Higher order limit q-Bernstein operators

## Abstract The limit __q__‐Bernstein operator __B__~__q__~ emerges naturally as an analogue to the Szász–Mirakyan operator related to the Euler distribution. Alternatively, __B__~__q__~ comes out as a limit for a sequence of __q__‐Bernstein polynomials in the case 0<__q__<1. Lately, different prop

This paper shows that asymmetrically perturbed, symmetric Hamiltonian systems of the form with analytic \* j (=)=O(=), have at most two limit cycles that bifurcate for small ={0 from any period annulus of the unperturbed system. This fact agrees with previous results of Petrov, Dangelmayr and Gucke

## Abstract We derive Lieb–Thirring inequalities for the Riesz means of eigenvalues of order __γ__ ≥ 3/4 for a fourth order operator in arbitrary dimensions. We also consider some extensions to polyharmonic operators, and to systems of such operators, in dimensions greater than one. For the critica