Why ODE's naive finite difference matrix works well for different boundary conditions

Question

We know finite difference method (FDM) can replace $y''(x)$ as $\frac{1}{h^2}[y(x+h)+y(x-h)-2y(x)]$ or so. The naive way to write down the matrix of the differential operator is like the following, which somehow simply cuts off at the two edges. Similarly, we can write for $y'$.

But what boundary condition (BC) correspond to this?

I first thought this means zero-value Dirichlet BC (like $y(a)=y(b)=0$). However, it turns out not to be the case. It automatically handles either zero or nonzero boundary values as shown in the solution below.

Based on such naive FDM, I solve the eigenvalue ($\lambda$) problem of this linear ODE $y''+\frac{2}{x}y'+[2\lambda-x^2-\frac{l(l+1)}{x^2}]y=0$ with nonnegative integer $l$.
It is analytically solved in textbooks and we know at the boundary, $y(0)\neq0$ for $l=0$, $y(0)=0$ for $l>0$, and $y(\infty)=0$. Surely we use some large enough interval to mimic the infinity. The following code solves the two cases well. It should work well for $l>0$, but why also for $l=0$ case???

Two things I noticed but not sure if relevant or not:
1. If we really somehow impose a nonzero left boundary value $y(0)$, the value you use doesn't matter for any eigenvalue problem. But we intuitively think it at least should be nonzero.
2. For the strange $l=0$ case, we have $y'(0)=0$ in the analytic solution.

l = 0; a = 1; n = 1001; h = 16/(n - 1);
M1 = -2.0 IdentityMatrix[n] + DiagonalMatrix[Table[1, {n - 1}], 1] + 
  DiagonalMatrix[Table[1, {n - 1}], -1];(*//MatrixForm*)
M2 = DiagonalMatrix[Table[-1/(i + 1), {i, 1, n - 1}], -1] + 
  DiagonalMatrix[Table[1/i, {i, 1, n - 1}], 1];
M3 = DiagonalMatrix[Table[(i)^2, {i, 1, n}]];(*//MatrixForm*)
M4 = l (l + 1) DiagonalMatrix[Table[(i)^-2, {i, 1, n}]];
M = 1/h^2 M1 + h^-2 M2 - h^2 M3 - h^-2 M4;
qq = Eigenvectors[M];
ListPlot[qq[[n - a + 1]], PlotRange -> All]

M2 is for this $\frac{2}{x}y'=\frac{2}{ih}\frac{y(x_{i+1})-y(x_{i-1})}{2h}=\frac{y(x_{i+1})-y(x_{i-1})}{i\,h^{2}}$. $a$ means the $a$th smallest eigenvalue and certainly one can change the value of $l$ and $a$.

Answer 1

Not a complete answer, but the following partly explains the 2 observations you made: The equation has a removable singularity at $x=0$, which leads to different implicit b.c.s depending on whether $l$ is $0$ or not:

Clear@l;   
eq = y''[x] + 2/x y'[x] + (2 λ - x^2 - (l (l + 1))/x^2) y[x] == 0;
eq /. x -> 0
(* Indeterminate == 0 *)
neweq = x^2 # & /@ eq // Simplify;  
neweq /. x -> 0
(* (l + l^2) y[0] == 0 *)

l = 0;
eq /. x -> 0
(* False *)
neweq2 = x # & /@ eq // Simplify;
neweq2 /. x -> 0
(* 0 == 2 Derivative[1][y][0] *)
Clear@l

Sadly I can't figure out why the matrix built in your way respects the implicit b.c. and isn't influenced by the wrong b.c..

BTW the following is my approach for calculating eigenvector with FDM, notice pdetoae is used for discretization:

domain = {bL, bR} = {eps, 16};
lhs = λ y[x] /. First@Solve[neweq2, \[Lambda]]
bcL = y'[bL] == 0;
bcR = y[bR] == 0;

points = 300;
grid = Array[# &, points, domain];
(*Definition of pdetoae is not included in this post,please find it in the link above.*)


ptoafunc = pdetoae[y[x], grid, 2];
ae = ptoafunc[lhs];
aebcL = Solve[ptoafunc@bcL, y[bL]][[1]]
aebcR = Solve[ptoafunc@bcR, y[bR]][[1]]
delete = #[[2 ;; -2]] &;
aewithbc = delete@ae /. aebcL /. aebcR;

{b, mat} = CoefficientArrays @@ ({aewithbc, y /@ grid // delete} /. eps -> 0);
ListLinePlot[Eigenvectors[N[mat], -1], PlotRange -> All]

I think this approach is a bit easier to understand.

Answer 2

Your matrix is not properly constructed. Your "boundary condition" is $f[x]/h=0$, where $h$ is a grid step.