On a conjecture of Tutte concerning minimal tree numbers

In [ I ]I, Gandhi has stated the following conjecture on Genocchi numbl:rs: ## . z;(t~-I)~ . The meaning of the odd notation on the 1e:ft of (1) is as follows: write . . . C(k+n-1)2 ; then ## K(n+l,k)=k2K(n,k+lj-(k-l)2~(~~,k~ K(1,k)=k2-(k-1;j2 =2k--1 alId, af course, (1) is restated as (1')

## Abstract Jacobson, Levin, and Scheinerman introduced the fractional Ramsey function __r__~__f__~ (__a__~1~, __a__~2~, …, __a__~__k__~) as an extension of the classical definition for Ramsey numbers. They determined an exact formula for the fractional Ramsey function for the case __k__=2. In this

Let T and S be two number theoretical transformations on the n-dimensional unit cube B, and write TtS if there exist positive integers m and n such that T m =S n . F. Schweiger showed in [1969, J. Number Theory 1, 390 397] that TtS implies that every T-normal number x is S-normal. Furthermore, he co

A conjecture concerning the Crame r Wold device is answered in the negative by giving a Fourier-free, probabilistic proof using only elementary techniques. It is also shown how a geometric idea allows one to interpret the Crame r Wold device as a special case of a more general concept.