A novel fractional Tikhonov regularization coupled with an improved super-memory gradient method and application to dynamic force identification problems
From MaRDI portal
Publication:1720969
DOI10.1155/2018/4790950zbMath1427.65091OpenAlexW2810892355MaRDI QIDQ1720969
Nengjian Wang, Chunping Ren, Chunsheng Liu
Publication date: 8 February 2019
Published in: Mathematical Problems in Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1155/2018/4790950
Iterative numerical methods for linear systems (65F10) Methods of reduced gradient type (90C52) Numerical solution to inverse problems in abstract spaces (65J22)
Cites Work
- Unnamed Item
- Unnamed Item
- On the choice of the Tikhonov regularization parameter and the discretization level: a discrepancy-based strategy
- A new method for detecting the time-varying nonlinear damping in nonlinear oscillation systems: nonparametric identification
- Tikhonov-Phillips regularization with operator dependent seminorms
- Fractional Tikhonov regularization for linear discrete ill-posed problems
- Global convergence of a memory gradient method for unconstrained optimization
- On fractional Tikhonov regularization
- An algorithm for the solution of ill-posed linear systems arising from the discretization of Fredholm integral equation of the first kind
- On Tikhonov regularization, bias and variance in nonlinear system identification
- An optimally generalized steepest-descent algorithm for solving ill-posed linear systems
- Fractional-order regularization and wavelet approximation to the inverse estimation problem for random fields
- Solving optimal control problem of monodomain model using hybrid conjugate gradient methods
- A Tikhonov-type regularization method for identifying the unknown source in the modified Helmholtz equation
- Identification of random dynamic force using an improved maximum entropy regularization combined with a novel conjugate gradient
- On generalized iterated Tikhonov regularization with operator-dependent seminorms
- A generalized super-memory gradient projection method of strongly sub-feasible directions with strong convergence for nonlinear inequality constrained optimization
- Tikhonov Regularization and Randomized GSVD
- An Adaptive Strategy for the Restoration of Textured Images using Fractional Order Regularization
- Regularization methods for ill-posed problems in multiple Hilbert scales
- A simple regularization method for the ill-posed evolution equation
- Novel Algorithms Based on the Conjugate Gradient Method for Inverting Ill-Conditioned Matrices, and a New Regularization Method to Solve Ill-Posed Linear Systems
- The discrepancy principle for a class of regularization methods
- Minimum Principles for Ill-Posed Problems
- Solution of the Inverse Scattering Problem for the Three-Dimensional Schrödinger Equation Using a Fredholm Integral Equation
- On the nature of ill-posedness of an inverse problem arising in option pricing
- A Family of Supermemory Gradient Projection Methods for Constrained Optimization
- Solving ill-conditioned linear algebraic systems by the dynamical systems method
- ABOUT REGULARIZATION OF SEVERELY ILL-POSED PROBLEMS BY STANDARD TIKHONOV'S METHOD WITH THE BALANCING PRINCIPLE
- Iterated fractional Tikhonov regularization
- On a continuation approach in Tikhonov regularization and its application in piecewise-constant parameter identification
- The Limited Memory Conjugate Gradient Method
- Tikhonov regularization applied to the inverse problem of option pricing: convergence analysis and rates
- On the Solution of the Tikhonov Regularization of the Total Least Squares Problem
- Convergence Conditions for Ascent Methods
This page was built for publication: A novel fractional Tikhonov regularization coupled with an improved super-memory gradient method and application to dynamic force identification problems
