# Recursively Inverting a linear system - getting huge errors (precision)

I have a Ax =b type linear system - where A is an upper-triangular matrix. The structure of A is defined as follows:

comp.Amat <- function(i,j,prob) ifelse(i > j, 0, dbinom(x=i, size=j, prob=prob))

prob <- 1/4
A <- outer(1:50, 1:50 , FUN=function(r,c) comp.Amat(r,c,prob) )

The entries in A are binomial probabilities - and the issue is the diagonal entries fastly approach to 0 when the size of A grows.

If we define the vector b as follows as well:

b <- seq(1,50,1);

Then solve(a=A,b=b) - gives an error:

"  system is computationally singular: reciprocal condition number = 1.07584e-64"

That makes sense, since the diagonal entries are almost 0, so the matrix becomes non-invertible.

As a work-around, I have written the following recursive function - which starts to compute the value of last diagonal entry, then replaces that value in the previous rows. Since each entry in matrix is dbinom(j,i, prob) for j=>i :I can get a solution via this way.

solve.for.x.custom <- function(A, b, prob)
{

n =length(A[1,])
m =length(A[,1])

x = seq(1,n, 1);
x[x> 0] = -1000;

calc.inv.Aii <- function(i,j, prob)
{
res = (1 / (prob*(1-prob)))^i;
return(res);

}

for (i in m:1 )
{

if(i ==m)
{
rhs =0;

}else
{
rhs=0;
for(j in m:(i+1))
{
rhs =  dbinom(x=i,size=j,prob=prob)*x[j] + rhs;
}

}

x[i] = (b[i] - rhs)*calc.inv.Aii(i,i);

}
print(x)
return(x)

}

My problem is - when I multiply this solution x' by matrix A, the errors (Ax'- b) are huge. Since I have an analytical solution (each entry in x_i can be described as a in terms of binomial probabilities multiplies by previous values) - the error I should get is 0- in each row.

I see that (1 / (1/a)) may not be equal to a because of these issues. However, the current errors are really big( -1.13817489781529e+168).

x_prime=solve.for.x.custom(A, b, prob)
A%*%x_prime - b
#output
[,1]
[1,] -1.13817489781529e+168
[2,]  2.11872209742428e+167
[3,] -1.58403954589004e+166
[4,]  6.52328959209082e+164
[5,] -1.69562573261261e+163
[6,]  3.00614551450976e+161
***
[49,]  -7.58010305220250e+08
[50,]   9.65162608741321e+03

I would really appreciate it you'd recommend any suggestions or efficient methods. I gave the size of A and b as 50 -but I intend to grow them as well thus in that case this the error will increase also.

-

If your matrix A is upper triangular you probably want to use backsolve(A, b) rather than solve(A, b).

You can do arbitrary precision in R with Rmpfr, which will require writing a compatible version of backsolve. With the code below the break we can get

> print(max(abs(b - .b)), digits=5)
1 'mpfr' number of precision  1024   bits
[1] 2.9686e-267

There is one important caveat though: the values in A may not be accurate enough since they come from dbinom rather than using mpfr objeccts. Depending on your end goal, you may need to write your own version of dbinom using Rmpfr.

library(Rmpfr)

logcomp.Amat <- function(i,j,prob) ifelse(i > j, -Inf, dbinom(x=i, size=j, prob=prob, log=TRUE))

nbits <- 1024

.backsolve <- function(A, b) {

n <- length(b)
x <- mpfr(numeric(n), nbits)

for(i in rev(seq_len(n))) {

known <- i + seq_len(n - i)
z <- if(length(known) > 0) sum(A[i,known] * x[known]) else 0

x[i] <- (b[i] - z) / A[i,i]
}

return(x)
}

logA <- outer(1:50, 1:50, logcomp.Amat, prob=1/4)
b <- 1:50

A <- exp(mpfr(logA, nbits))
b <- mpfr(b, nbits)

x <- .backsolve(A, b)

.b <- as.vector(A %*% x)
-
With the above edit to comp.Amat, and this code: x <- backsolve(A,b) ; max(abs(A %*% x - b)), I get this result: [1] 7.805534e+25. This is a very ill-conditioned system, and I suspect that this is the point of the exercise. – Matthew Lundberg Nov 10 '12 at 4:13
Thank you @pete - this helped decrease the error. But the error that I get is still really high.. – Roark Nov 10 '12 at 5:09
@MatthewLundberg yes I get the same result as well. That error is still really high though:( – Roark Nov 10 '12 at 5:11
The size of the values in A and x might be manageable on the log-scale. – pete Nov 11 '12 at 2:44
Worth noting that max(abs(b1 - b) / x) gives very small numbers (i.e. the relative error in x is probably very small). It may not be possible to store the "correct" answers to sufficient precision to recover b from A and x. – pete Nov 12 '12 at 9:01