On a conjecture about the th lower multiexponent

In this paper the conjecture on kth lower multiexponent of primitive matrices proposed by R.A.

The energy E(G) of a graph G is the sum of the absolute values of the eigenvalues of G. An n-vertex graph G is said to be hypoenergetic if E(G) < n. In Gutman et al. (2008) [14] the authors conjectured that there exist n-vertex hypoenergetic trees with maximum degree ∆ = 4 for any n ≡ 2 mod 4, n > 2

The Lotka-Volterra system of autonomous di erential equations consists in three homogeneous polynomial equations of degree 2 in three variables. This system, or the corresponding vector ÿeld LV (A; B; C), depends on three non-zero (complex) parameters and may be written as LV (A; B; C) = Vx@x + Vy@y

We show that there exists an infinite sequence of sums P: a+b=c of rational integers with large height compared to the radical: h(P) r(P)+4K l -h(P)Âlog h(P) with K l =2 lÂ2 4 -2?Âe>1.517 for l=0.5990. This improves the result of Stewart and Tijdeman [9]. The value of l comes from an asymptotic boun