In geometry processing, numerical optimization methods often involve solving sparse linear systems of equations. These linear systems have a structure that strongly resembles to adjacency graphs of the underlying mesh. We observe how classic linear solvers behave on this specific type of problems. For the sake of simplicity, we minimise either the squared gradient or the squared Laplacian, evaluated by finite differences on a regular 1D or 2D grid. We observed the evolution of the solution for both energies, in 1D and 2D, and with different solvers: Jacobi, Gauss-Seidel, SSOR (Symmetric successive over-relaxation) and CG (conjugate gradient [She94]). Plotting results at different iterations allows to have an intuition of the behavior of the...
A number of iterative techniques have recently been developed which are extremely efficient at solvi...
In this paper, iterative solver techniques belonging to the family of conjugate-gradient methods for...
Linear systems are applied in many applications such as calculating variables, rates,budgets, making...
In geometry processing, numerical optimization methods often involve solving sparse linear systems o...
In this chapter we will present an overview of a number of related iterative methods for the solutio...
This presentation is intended to review the state-of-the-art of iterative methods for solving large ...
Solving large-scale systems of linear equations [] { } {}bxA = is one of the most expensive and cr...
This thesis is concerned with the solution of large systems of linear algebraic equations in which t...
Abstract. Numerical linear algebra and combinatorial optimization are vast subjects; as is their int...
In solving a linear system with iterative methods, one is usually confronted with the dilemma of hav...
In solving a linear system with iterative methods, one is usually confronted with the dilemma of hav...
AbstractAn algorithm is presented for the general solution of a set of linear equations Ax=b. The me...
The availability of very high speed automatic digital13; computers with lsrge and fast Bemories has ...
This graduate-level text examines the practical use of iterative methods in solving large, sparse sy...
In this thesis we consider the problems that arise in computational linear algebra when ...
A number of iterative techniques have recently been developed which are extremely efficient at solvi...
In this paper, iterative solver techniques belonging to the family of conjugate-gradient methods for...
Linear systems are applied in many applications such as calculating variables, rates,budgets, making...
In geometry processing, numerical optimization methods often involve solving sparse linear systems o...
In this chapter we will present an overview of a number of related iterative methods for the solutio...
This presentation is intended to review the state-of-the-art of iterative methods for solving large ...
Solving large-scale systems of linear equations [] { } {}bxA = is one of the most expensive and cr...
This thesis is concerned with the solution of large systems of linear algebraic equations in which t...
Abstract. Numerical linear algebra and combinatorial optimization are vast subjects; as is their int...
In solving a linear system with iterative methods, one is usually confronted with the dilemma of hav...
In solving a linear system with iterative methods, one is usually confronted with the dilemma of hav...
AbstractAn algorithm is presented for the general solution of a set of linear equations Ax=b. The me...
The availability of very high speed automatic digital13; computers with lsrge and fast Bemories has ...
This graduate-level text examines the practical use of iterative methods in solving large, sparse sy...
In this thesis we consider the problems that arise in computational linear algebra when ...
A number of iterative techniques have recently been developed which are extremely efficient at solvi...
In this paper, iterative solver techniques belonging to the family of conjugate-gradient methods for...
Linear systems are applied in many applications such as calculating variables, rates,budgets, making...