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:-

```
library(dplyr)
library(hts)
# 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))
```

`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`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