sigmasidosten

Sigmasidosten is a theoretical concept in probability theory used to describe the aggregated influence of a sequence of sigma-algebras on a random variable. In a probability space (Ω, F, P) with a filtration {F_t}t≥0 and an integrable X, one can form conditional increments Δ_t = E[X | F_t] − E[X | F_{t−1}] and attach a weight sequence α_t determined by a function σ. The sigmasidosten of X with respect to the filtration is the limit, when it exists, of the weighted partial sums S_T = ∑_{t=1}^T α_t Δ_t. When the limit exists in L^1 or in probability, Sig(X; {F_t}) is a random variable that encodes the cumulative effect of new information arriving through the filtration. The construction can be viewed as a generalization of how a martingale accumulates conditional information, extending ideas found in decompositions by separating the influence of information flow from other components.

In practice, sigmasidosten serves as a theoretical tool in discussions of information flow, convergence of conditional

Origin and usage notes: the term is not part of standard texts and appears primarily in specialized