In mathematics, the Weyl integral (named after Hermann Weyl) is an operator defined, as an example of fractional calculus, on functions f on the unit circle having integral 0 and a Fourier series.
In other words there is a Fourier series for f of the form with a0 = 0.
Here s can take any real value, and for integer values k of s the series expansion is the expected k-th derivative, if k > 0, or (−k)th indefinite integral normalized by integration from θ = 0.
The condition a0 = 0 here plays the obvious role of excluding the need to consider division by zero.
The definition is due to Hermann Weyl (1917).