English

The Dual Kaczmarz Algorithm

Functional Analysis 2018-11-02 v1

Abstract

The Kaczmarz algorithm is an iterative method for solving a system of linear equations. It can be extended so as to reconstruct a vector xx in a (separable) Hilbert space from the inner-products {x,ϕn}\{\langle x, \phi_{n} \rangle\}. The Kaczmarz algorithms defines a sequence of approximations from the sequence {x,ϕn}\{\langle x, \phi_{n} \rangle\}; these approximations only converge to xx when {ϕn}\{\phi_{n}\} is effective{effective}. We dualize the Kaczmarz algorithm so that xx can be obtained from {x,ϕn}\{\langle x, \phi_{n} \rangle\} by using a second sequence {ψn}\{\psi_{n}\} in the reconstruction. This allows for the recovery of xx even when the sequence {ϕn}\{\phi_{n}\} is not effective; in particular, our dualization yields a reconstruction when the sequence {ϕn}\{\phi_{n}\} is almostalmost effectiveeffective. We also obtain some partial results characterizing when the sequence of approximations from {x,ϕn}\{\langle x, \phi_{n} \rangle\} using {ψn}\{\psi_{n}\} converges to xx, in which case {(ϕn,ψn)}\{(\phi_n, \psi_n)\} is called an effectiveeffective pairpair.

Keywords

Cite

@article{arxiv.1811.00169,
  title  = {The Dual Kaczmarz Algorithm},
  author = {Anna Aboud and Emelie Curl and Steven N. Harding and M. Vaughan and Eric S. Weber},
  journal= {arXiv preprint arXiv:1811.00169},
  year   = {2018}
}

Comments

15 pages

R2 v1 2026-06-23T04:59:57.680Z