Electronic Journal of Differential Equations (Feb 2014)

Existence and comparison of smallest eigenvalues for a fractional boundary-value problem

  • Paul W. Eloe,
  • Jeffrey T. Neugebauer

Journal volume & issue
Vol. 2014, no. 43,
pp. 1 – 10

Abstract

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The theory of $u_0$-positive operators with respect to a cone in a Banach space is applied to the fractional linear differential equations $$ D_{0+}^{\alpha} u+\lambda_1p(t)u=0\quad\text{and}\quad D_{0+}^{\alpha} u+\lambda_2q(t)u=0, $$ $0< t< 1$, with each satisfying the boundary conditions $u(0)=u(1)=0$. The existence of smallest positive eigenvalues is established, and a comparison theorem for smallest positive eigenvalues is obtained.

Keywords