Find an $N$-dimensional vector orthogonal to a given vector

Question

I'm writing an eigensolver and I'm trying to generate a guess for the next iteration in the solve that is orthogonal to to all known eigenvectors calculated thus far. This means that if I have only one eigenvector, that is say 2 million entries long, I need to generate a vector orthogonal to it. I don't think Gram Schmidt works here because I don't have a set of vectors to orthogonalize. What I have is a single vector, in the first eigensolve, and I need to generate another that is orthogonal.

So, in summary: given one vector, create from nothing another vector which is orthogonal to it. The method must support $N$-dimensional vectors (where $N$ could be millions).

I should add that writing a generalized cross product algorithm is not appealing. I'd prefer another way.

Answer 1

Suppose the vector is $(x_1,x_2,\dots)$. The following algorithm should work:

1. If $x_1=0$ then take $(1,0,0,\dots)$.

2. If $x_1$ is non-zero and $x_2=0$ then take $(0,1,0,0,\dots)$.

3. If $x_1$ and $x_2$ are non-zero then take $(-x_2,x_1,0,0,\dots)$

Answer 2

Actually you might use Gram Schmidt here.

Given a set of orthogonal vectors $x_1,x_2,\ldots,x_k$ you can use Gram-Shmidt algorithm for set of vectors $\{x_1,x_2,\ldots,x_k,e_i\}$ adding basis vector to system of orthogonalysed vectors (note that you need use Gram Schmidt procedure only to find last vector since first k vectors are already orthogonal). Then (since vectors $e_1,e_2,\ldots,e_{k+1}$ are linearly independent) for some i between 1 and k+1 Gram Schmidt will give you non-zero vector which is orthogonal to given vectors $x_1,x_2,\ldots,x_k$

So to find a guess you simply need to use Gram Schmidt procedure several times (no more than k+1 for the first guess and no more then two times for next guesses).

To simplify this procedure you can do this only with first $k+1$ coordinates of vectors, so you will find a vector of form $(y_1,y_2,\ldots,y_{k+1},0,0,\ldots)$. Answers of Kapil and Klaus are actually equivalent to using this route.

Answer 3

I think for a 2m dimensional vector ( a,b,c,d.........z) you can say that ( -z, -x,......... a) is orthogonal where half are negative of their original values However for 2m + 1 dimensional vector you can't straightforwardly say the same ( if you want a non zero orthogonal vector ). But since it is a guess you can keep a zero in the middle i think