On a lower a priori estimate of minimal eigenvalue of one Sturm-Liouville problem with second-type boundary conditions

Abstract

It is proved that for class Aγ=\q∈ L1[0,1]: q≥ 0, ∫01 qγ\,dx=1\, where γ∈ (0,1), there exists a potential q*∈ Aγ such that minimal eigenvalue λ1(q*) of boundary problem -y"+q*y=λ y, y'(0)=y'(1)=0 is equal to mγ=∈fq∈ Aγλ1(q). The equality mγ=1 for γ≤ 1-2π-2 and the inequality mγ<1 for γ>1-2π-2 are also obtained.