Petrov–Galerkin method

The Petrov–Galerkin method is a mathematical method used to approximate solutions of partial differential equations which contain terms with odd order and where the test function and solution function belong to different function spaces.^[1] It can be viewed as an extension of Bubnov-Galerkin method where the bases of test functions and solution functions are the same. In an operator formulation of the differential equation, Petrov–Galerkin method can be viewed as applying a projection that is not necessarily orthogonal, in contrast to Bubnov-Galerkin method.

It is named after the Soviet scientists Georgy I. Petrov and Boris G. Galerkin.^[2]

Introduction with an abstract problem

Petrov-Galerkin's method is a natural extension of Galerkin method and can be similarly introduced as follows.

A problem in weak formulation

Let us consider an abstract problem posed as a weak formulation on a pair of Hilbert spaces ${\displaystyle V}$  and ${\displaystyle W}$ , namely,

find ${\displaystyle u\in V}$  such that ${\displaystyle a(u,w)=f(w)}$  for all ${\displaystyle w\in W}$ .

Here, ${\displaystyle a(\cdot ,\cdot )}$  is a bilinear form and ${\displaystyle f}$  is a bounded linear functional on ${\displaystyle W}$ .

Petrov-Galerkin dimension reduction

Choose subspaces ${\displaystyle V_{n}\subset V}$  of dimension n and ${\displaystyle W_{m}\subset W}$  of dimension m and solve the projected problem:

Find ${\displaystyle v_{n}\in V_{n}}$  such that ${\displaystyle a(v_{n},w_{m})=f(w_{m})}$  for all ${\displaystyle w_{m}\in W_{m}}$ .

We notice that the equation has remained unchanged and only the spaces have changed. Reducing the problem to a finite-dimensional vector subspace allows us to numerically compute ${\displaystyle v_{n}}$  as a finite linear combination of the basis vectors in ${\displaystyle V_{n}}$ .

Petrov-Galerkin generalized orthogonality

The key property of the Petrov-Galerkin approach is that the error is in some sense "orthogonal" to the chosen subspaces. Since ${\displaystyle W_{m}\subset W}$ , we can use ${\displaystyle w_{m}}$  as a test vector in the original equation. Subtracting the two, we get the relation for the error, ${\displaystyle \epsilon _{n}=v-v_{n}}$  which is the error between the solution of the original problem, ${\displaystyle v}$ , and the solution of the Galerkin equation, ${\displaystyle v_{n}}$ , as follows

${\displaystyle a(\epsilon _{n},w_{m})=a(v,w_{m})-a(v_{n},w_{m})=f(w_{m})-f(w_{m})=0}$  for all ${\displaystyle w_{m}\in W_{m}}$ .

Matrix form

Since the aim of the approximation is producing a linear system of equations, we build its matrix form, which can be used to compute the solution algorithmically.

Let ${\displaystyle v^{1},v^{2},\ldots ,v^{n}}$  be a basis for ${\displaystyle V_{n}}$  and ${\displaystyle w^{1},w^{2},\ldots ,w^{m}}$  be a basis for ${\displaystyle W_{m}}$ . Then, it is sufficient to use these in turn for testing the Galerkin equation, i.e.: find ${\displaystyle v_{n}\in V_{n}}$  such that

${\displaystyle a(v_{n},w^{j})=f(w^{j})\quad j=1,\ldots ,m.}$ 

We expand ${\displaystyle v_{n}}$  with respect to the solution basis, ${\displaystyle v_{n}=\sum _{i=1}^{n}x^{i}v^{i}}$  and insert it into the equation above, to obtain

${\displaystyle a\left(\sum _{i=1}^{n}x^{i}v^{i},w^{j}\right)=\sum _{i=1}^{n}x^{i}a(v^{i},w^{j})=f(w^{j})\quad j=1,\ldots ,m.}$ 

This previous equation is actually a linear system of equations ${\displaystyle A^{T}x=f}$ , where

${\displaystyle A_{ij}=a(v^{i},w^{j}),\quad f_{j}=f(w^{j}).}$ 

Symmetry of the matrix

Due to the definition of the matrix entries, the matrix ${\displaystyle A}$  is symmetric if ${\displaystyle V=W}$ , the bilinear form ${\displaystyle a(\cdot ,\cdot )}$  is symmetric, ${\displaystyle n=m}$ , ${\displaystyle V_{n}=W_{m}}$ , and ${\displaystyle v^{i}=w^{j}}$  for all ${\displaystyle i=j=1,\ldots ,n=m.}$  In contrast to the case of Bubnov-Galerkin method, the system matrix ${\displaystyle A}$  is not even square, if ${\displaystyle n\neq m.}$ 

See also

• Bubnov-Galerkin method

Notes

1. J. N. Reddy: An introduction to the finite element method, 2006, Mcgraw–Hill
2. "Georgii Ivanovich Petrov (on his 100th birthday)", Fluid Dynamics, May 2012, Volume 47, Issue 3, pp 289-291, DOI 10.1134/S0015462812030015