Glaser, Sven2015-10-072015-10-072015-09http://hdl.handle.net/2003/3426110.17877/DE290R-16338In this article we deduce a distributional theorem for the realized power variation of linear fractional stable motions. This theorem is proven by choosing the technique of subordination to reduce the proof to a Gaussian limit theorem based on Malliavin-calculus.enfractional Lévy processeslimit theoremsinfinitely divisible distributionspower variation610preprint