10/02 - Fourier Series
Jump to navigation
Jump to search
Fourier Series (as compared to vectors)
If a function is periodic, , and it meets the Dirichlet conditions, then we can write it as
- Dirichlet conditions
- x(t) must have a finite number of extrema in any given interval
- x(t) must have a finite number of discontinuities in any given interval
- x(t) must be absolutely integrable over a period
- x(t) must be bounded
Like vectors we can change to a new basis function by taking the inner product of with the mth basis function. Don't forget that the inner product of two vectors requires a complex conjugate.
- The integral range reflects the period T as defined at the top of the page. The current range carries over to the Fourier series better than going from 0 to T.
- When switching the order of integrals and summations, you can "cavalierly" switch the order as long as there aren't summations/integrals to infinity.