But what bothers me most is that zeration , unlike addition and multiplication does not have an inverse !!!

a - b , a / b

a [0]^-1 b ???

Take the equations :

a + b = c

a = c - b

a * b = c

a = c/b

max(a,b) + 1 = c

a = max^-1(c - 1,b) ??

fail.

Let C = c - 1.

max(a,b) = C

so a = C or b = C.

(a-C)(b-C) = 0.

=>

a [0]^-1 b => kroneckerdelta(a,C) kroneckerdelta(b,C) = 0

?? now since C = a or b , that delta product is not very surprising and hardly a " computation ".

this is the best we can do ??

---

Saying zeration is a new concept and writing max ... it seems ...

you know.

regards

tommy1729

a - b , a / b

a [0]^-1 b ???

Take the equations :

a + b = c

a = c - b

a * b = c

a = c/b

max(a,b) + 1 = c

a = max^-1(c - 1,b) ??

fail.

Let C = c - 1.

max(a,b) = C

so a = C or b = C.

(a-C)(b-C) = 0.

=>

a [0]^-1 b => kroneckerdelta(a,C) kroneckerdelta(b,C) = 0

?? now since C = a or b , that delta product is not very surprising and hardly a " computation ".

this is the best we can do ??

---

Saying zeration is a new concept and writing max ... it seems ...

you know.

regards

tommy1729