shiftsmoments

Shiftsmoments is a term used in probability theory to describe the set of moments of a real-valued random variable after an additive shift. It focuses on how the distribution’s moments change when the variable is translated by a constant.

For a random variable X with ordinary moments μ_k = E[X^k] for integers k ≥ 0, the k-th

The shifted moments can be computed from the original moments using the binomial theorem: ν_k(a) = sum_{j=0}^k

A simple example: if X has first two moments μ_1 and μ_2, then ν_1(a) = μ_1 + a and

Applications of shiftsmoments include parameter estimation under affine transformations, data alignment and preprocessing in statistics, and