Hiptmair–Xu preconditioner

In mathematics, Hiptmair–Xu (HX) preconditioners^[1] are preconditioners for solving ${\displaystyle H(\operatorname {curl} )}$ and ${\displaystyle H(\operatorname {div} )}$ problems based on the auxiliary space preconditioning framework.^[2] An important ingredient in the derivation of HX preconditioners in two and three dimensions is the so-called regular decomposition, which decomposes a Sobolev space function into a component of higher regularity and a scalar or vector potential. The key to the success of HX preconditioners is the discrete version of this decomposition, which is also known as HX decomposition. The discrete decomposition decomposes a discrete Sobolev space function into a discrete component of higher regularity, a discrete scale or vector potential, and a high-frequency component.

HX preconditioners have been used for accelerating a wide variety of solution techniques, thanks to their highly scalable parallel implementations, and are known as AMS^[3] and ADS^[4] precondition. HX preconditioner was identified by the U.S. Department of Energy as one of the top ten breakthroughs in computational science^[5] in recent years. Researchers from Sandia, Los Alamos, and Lawrence Livermore National Labs use this algorithm for modeling fusion with magnetohydrodynamic equations.^[6] Moreover, this approach will also be instrumental in developing optimal iterative methods in structural mechanics, electrodynamics, and modeling of complex flows.

Consider the following ${\displaystyle H(\operatorname {curl} )}$ problem: Find ${\displaystyle u\in H_{h}(\operatorname {curl} )}$ such that

${\displaystyle (\operatorname {curl} ~u,\operatorname {curl} ~v)+\tau (u,v)=(f,v),\quad \forall v\in H_{h}(\operatorname {curl} ),}$ with ${\displaystyle \tau >0}$.

The corresponding matrix form is

${\displaystyle A_{\operatorname {curl} }u=f.}$

The HX preconditioner for ${\displaystyle H(\operatorname {curl} )}$ problem is defined as

${\displaystyle B_{\operatorname {curl} }=S_{\operatorname {curl} }+\Pi _{h}^{\operatorname {curl} }\,A_{vgrad}^{-1}\,(\Pi _{h}^{\operatorname {curl} })^{T}+\operatorname {grad} \,A_{\operatorname {grad} }^{-1}\,(\operatorname {grad} )^{T},}$

where ${\displaystyle S_{\operatorname {curl} }}$ is a smoother (e.g., Jacobi smoother, Gauss–Seidel smoother), ${\displaystyle \Pi _{h}^{\operatorname {curl} }}$ is the canonical interpolation operator for ${\displaystyle H_{h}(\operatorname {curl} )}$ space, ${\displaystyle A_{vgrad}}$ is the matrix representation of discrete vector Laplacian defined on ${\displaystyle [H_{h}(\operatorname {grad} )]^{n}}$,${\displaystyle grad}$ is the discrete gradient operator, and ${\displaystyle A_{\operatorname {grad} }}$ is the matrix representation of the discrete scalar Laplacian defined on ${\displaystyle H_{h}(\operatorname {grad} )}$. Based on auxiliary space preconditioning framework, one can show that

${\displaystyle \kappa (B_{\operatorname {curl} }A_{\operatorname {curl} })\leq C,}$

where ${\displaystyle \kappa (A)}$ denotes the condition number of matrix ${\displaystyle A}$.

In practice, inverting ${\displaystyle A_{vgrad}}$ and ${\displaystyle A_{grad}}$ might be expensive, especially for large scale problems. Therefore, we can replace their inversion by spectrally equivalent approximations, ${\displaystyle B_{vgrad}}$ and ${\displaystyle B_{\operatorname {grad} }}$, respectively. And the HX preconditioner for ${\displaystyle H(\operatorname {curl} )}$ becomes ${\displaystyle B_{\operatorname {curl} }=S_{\operatorname {curl} }+\Pi _{h}^{\operatorname {curl} }\,B_{vgrad}\,(\Pi _{h}^{\operatorname {curl} })^{T}+\operatorname {grad} B_{\operatorname {grad} }(\operatorname {grad} )^{T}.}$

Consider the following ${\displaystyle H(\operatorname {div} )}$ problem: Find ${\displaystyle u\in H_{h}(\operatorname {div} )}$

${\displaystyle (\operatorname {div} \,u,\operatorname {div} \,v)+\tau (u,v)=(f,v),\quad \forall v\in H_{h}(\operatorname {div} ),}$ with ${\displaystyle \tau >0}$.

The corresponding matrix form is

${\displaystyle A_{\operatorname {div} }\,u=f.}$

The HX preconditioner for ${\displaystyle H(\operatorname {div} )}$ problem is defined as

${\displaystyle B_{\operatorname {div} }=S_{\operatorname {div} }+\Pi _{h}^{\operatorname {div} }\,A_{vgrad}^{-1}\,(\Pi _{h}^{\operatorname {div} })^{T}+\operatorname {curl} \,A_{\operatorname {curl} }^{-1}\,(\operatorname {curl} )^{T},}$

where ${\displaystyle S_{\operatorname {div} }}$ is a smoother (e.g., Jacobi smoother, Gauss–Seidel smoother), ${\displaystyle \Pi _{h}^{\operatorname {div} }}$ is the canonical interpolation operator for ${\displaystyle H(\operatorname {div} )}$ space, ${\displaystyle A_{vgrad}}$ is the matrix representation of discrete vector Laplacian defined on ${\displaystyle [H_{h}(\operatorname {grad} )]^{n}}$, and ${\displaystyle \operatorname {curl} }$ is the discrete curl operator.

Based on the auxiliary space preconditioning framework, one can show that

${\displaystyle \kappa (B_{\operatorname {div} }A_{\operatorname {div} })\leq C.}$

For ${\displaystyle A_{\operatorname {curl} }^{-1}}$ in the definition of ${\displaystyle B_{\operatorname {div} }}$, we can replace it by the HX preconditioner for ${\displaystyle H(\operatorname {curl} )}$ problem, e.g., ${\displaystyle B_{\operatorname {curl} }}$, since they are spectrally equivalent. Moreover, inverting ${\displaystyle A_{vgrad}}$ might be expensive and we can replace it by a spectrally equivalent approximations ${\displaystyle B_{vgrad}}$. These leads to the following practical HX preconditioner for ${\displaystyle H(\operatorname {div} )}$ problem,

${\displaystyle B_{\operatorname {div} }=S_{\operatorname {div} }+\Pi _{h}^{\operatorname {div} }B_{vgrad}(\Pi _{h}^{\operatorname {div} })^{T}+\operatorname {curl} B_{\operatorname {curl} }(\operatorname {curl} )^{T}=S_{\operatorname {div} }+\Pi _{h}^{\operatorname {div} }B_{vgrad}(\Pi _{h}^{\operatorname {div} })^{T}+\operatorname {curl} S_{\operatorname {curl} }(\operatorname {curl} )^{T}+\operatorname {curl} \Pi _{h}^{\operatorname {curl} }B_{vgrad}(\Pi _{h}^{\operatorname {curl} })^{T}(\operatorname {curl} )^{T}.}$

The derivation of HX preconditioners is based on the discrete regular decompositions for ${\displaystyle H_{h}(\operatorname {curl} )}$ and ${\displaystyle H_{h}(\operatorname {div} )}$, for the completeness, let us briefly recall them.

Theorem:[Discrete regular decomposition for ${\displaystyle H_{h}(\operatorname {curl} )}$]

Let ${\displaystyle \Omega }$ be a simply connected bounded domain. For any function ${\displaystyle v_{h}\in H_{h}(\operatorname {curl} \Omega )}$, there exists a vector${\displaystyle {\tilde {v}}_{h}\in H_{h}(\operatorname {curl} \Omega )}$, ${\displaystyle \psi _{h}\in [H_{h}(\operatorname {grad} \Omega )]^{3}}$, ${\displaystyle p_{h}\in H_{h}(\operatorname {grad} \Omega )}$, such that ${\displaystyle v_{h}={\tilde {v}}_{h}+\Pi _{h}^{\operatorname {curl} }\psi _{h}+\operatorname {grad} p_{h}}$ and${\displaystyle \Vert h^{-1}{\tilde {v}}_{h}\Vert +\Vert \psi _{h}\Vert _{1}+\Vert p_{h}\Vert _{1}\lesssim \Vert v_{h}\Vert _{H(\operatorname {curl} )}}$

Theorem:[Discrete regular decomposition for ${\displaystyle H_{h}(\operatorname {div} )}$] Let ${\displaystyle \Omega }$ be a simply connected bounded domain. For any function ${\displaystyle v_{h}\in H_{h}(\operatorname {div} \Omega )}$, there exists a vector ${\displaystyle {\widetilde {v}}_{h}\in H_{h}(\operatorname {div} \Omega )}$ , ${\displaystyle \psi _{h}\in [H_{h}(\operatorname {grad} \Omega )]^{3},}$ ${\displaystyle w_{h}\in H_{h}(\operatorname {curl} \Omega ),}$ such that ${\displaystyle v_{h}={\widetilde {v}}_{h}+\Pi _{h}^{\operatorname {div} }\psi _{h}+\operatorname {curl} \,w_{h},}$ and ${\displaystyle \Vert h^{-1}{\widetilde {v}}_{h}\Vert +\Vert \psi _{h}\Vert _{1}+\Vert w_{h}\Vert _{1}\lesssim \Vert v_{h}\Vert _{H(\operatorname {div} )}}$

Based on the above discrete regular decompositions, together with the auxiliary space preconditioning framework, we can derive the HX preconditioners for ${\displaystyle H(\operatorname {curl} )}$ and ${\displaystyle H(\operatorname {div} )}$ problems as shown before.