Your search keyword '"Montardini, Monica"' showing total 8 results

1. A low-rank isogeometric solver based on Tucker tensors

Author

Montardini, Monica, Sangalli, Giancarlo, Tani, Mattia, Montardini, Monica, Sangalli, Giancarlo, and Tani, Mattia

Abstract

We propose an isogeometric solver for Poisson problems that combines i)low-rank tensor techniques to approximate the unknown solution and the system matrix, as a sum of a few terms having Kronecker product structure, ii) a Truncated Preconditioned Conjugate Gradient solver to keep the rank of the iterates low, and iii) a novel low-rank preconditioner, based on the Fast Diagonalization method where the eigenvector multiplication is approximated by the Fast Fourier Transform. Although the proposed strategy is written in arbitrary dimension, we focus on the three-dimensional case and adopt the Tucker format for low-rank tensor representation, which is well suited in low dimension. We show by numerical tests that this choice guarantees significant memory saving compared to the full tensor representation. We also extend and test the proposed strategy to linear elasticity problems., Comment: 27 pages, 8 figures

Published

2023

2. Parallelization in time by diagonalization

Author

Bressan, Andrea, Kushova, Alen, Loli, Gabriele, Montardini, Monica, Sangalli, Giancarlo, Tani, Mattia, Bressan, Andrea, Kushova, Alen, Loli, Gabriele, Montardini, Monica, Sangalli, Giancarlo, and Tani, Mattia

Abstract

This is a review of preconditioning techniques based on fast-diagonalization methods for space-time isogeometric discretization of the heat equation. Three formulation are considered: the Galerkin approach, a discrete least-square and a continuous least square. For each formulation the heat differential operator is written as a sum of terms that are kronecker products of uni-variate operators. These are used to speed-up the application of the operator in iterative solvers and to construct a suitable preconditioner. Contrary to the fast-diagonalization technique for the Laplace equation where all uni-variate operators acting on the same direction can be simultaneously diagonalized in the case of the heat equation this is not possible. Luckily this can be done up to an additional term that has low rank allowing for the utilization of arrow-head like factorization or inversion by Sherman-Morrison formula. The proposed preconditioners work extremely well on the parametric domain and, when the domain is parametrized or when the equation coefficients are not constant, they can be adapted and retain good performance characteristics., Comment: arXiv admin note: substantial text overlap with arXiv:1909.07309, arXiv:2311.18461

Published

2023

3. A low-rank solver for conforming multipatch Isogeometric Analysis

Author

Montardini, Monica, Sangalli, Giancarlo, Tani, Mattia, Montardini, Monica, Sangalli, Giancarlo, and Tani, Mattia

Abstract

In this paper we present a low-rank method for conforming multipatch discretizations of compressible linear elasticity problems using Isogeometric Analysis. The proposed technique is a non-trivial extension of [M. Montardini, G. Sangalli, and M. Tani. A low-rank isogeometric solver based on Tucker tensors. Comput. Methods Appl. Mech. Engrg., page 116472, 2023.] to multipatch geometries. We tackle the model problem using an overlapping Schwarz method, where the subdomains can be defined as unions of neighbouring patches. Then on each subdomain we approximate the blocks of the linear system matrix and of the right-hand side vector using Tucker matrices and Tucker vectors, respectively. We use the Truncated Preconditioned Conjugate Gradient as a linear solver, coupled with a suited preconditioner. The numerical experiments show the advantages of this approach in terms of memory storage. Moreover, the number of iterations is robust with respect to the relevant parameters., Comment: 17 pages, 8 figures

Published

2023

4. A IETI-DP method for discontinuous Galerkin discretizations in Isogeometric Analysis with inexact local solvers

Author

Montardini, Monica, Sangalli, Giancarlo, Schneckenleitner, Rainer, Takacs, Stefan, Tani, Mattia, Montardini, Monica, Sangalli, Giancarlo, Schneckenleitner, Rainer, Takacs, Stefan, and Tani, Mattia

Abstract

We construct solvers for an isogeometric multi-patch discretization, where the patches are coupled via a discontinuous Galerkin approach, which allows the consideration of discretizations that do not match on the interfaces. We solve the resulting linear system using a Dual-Primal IsogEometric Tearing and Interconnecting (IETI-DP) method. We are interested in solving the arising patch-local problems using iterative solvers since this allows the reduction of the memory footprint. We solve the patch-local problems approximately using the Fast Diagonalization method, which is known to be robust in the grid size and the spline degree. To obtain the tensor structure needed for the application of the Fast Diagonalization method, we introduce an orthogonal splitting of the local function spaces. We present a convergence theory that confirms that the condition number of the preconditioned system only grows poly-logarithmically with the grid size. The numerical experiments confirm this finding. Moreover, they show that the convergence of the overall solver only mildly depends on the spline degree. We observe a mild reduction of the computational times and a significant reduction of the memory requirements in comparison to standard IETI-DP solvers using sparse direct solvers for the local subproblems. Furthermore, the experiments indicate good scaling behavior on distributed memory machines.

Published

2022

5. The virtual element method on polygonal pixel-based tessellations

Author

Bertoluzza, Silvia, Montardini, Monica, Pennacchio, Micol, Prada, Daniele, Bertoluzza, Silvia, Montardini, Monica, Pennacchio, Micol, and Prada, Daniele

Abstract

We analyze and validate the virtual element method combined with a boundary correction similar to the one in [1,2], to solve problems on two dimensional domains with curved boundaries approximated by polygonal domains obtained as the union of squared elements out of a uniform structured mesh, such as the one that naturally arises when the domain is issued from an image. We show, both theoretically and numerically, that resorting to the use of polygonal elements allows to satisfy, for any order, the assumptions required for the stability of the method, thus allowing to fully exploit the potential of higher order methods, the efficiency of which is ensured by a novel static condensation strategy acting on the edges of the decomposition.

Published

2022

6. A domain decomposition method for Isogeometric multi-patch problems with inexact local solvers

Author

Bosy, Michal, Montardini, Monica, Sangalli, Giancarlo, Tani, Mattia, Bosy, Michal, Montardini, Monica, Sangalli, Giancarlo, and Tani, Mattia

Abstract

In Isogeometric Analysis, the computational domain is often described as multi-patch, where each patch is given by a tensor product spline/NURBS parametrization. In this work we propose a FETI-like solver where local inexact solvers exploit the tensor product structure at the patch level. To this purpose, we extend to the isogeometric framework the so-called All-Floating variant of FETI, that allows us to use the Fast Diagonalization method at the patch level. We construct then a preconditioner for the whole system and prove its robustness with respect to the local mesh-size $h$ and patch-size $H$ (i.e., we have scalability). Our numerical tests confirm the theory and also show a favourable dependence of the computational cost of the method from the spline degree $p$., Comment: 19 pages, 1 figure

Published

2020

7. An efficient solver for space-time isogeometric Galerkin methods for parabolic problems

Author

Loli, Gabriele, Montardini, Monica, Sangalli, Giancarlo, Tani, Mattia, Loli, Gabriele, Montardini, Monica, Sangalli, Giancarlo, and Tani, Mattia

Abstract

In this work we focus on the preconditioning of a Galerkin space-time isogeometric discretization of the heat equation. Exploiting the tensor product structure of the basis functions in the parametric domain, we propose a preconditioner that is the sum of Kronecker products of matrices and that can be efficiently applied thanks to an extension of the classical Fast Diagonalization method. The preconditioner is robust w.r.t. the polynomial degree of the spline space and the time required for the application is almost proportional to the number of degrees-of-freedom, for a serial execution. By incorporating some information on the geometry parametrization and on the equation coefficients, we keep high efficiency with non-trivial domains and variable thermal conductivity and heat capacity coefficients., Comment: 22 pages, 6 figures

Published

2019

8. Space-time least-squares isogeometric method and efficient solver for parabolic problems

Author

Montardini, Monica, Negri, Matteo, Sangalli, Giancarlo, Tani, Mattia, Montardini, Monica, Negri, Matteo, Sangalli, Giancarlo, and Tani, Mattia

Abstract

In this paper, we propose a space-time least-squares isogeometric method to solve parabolic evolution problems, well suited for high-degree smooth splines in the space-time domain. We focus on the linear solver and its computational efficiency: thanks to the proposed formulation and to the tensor-product construction of space-time splines, we can design a preconditioner whose application requires the solution of a Sylvester-like equation, which is performed efficiently by the fast diagonalization method. The preconditioner is robust w.r.t. spline degree and mesh size. The computational time required for its application, for a serial execution, is almost proportional to the number of degrees-of-freedom and independent of the polynomial degree. The proposed approach is also well-suited for parallelization., Comment: 29 pages, 8 figures

Published

2018