A \$k\$-hyperperfect number is a natural number \$n \ge 1\$ such that $$n = 1 + k(\sigma(n) − n − 1)$$ where \$\sigma(n)\$ is the sum of the divisors of \$n\$. Note that \$\sigma(n) - n\$ is the proper divisor sum of \$n\$. The sequence of \$k\$-hyperperfect numbers begins $$6, 21, 28, 301, 325, ...

Let $f\in\mathcal{S}(\mathbb{R}^n)$, Schwartz class. Consider the function $g$ defined on $[0,\infty)$ by $$g(r)=\int_{S^{n-1}}f(rw)d\mu(w),$$ where $d\mu$ is the normalised surface measure of $S^{n-1}.$ 1)Is $\sup_r|r^kg(r)|<\infty,$ for any $k\in\mathbb{N}$? Is $g\in\mathcal{S}([0,\infty))?$ ...

Philippians 2:5-8 is commonly interpreted by many as a description of the incarnation of Jesus: 5 Have this mind among yourselves, which is yours in Christ Jesus, 6 who, though he was in the form of God, did not count equality with God a thing to be grasped, 7 but emptied himself, by taking the ...

In the following code: class Outer { private: void f_private(Outer::Inner in); // Wrong public: class Inner {}; void f_public(Outer::Inner in); // OK }; f_private() cannot use nested class Outer::Inner as parameter type. But it's ok to do so in f_public(). Can someone explain ...

Are there mathematical theories that do not use intuitive integers? [That is, do not use integers to write statements.] Can you propose a theory that describes natural integers, without using intuitive integers to state axioms, definitions, and propositions?