Ah. I see.
By half-superfunction, I thought you meant the superfunction of exp(x), S(x,n), evaluated at n=1/2.
But I guess you're talking about the superfunction of S(x,n), \( S^m(x,n) \), evaluated at m=1/2.
Since S is a function of 2 variables, I guess I have to ask...
Is \( S^2(x,n)\equiv S(S(x,n),n) \), \( S(x,S(x,n)) \), or \( S(S(x,n),S(x,n)) \)?
By half-superfunction, I thought you meant the superfunction of exp(x), S(x,n), evaluated at n=1/2.
But I guess you're talking about the superfunction of S(x,n), \( S^m(x,n) \), evaluated at m=1/2.
Since S is a function of 2 variables, I guess I have to ask...
Is \( S^2(x,n)\equiv S(S(x,n),n) \), \( S(x,S(x,n)) \), or \( S(S(x,n),S(x,n)) \)?