# Data structure/algorithm to efficiently save weighted moving average

I'd like to sum up moving averages for a number of different categories when storing log records. Imagine a service that saves web server logs one entry at a time. Let's further imagine, we don't have access to the logged records. So we see them once but don't have access to them later on.

For different pages, I'd like to know

• the total number of hits (easy)
• a "recent" average (like one month or so)
• a "long term" average (over a year)

Is there any clever algorithm/data model that allows to save such moving averages without having to recalculate them by summing up huge quantities of data?

I don't need an exact average (exactly 30 days or so) but just trend indicators. So some fuzziness is not a problem at all. It should just make sure that newer entries are weighted higher than older ones.

One solution probably would be to auto-create statistics records for each month. However, I don't even need past month statistics, so this seems like overkill. And it wouldn't give me a moving average but rather swap to new values from month to month.

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An easy solution would be to keep an exponentially decaying total.

It can be calculated using the following formula:

``````newX = oldX * (p ^ (newT - oldT)) + delta
``````

where `oldX` is the old value of your total (at time `oldT`), `newX` is the new value of your total (at time `newT`); `delta` is the contribution of new events to the total (for example the number of hits today); `p` is less or equal to 1 and is the decay factor. If we take `p = 1`, then we have the total number of hits. By decreasing `p`, we effectively decrease the interval our total describes.

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Thanks. Would it make sense to use UNIX timestamps for `newT` and `oldT`, set `delta` to 1 (in order to evaluate the formula freshly for each new logged record)? –  Ortwin Gentz Nov 21 '11 at 13:55
Ortwin, sure, that is a good way to apply the formula. –  Rotsor Nov 21 '11 at 17:25
Seems to work great. Looks like `p=0.9` gives me a 10 time units average and `p=0.99` a 100 time units average. –  Ortwin Gentz Nov 22 '11 at 10:48
Great! By the way, don't forget to apply the formula with `delta = 0` when displaying the totals to the user. Otherwise, the user will be able to see stale values. –  Rotsor Nov 22 '11 at 11:39
Thanks, implemented the formula in the getter method. To log a new record I just have to add 1 to the value from the getter method. –  Ortwin Gentz Nov 22 '11 at 15:29

If all you really want is a smoothed value with a given time constant then the easiest thing is to use a single pole recursive IIR filter (aka AR or auto-regressive filter in time series analysis). This takes the form:

``````Xnew = k * X_old + (1 - k) * x
``````

where `X_old` is the previous smoothed value, `X_new` is the new smoothed value, x is the current data point and k is a factor which determines the time constant (usually a small value, < 0.1). You may need to determine the two k values (one value for "recent" and a smaller value for "long term") empirically, based on your sample rate, which ideally should be reasonably constant, e.g. one update per day.

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The constant sample rate is not given in my case since I want to avoid saving intermediary values during a timeframe (e.g. sum of records per day). So I'd like to evaluate the new values right when receiving a new log record. –  Ortwin Gentz Nov 21 '11 at 13:59