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.