Original version
Stochastics and Partial Differential Equations: Analysis and Computations. 2020, 8 (1), 186-261, DOI: https://doi.org/10.1007/s40072-019-00145-7
Abstract
Finite volume methods are proposed for computing approximate pathwise entropy/kinetic solutions to conservation laws with flux functions driven by low-regularity paths. For a convex flux, it is demonstrated that driving path oscillations may lead to “cancellations” in the solution. Making use of this property, we show that for α-Hölder continuous paths the convergence rate of the numerical methods can improve from O(COST−γ), for some γ∈[α/(12−8α),α/(10−6α)], with α∈(0,1), to O(COST−min(1/4,α/2)). Numerical examples support the theoretical results.