Complement to Higher Bernstein Polynomials and Multiple Poles of 1 $Γ$($λ$) X |f | 2$λ$ f --h $ρ$$ω$ $\land$ $ω$' (2311.13259v1)

Abstract: We give, using higher Bernstein polynomials defined in our paper [2], a stronger version of our previous result in [1] whose converse is proved in [2] and we give some complements to the results in [2] which help to compute these higher order Bernstein polynomials. Then we show some non trivial examples where we determine the root of the second Bernstein polynomial which is not a double root of the full Bernstein polynomial and where the main theorem of [2] applies and localizes where a double pole exists for the meromorphic extension of the (conjugate) analytic functional given by polar parts of $\omega$ ' $\rightarrow$ |f | 2$\lambda$ f --h $\rho$$\omega$ $\land$ $\omega$' when h $\in$ N is large enough.