Spectral characterization of the constant sign Green's functions for periodic and Neumann boundary value problems of even order

  1. Cabada, Alberto
  2. López-Somoza, Lucía
Zeitschrift:
Differential Equations & Applications

ISSN: 1847-120X 1848-9605

Datum der Publikation: 2022

Ausgabe: 14

Nummer: 2

Seiten: 335-347

Art: Artikel

DOI: 10.7153/DEA-2022-14-24 GOOGLE SCHOLAR lock_openOpen Access editor

Andere Publikationen in: Differential Equations & Applications

Zusammenfassung

In this paper we will characterize the interval of real parameters M in which theGreen’s function GM , related to the operator T2n[M]u(t) := u(2n)(t) + M u(t) coupled to periodic, u(i)(0) = u(i)(T), i = 0,...,2n − 1, or Neumann, u(2i+1)(0) = u(2i+1)(T) = 0, i =0,...,n−1, boundary conditions, has constant sign on its square of definition. More concisely,we will prove that the optimal values are given as the first zeros of GM(0,0) or GM(T/2,0),depending both on the sign of GM and on the fact whether 2n is, or is not, a multiple of 4. Suchvalues will be characterized as the eigenvalues of the operator u(2n) related to suitable boundaryconditions. This characterization allows us to obtain such values without calculating the exactexpression of the Green’s function.