Hey Allan,
there is a thing where 2-hyperperfect numbers do come up: Let N=Perfect Number and O=2-Hyperperfect Number, if N and O are coprime then sigma(NO)-3*NO=N. sigma(n)-3n=28 is the smallest positive value A for the equation sigma(n)-3n=A known where "large" solutions are known to occur(Other such A include A=36, A=72, A=84, and more). In fact. numbers of the form NO is how I originally stumbled upon it as I first encountered 8993898150387166739343273184118001986107194238872484299445836 a few days before my announcement which is the smallest number known not of the form 28*3^n*(3^(n+1)-2) where sigma(n)-3n=28. Few days later, I realized the hyperperfect thing which was how I found the new 2-hyperperfect number in the first place. It's still up in the air if any solution not divisible by 28 exists where sigma(n)-3n=28 though I suspect it happens eventually.
Also, thank you. This is also the first time I've managed to find a counterexample for a conjecture in a research paper(Conjecture 2 in the paper
"Generalized perfect numbers" page 7) and possibly another if I understand it correctly though I didn't know this until after my find. I wish I could contact the one author who is still alive but the email in that paper didn't work.
Regards,
Alex Violette