I have a problem in performing Gaussian elimination. The matrix A is quite large and can't be stored with my memory constraints, however, the elements of A can be described as a function of i and j, i.e., A(i,j) = f(i,j).
In addition, I don't need to calculate all the elements of the resulting upper triangular matrix.
The question now, how to update the algorithm of Gaussian elimination to use f(i,j) to calculate a specific element of the resulting matrix in stead of calculate all the elements?
update: this is my A matrix:
a_{11} & a_{12} & a_{13} & a_{14} & .. & a_{1L}
q_1 & a_{22} & a_{23} & a_{23} & .. & a_{2L}
q_2 & q_1 & a_{33} & a_{34} & .. & a_{3L}
q_3 & q_2 & q_1 & a_{44} & .. & a_{3L}
q_4 & q_3 & q_2 & q_1 & .. & a_{3L}
: & : & : & : & : & :
: & : & : & : & : & :
q_L & q_{L-1} & q_{L-2} & q_{L-3} & .. & a_{LL}