On interpolation problem for multidimensional harmonizable stable sequences with noise observations

Abstract

We consider the problem of optimal linear estimation of the functional AN =Σj = 0N (a(j)) (j) that depends on the unknown values (j),j=0,1,…,N, of a vector-valued harmonizable symmetric α-stable random sequence (j)= \ k (j) \k = 1 T, from observations of the sequence (j)+η(j) at points j∈ Z\0,1,…,N\. We consider the problem for mutually independent vector-valued harmonizable symmetric α-stable random sequences (j)= \ k (j) \k = 1 T and η(j)= \ k (j) \k = 1 T which have absolutely continuous spectral measures and the spectral densities f(θ) and g(θ) satisfying the minimality condition.