Kaczmarz method is one popular iterative method for solving inverse problems, especially in computed tomography. Recently, it was established that a randomized version of the method enjoys an exponential convergence for well-posed problems, and the convergence rate is determined by a variant of the condition number. In this work, we analyze the preasymptotic convergence behavior of the randomized Kaczmarz method, and show that the low-frequency error (with respect to the right singular vectors) decays faster during first iterations than the high-frequency error. Under the assumption that the inverse solution is smooth (e.g., sourcewise representation), the result explains the fast empirical convergence behavior, thereby shedding new insight...
In this short note we respond to some concerns raised by Y. Censor, G. Herman, and M. Jiang about th...
We propose a deterministic Kaczmarz algorithm for solving linear systems $A\x=\b$. Different from pr...
We obtain an improved finite-sample guarantee on the linear convergence of stochastic gradient desce...
The Kaczmarz’s alternating projection method has been widely used for solving a consistent (mostly o...
Solving systems of linear equations, iterative methods are widely used for computing e ciency, thoug...
The Kaczmarz method for solving linear systems of equations is an iterative algorithm that has found...
The Kaczmarz method for solving linear systems of equations is an iterative algorithm that ...
The Kaczmarz method is an algorithm for finding the solution to an overdetermined consistent system ...
The Kaczmarz method is an iterative algorithm for solving systems of linear equations Ax=b. Theoreti...
The Kaczmarz method, or the algebraic reconstruction technique (ART), is a popular method for solvin...
The Kaczmarz method is an iterative method for solving overcomplete linear systems of equations Ax =...
The Kaczmarz method is an iterative algorithm for solving systems of linear equations Ax=b....
In this paper, we analyze the greedy randomized Kaczmarz (GRK) method proposed in Bai and Wu (SIAM J...
It is common for us to meet with large-scale corrupted and noisy linear inverse problems in practica...
Large-scale linear systems, $Ax=b$, frequently arise in practice and demand effective iterative solv...
In this short note we respond to some concerns raised by Y. Censor, G. Herman, and M. Jiang about th...
We propose a deterministic Kaczmarz algorithm for solving linear systems $A\x=\b$. Different from pr...
We obtain an improved finite-sample guarantee on the linear convergence of stochastic gradient desce...
The Kaczmarz’s alternating projection method has been widely used for solving a consistent (mostly o...
Solving systems of linear equations, iterative methods are widely used for computing e ciency, thoug...
The Kaczmarz method for solving linear systems of equations is an iterative algorithm that has found...
The Kaczmarz method for solving linear systems of equations is an iterative algorithm that ...
The Kaczmarz method is an algorithm for finding the solution to an overdetermined consistent system ...
The Kaczmarz method is an iterative algorithm for solving systems of linear equations Ax=b. Theoreti...
The Kaczmarz method, or the algebraic reconstruction technique (ART), is a popular method for solvin...
The Kaczmarz method is an iterative method for solving overcomplete linear systems of equations Ax =...
The Kaczmarz method is an iterative algorithm for solving systems of linear equations Ax=b....
In this paper, we analyze the greedy randomized Kaczmarz (GRK) method proposed in Bai and Wu (SIAM J...
It is common for us to meet with large-scale corrupted and noisy linear inverse problems in practica...
Large-scale linear systems, $Ax=b$, frequently arise in practice and demand effective iterative solv...
In this short note we respond to some concerns raised by Y. Censor, G. Herman, and M. Jiang about th...
We propose a deterministic Kaczmarz algorithm for solving linear systems $A\x=\b$. Different from pr...
We obtain an improved finite-sample guarantee on the linear convergence of stochastic gradient desce...