2 research outputs found
An Efficient Algorithm for the Calculation of Generalized Adding and Arithmetic Transforms From Disjoint Cubes of Boolean Functions
A new algorithm is given that converts a reduced representation of Boolean functions in
the form of disjoint cubes to Generalized Adding and Arithmetic spectra. Since the
known algorithms that generate Adding and Arithmetic spectra always start from the
truth table of Boolean functions the method presented computes faster with a smaller
computer memory. The method is extremely efficient for such Boolean functions that
are described by only few disjoint cubes and it allows the calculation of only selected
spectral coefficients, or all the coefficients can be calculated in parallel