@unpublished{Cont:2023:10.3150/22-BEJ1466, author = {Cont, R and Das, P}, doi = {10.3150/22-BEJ1466}, title = {Quadratic variation and quadratic roughness}, url = {http://dx.doi.org/10.3150/22-BEJ1466}, year = {2023} }
TY - UNPB AB - We study the concept of quadratic variation of a continuous path along a sequence of partitions and its dependence with respect to the choice of the partition sequence. We introduce the concept of quadratic roughness of a path along a partition sequence and show that for Hölder-continuous paths satisfying this roughness condition, the quadratic variation along balanced partitions is invariant with respect to the choice of the partition sequence. Typical paths of Brownian motion are shown to satisfy this quadratic roughness property almost-surely along any partition with a required step size condition. Using these results we derive a formulation of the pathwise Föllmer-Itô calculus which is invariant with respect to the partition sequence. We also derive an invarience of local time under quadratic roughness. AU - Cont,R AU - Das,P DO - 10.3150/22-BEJ1466 PY - 2023/// TI - Quadratic variation and quadratic roughness UR - http://dx.doi.org/10.3150/22-BEJ1466 ER -