# Forecast a trendline of a periodic time series

I have some data in an Excel spreadsheet, which represents a bunch of date-times where samples have been taken. The dates are increasing linearly but there are some periodic gaps (leading to discontinuities in the date-data).

See the attached image as this shows the periodic nature of the data. Notice the rate of change shows clear spikes where discontinuities occur.

The data is a single column in an Excel spreadsheet of DateTimes. I would like to forecast this repeating series into the future so as to make estimates of future discontinuities.

Ultimately I want to code this in C# but if anyone has an idea of an algorithm that can perform such a forecast, either in Excel, or C#/C it would be great!

I thought about Auto-Correlation however can't figure out how to do that in Excel to test it.

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a) you need to compute the rate of change for independent variable, i.e. time, not the measured values [even if they are ploted on x-axis, it is still the dependent variable, i.e. f(x)] + b) are there always 3 levels of rate of change (e.g. every day increase by 0, every week increase by 0.7, every month increase by 2.7) or what is the most-generalizable pattern here? –  Aprillion Jul 1 '12 at 14:04
The rate of change graph is the difference of the time-value from one sample to the next. The most generalizable pattern is as follows. The data is time-stamps from futures prices. The time-stamps have a small discontinuity overnight (4 nights a week) as the market is closed. The time-stamps have a larger discontinuity over weekends or trading holidays. For some instruments the time-stamps are at regular intervals however for others they are more irregular which compounds the issue. Your thoughts welcome :) –  Dr. ABT Jul 1 '12 at 14:14
if the data are exactly linear per-calendar-day basis, then the chart is not a fair representation of the data - why do you use it??? –  Aprillion Jul 1 '12 at 14:17
Sorry, not sure what you mean by this –  Dr. ABT Jul 1 '12 at 14:19
if you would fill the gaps, would the data series be a straight line without jumps?? –  Aprillion Jul 1 '12 at 14:24

if the data can be represented by a linear function, i.e.:

``````f(date) = start_value + daily_increase * (date - fist_date)
``````

then you can do a simple linear regression - in my excel example use this LINEST function (entered in 2 cells at the same time as an array formula with Ctrl+Shift+Enter):

``````=LINEST(C2:C31;A2:A31)
``````

the results (6, -220436) are linear and constant factors of a linear regression formula:
=> `f(date) = 6 * date - 220436`

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Ok - I see what you mean by representation of the data. The question should be clearer. The X,Y values in the graph I presented are X=sample number (linearly increasing) and Y=DateTime. What I am trying to estimate is the DateTime for a sample number in the future. E.g. I have samples 1-120 in my test data. What is the estimated date for unknown sample 140? –  Dr. ABT Jul 1 '12 at 15:23
Edit: Nevermind, I got it - thanks for the input, especially on Excel Linest function and how to use it :) –  Dr. ABT Jul 1 '12 at 15:40
just to be crystal clear about my choice of X and Y values - the time won't turn back if the prices start falling –  Aprillion Jul 1 '12 at 22:13

in case someone needs a cyclic data generator, use this algorithm (excel formula):

``````=baseline_value
+ INT([@Step]/repeat_c1) * increase_c1
+ INT([@Step]/repeat_c2) * increase_c2
+ INT([@Step]/repeat_c3) * increase_c3
...
``````

to compute the increases, the cycles need to be ordered from the shortest to the longest - see an illustration for this cycle specification:

1. every step, increase the previous value by 2 hours
2. for every 2nd step, increase the previous value by 22 hours instead of 2 (i.e. by additional 20)
3. for every 8th step, increase by 70 hours (additional 48)

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