following:
23:00:01 NaN ( the first 100ms are missing )
23:00:02 5.2 ( 10*0.2 + 8*0.4 + 0*0.4 )
23:00:03 0
23:00:04 0
23:00:05 0
23:00:06 2.8 ( 0*0.3 + 4*0.7 )
I am searching for a Python library solving that problem. For me, this seems to be a standard problem, but I couldn't find such a functionality so far in standard libraries like pandas.
The algorithm needs to take two things into account:
- time-weighted averaging
- considering values ahead of the current interval ( and possibly even ahead of the lead ) when forming the average
Using pandas
data.resample('S', fill_method='pad') # forming a series of seconds
does parts of the work. Providing a user-defined function for aggregation will allow to form time-weighted averages, but because the beginning of the interval is ignored, this average will be incorrect too. Even worse: the holes in the series are filled with the average values, leading in the example from above to the values of seconds 3, 4 and 5 to be non zero.
data = data.resample('L', fill_method='pad') # forming a series of milliseconds
data.resample('S')
does the trick with a certain accurateness, but is -- depending on the accurateness -- very expensive. In my case, too expensive.
Edit: Solution
import pandas as pa
import numpy as np
from datetime import datetime
from datetime import timedelta
time_stamps=[datetime(2013,04,11,23,00,00,100000),
datetime(2013,04,11,23,00,1,200000),
datetime(2013,04,11,23,00,1,600000),
datetime(2013,04,11,23,00,6,300000)]
values = [10, 8, 0, 4]
raw = pa.TimeSeries(index=time_stamps, data=values)
def round_down_to_second(dt):
return datetime(year=dt.year, month=dt.month, day=dt.day,
hour=dt.hour, minute=dt.minute, second=dt.second)
def round_up_to_second(dt):
return round_down_to_second(dt) + timedelta(seconds=1)
def time_weighted_average(data):
end = pa.DatetimeIndex([round_up_to_second(data.index[-1])])
return np.average(data, weights=np.diff(data.index.append(end).asi8))
start = round_down_to_second(time_stamps[0])
end = round_down_to_second(time_stamps[-1])
range = pa.date_range(start, end, freq='S')
data = raw.reindex(raw.index + range)
data = data.ffill()
data = data.resample('S', how=time_weighted_average)
You can do this with traces.
Which results in :
This is not an answer, but I need some graph to determine what is the time-weighted averaging mean. Here is a graph that plot with your data:
Do you want the average value of every vertical span? The first span is 0-1, since it include unknown data, the result is NaN. The second block is 1-2, the value is calculated by: ( 10*0.2 + 8*0.4 + 0*0.4) which is the same as yours. But I don't know how the value of 5-6 cames:
Can you explain how do you calculate this value?
Here's a go at a solution, it may need some tweaking to meet your requirements.
Add the seconds to your index and fill forwards:
Take the time difference (using
shift) til the next value, and multiply (value * seconds):Then do the resample to seconds (sum the value*seconds):
Note: The end point need some coercing (sum is being clever and ignoring the NaN)...