A lower bound for Fisher's information measure

We show that thermodynamic uncertainties (TU) preserve their form in passing from Boltzmann-Gibbs' statistics to Tsallis' one provided that we express these TU in terms of the appropriate variable conjugate to the temperature in a nonextensive context.

For every integer tz we denote by n the set {O, 1, . . . , n -1). We denote by En]" the collection of subsets of with exactly k elements. We call the elements of [n]" k-tuples and write thein dlown as (a,, . . . , a,) in the natural order: a, < a, c l . l < ak < n. A colouting 04 [nlk by r colours i

Recent work by Bernasconi, Damm, and Shparlinski showed that the set of square-free numbers is not in AC 0 and raised as an open question whether similar (or stronger) lower bounds could be proved for the set of prime numbers. We show that the Boolean majority function is AC 0 -Turing reducible to t

We consider a single particle in a negative potential V: H = --d + V(x). A lower bound is found for the quantity +I -EW, where cm is the ground-state energy of H in all space and where EA is the ground-state energy of H in a bounded domain A with Dirichlet ($ = 0) boundary conditions. Our estimate f