Reduced basis method applied to a convective stability problem

2.1 Stationary equations

2.2 Linear stability of the stationary problem

We choose the value of the aspect ratio \(\Gamma=3.495\) as in [8, 18] and let the Rayleigh number R vary in the interval: \([1000; 3000]\). In this interval two pitchfork bifurcations and two inverse pitchfork bifurcations appear [18]. In this problem we take into account nine different solutions. In the interval \([1000;1102]\) there is only the zero solution \(S_{0}\), in the interval \([1101; 1252]\) there are two other solutions, three in total, \(S_{0}\), \(S_{1}\) and \(S_{2}\), in the interval \([1252;1538]\) five solutions \(S_{0}\)–\(S_{4}\), and finally in the interval \([1538;3000]\) nine solutions \(S_{0}\)–\(S_{8}\). Therefore solution \(S_{0}\) exists in the interval \([1000;3000]\), solutions \(S_{1}\) and \(S_{2}\) in the interval \([1102;3000]\), solutions \(S_{3}\) and \(S_{4}\) in the interval \([1252;3000]\) and solutions \(S_{5}\)–\(S_{8}\) in the interval \([1538;3000]\).

3.1 Construction of the reduced basis

3.2 Galerkin procedure

Note that the construction of the matrix \(M^{s}\) can be done online very efficiently in \(\mathcal{O}(N^{3})\) operations if, during the pre-processing off-line stage, double integrals involving the elements of the reduced basis are computed, we are indeed in the case where the appearance of the parameter is outside of the integrals and the problem is only slightly nonlinear (bilinear), during the offline stage the integrals are calculated using the Legendre Gauss–Lobatto quadrature formulas [24].

3.3 Linear stability analysis

3.4 Post-processing

The reduced basis is formed by functions that are not solutions of the Galerkin procedure, indeed these are solutions of a Legendre collocation method. We introduce a rectification post-processing presented in [18], which consists of a change of basis from the reduced basis to the Galerkin solutions on the values of R of the basis as is explained as follows:

We start by computing the reduced basis Galerkin approximations for all values \(R=R_{i}\), \(i=1,\dots,N\), that are used in the reduced basis construction. This gives us coefficients \(\textbf{u}_{N}(R_{i}) = \sum^{N}_{j=1} \alpha^{i}_{j} \psi^{\textbf{u}}_{j}\) and \({ {\theta}_{N} (R_{i})}= \sum^{N}_{j=1} \beta^{i}_{j} \psi^{\theta}_{j}\). We name \(Q^{u}\) (resp. \(Q^{\theta} \)) the matrix with entries equal to \(\alpha^{i}_{j}\) (resp. \(\beta^{i}_{j}\)). We call \(S^{u}\) (resp. \(S^{\theta}\)) the matrix with columns equal to the coordinates of \(\textbf{u}(R_{i})\) (resp. \(\theta(R_{i})\)) in the reduced basis \(\psi^{\textbf{u}}_{j}\) (resp. \(\psi^{\theta}_{j}\)), \(j=1,\dots,N\). Finally, we set \(P^{u}=S^{u} [Q^{u}]^{-1}\) (resp. \(P^{\theta}=S^{\theta}[Q^{\theta} ]^{-1}\)). This part is done during the off-line stage and the matrix is stored.

4.1 Linear stability analysis

We have calculated the linear stability analysis for each type of solution. The exchange of stability bifurcations are well captured. The stability of \(S_{1}\) with respect to \(S_{1}\) captures correctly the bifurcation from \(S_{0}\) to \(S_{1}\). The real part of the eigenvalues is negative for any value of R and the largest one becomes zero at \(R_{c1}=1101\). The stability of \(S_{3}\) with respect to \(S_{3}\) and \(S_{5}\) captures the bifurcation from \(S_{3}\) to \(S_{5}\). The real part of the eigenvalues is negative for \(R > R_{c3}=1538\) and become positive for \(R < R_{c3}=1538\). Figure 3(a) presents real part of the eigenvalues as a function of R for solutions \(S_{3}\). In order to calculate a bifurcation point, the equations have to be solved for a lot of values of the bifurcation parameter R. In this case the problems are solved increasing R with steps of 1. Then the bifurcation point is the first integer where the sign of the real part of the eigenvalue with largest real part changes sign as R increases. For this reason we say the bifurcation point is correctly captured at \(R_{c3}=1538\). But there is an error, with a linear interpolation the value of the bifurcation for Reduced Basis is \(R_{c3\mathrm{RB}}=1537.5442\) and for Legendre collocation it is \(R_{c3\mathrm{L}}=1537.0860\), the relative error is \(O(10)^{-4}\). For both calculations, i.e., Legendre collocation solver and post-processed reduced basis method, the real part of the eigenvalues becomes negative for the same integer value, \(R_{c3}=1538\). The same behavior is observed for the rest of the bifurcation points at the values of \(R_{c1}= 1101\) and \(R_{c2}=1252\). Therefore, we may conclude that the bifurcation points are correctly captured.

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Figure 3(b) shows the norm of the difference between the real part of the eigenvalue with largest real part obtained via Legendre collocation and by a post-processed reduced basis method based on Legendre collocation for solutions \(S_{3}\) in the interval of R\([1534; 1539]\) near the bifurcation point at \(R_{c3}=1538\). This difference is \({\mathcal {O}}(10^{-4})\) (where both approximations cross near the bifurcation point), increasing as we move away from the bifurcation point. Figure 3(c) shows the norm of the difference between the real part of the eigenvalue with largest real part obtained via Legendre collocation and by a post-processed reduced basis method based on Legendre collocation divided by the norm of the real part of the eigenvalue obtained with Legendre collocation for solutions \(S_{3}\) in the interval of R\([1534; 1539]\) near the bifurcation point at \(R_{c3}=1538\). This difference is \({\mathcal {O}}(10^{-1})\) except around \(R=1537\) where it is \(O(1)\) because the real part of the eigenvalue crosses the axis and becomes zero near this point at \(R_{c3\mathrm{L}}=1537.0860\), for this reason the relative error becomes maximum at this value \(R=1537\).

4.2 Capturing the bifurcation points

Once we have calculated all solutions, a plot of the combination of coefficients \(a_{03}+a_{13}\) of the Legendre expansion of the field \(u_{xN}\) as a function of the Rayleigh number is drawn in the bifurcation diagram in Fig. 4. The combination \(a_{03} + a_{13}\) is employed because some of the coefficients for the stationary solutions are approximately zero but others are not. In order to characterise the stationary solutions and its evolution as a function of the Rayleigh number, we present the bifurcation diagram in Fig. 4 with a selection of nonzero coefficients \(a_{03} + a_{13}\) for which the bifurcation diagram is clear. Four bifurcations are observed in this problem. A first pitchfork bifurcation from the zero solution towards solutions with 3 rolls, \(S_{1}\) and \(S_{2}=\gamma S_{1}\). A second pitchfork bifurcation from the zero solution towards solutions with 4 rolls, \(S_{3}\) and \(S_{4}\). Two inverse pitchfork bifurcations from \(S_{3}\) (respectively \(S_{4}\)) towards non symmetric solutions with the same number of rolls, \(S_{5}\), \(S_{6} = \gamma S_{5}\) (respectively, \(S_{7}\) and \(S_{8}=\gamma S_{7}\)).

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The point where different types of solutions intersect or get together is going to be the bifurcation point, where the bifurcation takes place. The first pitchfork bifurcation takes place at \(R=1101\), where solutions \(S_{1}\) and \(S_{2}\) get together. The second bifurcation occurs at \(R=1252\), where solutions \(S_{3}\) and \(S_{4}\) intersect. Finally both secondary inverse pitchfork bifurcations take place at \(R=1538\), where \(S_{5}\) and \(S_{6}\) intersect, and where \(S_{7}\) and \(S_{8}\) get together. These bifurcation points are correctly captured with the reduced basis method by plotting the solutions in the bifurcation diagram in Fig. 4. The bifurcations are pitchfork because symmetric solutions appear at those points.

The bifurcation points are also captured with the linear stability analysis as explained in Sect. 4.1.

4.3 Errors on the solutions

Legendre collocation is a spectral method with exponential rate of convergence [23]. We define the relative error as a measure of the difference between the solution obtained with Legendre collocation and the solution obtained with the reduced basis procedure divided by the measure of the solution obtained with Legendre collocation. In Fig. 5(a) the norm of the difference between the stationary solution obtained with the reduced basis method and the solution obtained with Legendre collocation divided by the norm of the solution obtained with Legendre collocation in case \(R \in[1101; 3000]\) for solution \(S_{1}\) are presented. The errors are \({\mathcal {O}}(10^{-2})\) far from the bifurcation point, that is already a quite good approximation in comparison with the number of degrees of freedom that have been used in the reduced basis. Near the bifurcation point relative errors increase till \({\mathcal {O}}(10^{-1})\) because those points are critical. The solutions cease to exist at these point. The norm of the solutions goes to zero, for this reason a peak appear near the bifurcation point.

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With the post-processing explained in Sect. 3.4 the solutions are improved, first, by construction the error is zero at \(R=R_{i}\), for the other values of \(R \in[1101;3000]\) the maximum relative error becomes \({\mathcal {O}}(10^{-4})\) outside the bifurcation point, see Fig. 5(b), where the norm of the difference between the stationary solution obtained with Legendre collocation and with a post-processed reduced basis method based on Legendre collocation divided by the norm of the solution obtained with Legendre collocation for solutions \(S_{1}\) in the interval of R\([1101; 3000]\) is drawn. Near the bifurcation point the relative error increases to \({\mathcal {O}}(10^{-3})\). The solutions cease to exist at these point. The norm of the solutions goes to zero, and the errors are relative, for this reason a peak appear near the bifurcation point. A better relative error is obtained for the stable part of solutions \(S_{3}\) in the interval \([1539;3000]\) where the relative errors are \({\mathcal {O}}(10^{-7})\) as can be seen in Fig. 6(a). The relative error for the \(S_{3}\) unstable solutions are not better than \({\mathcal {O}}(10^{-4})\) outside the bifurcation point, near the bifurcation points the relative errors increase to \({\mathcal {O}}(10^{-2})\), as can be seen in Fig. 6(b). The solutions cease to exist at the bifurcation point. The norm of the solutions goes to zero, for this reason a peak appear near the bifurcation point. Figure 7(a) corresponds to relative errors for solution \(S_{5}\) in the interval \([1539;1600]\). Relative errors are \({\mathcal {O}}(10^{-4})\), except near the bifurcation point, where the error is \({\mathcal {O}}(10^{-3})\). Solutions \(S_{5}\) cease to exist at these point, for this reason a peak appear near the bifurcation point. The relative error in the interval \([1600;2000]\) is \({\mathcal {O}}(10^{-4})\) in Fig. 7(b), except a peak that appears \({\mathcal {O}}(10^{-3})\) due to the few values of snapshots considered in this case. A better relative error is obtained for the third part of solution \(S_{5}\) in the interval \([2000;3000]\) where the relative errors are \({\mathcal {O}}(10^{-7})\) as can be seen in Fig. 7(c).

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4.4 Advantages of reduced basis method

The reduced basis method is supported by standard discretizations. The off-line work for the calculation of the solutions to construct the reduced basis needs these standard methods. But, once the work of the standard method is done, the use of the reduced basis has several advantages.

The pressure variable disappears in the Galerkin approach due to the variational formulation and the incompressibility of the fluid (\(\nabla \cdot\vec{v}=0\)). This fact, together with the few modes required for the Galerkin expansion, provides small matrices with the reduced bases discretization. For a single value of the Rayleigh number R the size of the matrices that appear after the discretizations is 2016 in Legendre collocation with expansions of order \(13 \times35\), whereas in the case of the reduced basis with 8 elements the size of matrices is 16. A factor of 126 in the size of the matrices for each value of R. Legendre collocation matrices are dense by diagonal blocks of size \(14 \times36\).

The behavior of the Newton method for the nonlinearity is improved with respect to standard methods. A branch of solutions of a type refers to the solutions of that kind for different values of the parameter R in the interval where they exist. In the Legendre collocation method case to calculate solutions in a new branch a continuation technique is required, in this case it is based in adding the eigenfunction of the linear stability analysis near the bifurcation point to the base solution as initial guess in the Newton method. Once a solution in a branch is obtained to reach the solution in this branch for a larger value of the Rayleigh number the new solution is considered as initial guess. For a large value of the Rayleigh number the solution must be calculated by increasing slowly the Rayleigh number. For instance, we obtain the first solution in the branch in the interval \([1101; 3000]\) near \(R=1101\). To obtain the solution at \(R=3000\) we need to calculate the solution at \(R=1102\), take this solution as initial guess for \(R=1110\) and calculate the solutions increasing the value of R in steps of 10 till \(R=3000\). Sometimes the steps of increase on R can be larger. So, it is not possible to jump from \(R=1101\) till \(R=3000\) with Legendre collocation. In the reduced basis this is not the case, the solution can be directly calculated for any value of R. The reason for this behavior must be that nothing drive the solutions to be attracted by a different branch since there is not unexpected elements in the basis set. Also solutions obtained with reduced basis method are a great help as guess solutions for the Newton method in Legendre collocation. In fact the Legendre solutions necessary to valuate the errors have been calculated solving first with Galerkin reduced basis and taking this solution as initial guess for Legendre.

The number of operations is drastically reduced. If we calculate the branch of solutions \(S_{5}\) taking steps of 10 in R in the interval \([1538; 3000]\), 146 values of R are required, for the branch in the interval \([1101; 3000]\), 190 values of R and for the branch in the interval \([1252; 3000]\) 175 values of R. Therefore the whole diagram requires 1314 values of R. If we take into account symmetries only 511 values of R are necessary. The problem is nonlinear, if we consider an average of 10 iterations for each problem and we solve the linear systems with a method with \({\mathcal {O}}(N^{2})\) operations, being N the size of the matrices, for each value of R we solve the system with \({\mathcal {O}}(10^{7})\) operations for Legendre collocation and with \({\mathcal {O}}(10^{3})\) with reduced basis. Then multiplying by 10³ values of R, \({\mathcal {O}}(10^{10})\) operations for Legendre collocation and \(O(10^{6})\) for reduced basis to obtain the whole bifurcation diagram. The off-line number of operations of reduced basis requires to solve Legendre for order 10 values of the Rayleigh number, therefore \({\mathcal {O}}(10^{8})\) operations.

Summarizing, for a single value of the parameter R, the off-line number of operations is \({\mathcal {O}}(10^{8})\), the on-line maximum number of operations for Legendre collocation is \({\mathcal {O}}(10^{9})\) and for reduced basis \({\mathcal {O}}(10^{3})\). For the whole bifurcation diagram the off-line number of operations is \({\mathcal {O}}(10^{8})\), the on-line number of operations for Legendre collocation is \({\mathcal {O}}(10^{10})\) and for reduced basis \({\mathcal {O}}(10^{6})\).

A significant advantage of solving the eigenvalue problem is provided by the use of a reduced basis, which is due to a large reduction in computational cost. This reduction arises due to the size of the matrices in the eigenvalue problem; in Legendre collocation the size of the matrix is 2016, while using a reduced basis with 8 elements it is only 16. The eigenvalue problem is solved with an adaptation of the implicitly restarted Lanczos method [25]. This method has computational complexity \(O(N^{3})\), where N is the size of the matrix. Therefore for a fixed value of R in Legendre collocation the complexity is \(O(10^{9})\) whereas for reduced basis it is only \(O(10^{3})\), six orders lower. For 1000 values of the Rayleigh number Legendre collocation reaches \(O(10^{12})\) and reduced basis \(O(10^{6})\). This is reflected in the temporal computational cost, which is 122 s when using Legendre collocation and only it is 6 s using a reduced basis. Therefore the reduction is of a factor of 20 in time.