I'm trying out top-down method for forecasting demand of products in a retail store.

fourier_forecasts = forecast(sales_weekly_hts, h=12,method="tdfp", FUN=function(x) auto.arima(x, xreg=fourier(x, K=12), seasonal=FALSE))

sales_weekly_hts is an hts object containing 2.5 years of weekly sales data.

It gives me the error :-

"Error in forecast.Arima(models, h = h) : No regressors provided"

I'm guessing that error is because its not able to obtain the fourier terms for out of sample forecast but I don't get how to resolve this. Is it not able to know how many periods to forecast into the future?

Minimum reproducible example:-


# creating a time series matrix containing 4 series and 133 weeks random data 
min_rep_eg = matrix(data = rnorm(n = 133*4 ,mean = 2), nrow = 133, ncol = 4) %>% ts(frequency = 365.25/7)

# giving names to the 5 time series. These names are used to create the hierarchy.
colnames(min_rep_eg) = c("10011001","10011003","10031021","10031031")

# creating the hts.
min_rep_eg_hts = hts(min_rep_eg, characters = c(4, 4))

min_rep_eg_hts_fc = forecast(min_rep_eg_hts, h=2,method="tdfp", FUN=function(x) auto.arima(x, xreg=fourier(x, K=12), seasonal=FALSE))
  • Hi, please provide data, e.g. adding the output of dput(<myData>) or dput(head(<myData>)) to your question. You'll have a much better chance of getting a great answer! – jay.sf Feb 11 at 13:26
  • Maybe try to consider fewer Fourier terms (i.e. decrease K)? Lower K means less complexity of your seasonal pattern. By decreasing K, you decrease the frequency of sine and cosine pairs that your model uses to approximate the seasonal pattern. – Luminita Feb 11 at 14:11
  • Also, it may be worthwhile to check whether it makes lots of sense to forecast your sales data weekly - maybe monthly aggregates lead to less noise? – Luminita Feb 11 at 14:26
  • @jay.sf dput gives me a huge amount of output would be too much to paste here. I'll try to write more about the data. – Goutham Feb 12 at 5:44
  • 1
    added a minimum reproducible example – Goutham Feb 12 at 6:24

Your Answer

By clicking "Post Your Answer", you acknowledge that you have read our updated terms of service, privacy policy and cookie policy, and that your continued use of the website is subject to these policies.

Browse other questions tagged or ask your own question.