Borwein's conjecture on average over arithmetic progressions

Let a be an integer { &1 and not a square. Let P a (x) be the number of primes up to x for which a is a primitive root. Goldfeld and Stephens proved that the average value of P a (x) is about a constant multiple of xÂln x. Carmichael extended the definition of primitive roots to that of primitive \*

A particularly well suited induction hypothesis is employed to give a short and relatively direct formulation of van der Waerden's argument which establishes that for any partition of the natural numbers into two classes, one of the classes contains arbitrarily long arithmetic progressions.

We prove an unconditional analog of Artin's conjecture for the function field of a curve over a finite field. 1 teys Acadumic Press. fnc.

We analyze Lipták and Tunçel's conjecture on minimal graphs with N + -rank k. We present necessary conditions for kminimal graphs and describe the family of 2-minimal graphs. We find a 3-minimal graph and show that there is no k-minimal subdivision of complete graph for k > 4.