Lehmer numbers and an asymptotic formula for π

The present article is really a continuation of the author's earlier paper [,l] on this subject. The line of investigation described previously is rounded off by deriving some further numcrical results, which include, in particular, an asymptotic fonnula for the number of complete propositional conn

In this paper it is shown that for every fixed k 1> 3, G(n; d = k) = 2(~) (6.2 -k + o(1))", where G(n; d = k) denotes the number of graphs of order n and diameter equal to k. It is also proved that for every fixed k>~2, lim,~G(n;d=k)/G(n;d=k+ 1)=lim.o~G(n;d=n-k)/ G(n;d=n-k+ 1)= oo hold.

In what follows we shall describe some asymptotic formulas for the commutators defined by the values of the analytic functional calculus of some commuting n-tuple of bounded operators in a complex Banach space. 1998 Academic Press Let B(X) be the algebra of all bounded linear operators on a complex

We obtain complete asymptotic expansions for certain binomial sums, including the Ape ry numbers. In general, binomial sums cannot be expressed by closed formulae, but they do satisfy polynomial recurrence relations. We use the asymptotic expansion of a binomial sum to calculate a lower bound for th