03/01/2016, 01:27 PM
Intresting Gottfried.
I was aware of the wiki , but perhaps a link to your work ?
However my numbers are not log-polar since they are not iso to complex.
Since you are a matrix expert ; how about a matrix representation for my spiral Numbers ?
Also are my spiral Numbers iso to The ring R(x^3) or the group ring R+(C_4) ??
Although my Numbers have no zero-divisors there might still be a connection.
Notice (0,r) * (1,-r) = (0,0).
So if we do not consider (0,r) as 0 and (0,0) as zero , we get a sort of zero-divisor.
The concept of zero is complicated here.
X a = X for all a does not exist , but a - a is always (0,0).
---
Notice that the spiral numbers keep track of additions in collatz if designed so.
Regards
Tommy1729
I was aware of the wiki , but perhaps a link to your work ?
However my numbers are not log-polar since they are not iso to complex.
Since you are a matrix expert ; how about a matrix representation for my spiral Numbers ?
Also are my spiral Numbers iso to The ring R(x^3) or the group ring R+(C_4) ??
Although my Numbers have no zero-divisors there might still be a connection.
Notice (0,r) * (1,-r) = (0,0).
So if we do not consider (0,r) as 0 and (0,0) as zero , we get a sort of zero-divisor.
The concept of zero is complicated here.
X a = X for all a does not exist , but a - a is always (0,0).
---
Notice that the spiral numbers keep track of additions in collatz if designed so.
Regards
Tommy1729
