Add to ORKGWe obtain the asymptotic distribution of the nonprincipal eigenvalues associated with the singular problem x + λq(t)x = 0 on an infinite interval [a,+∞). Similar to the regular eigenvalue problem on compact intervals, we can prove a Weyl-type expansion of the eigenvalue counting function, and we derive the asymptotic behavior of the eigenvalues. Copyright © 2006 Hindawi Publishing Corporation. All rights reserved. 1
In this paper we study the asymptotic behavior of the Steklov eigenvalues of the p-Laplacian. We sho...
AbstractThe regular two parameter Sturm-Liouville equation −(py′)′ + qy = (λf − μr)y is studied for ...
We consider eigenvalue problems for second-order differential equa-tion on a finite interval having ...
We obtain the asymptotic distribution of the nonprincipal eigenvalues associated with the singular p...
We obtain the asymptotic distribution of the nonprincipal eigenvalues associated with the singular p...
summary:We consider linear differential equations of the form \[ (p(t)x^{\prime })^{\prime }+\lambda...
The study of non-self-adjoint differential operators is a historical issue. Before and until now, mo...
In this work, we obtain asymptotic formulas for eigenvalues and eigenfunctions of the second order b...
AbstractWe consider the asymptotic form of the eigenvalues of the linear differential equation −y″(x...
AbstractWe consider the asymptotic form of the eigenvalues of the linear differential equation −y″(x...
AbstractThe leading asymptotics for the growth of the number of eigenvalues of the two-dimensional D...
AbstractIn this paper we derive the higher order asymptotic distribution of the positive eigenvalues...
AbstractWe study the behavior of the eigenvalue distribution functionn(λ) for the equation−λu″=Vuon ...
Abstract. When approximating infinite dimensional linear (and nonlinear) equations, sequences of mat...
AbstractIn this work we consider the eigenfunctionV(λ,t) satisfying a condition at infinity of a sin...
In this paper we study the asymptotic behavior of the Steklov eigenvalues of the p-Laplacian. We sho...
AbstractThe regular two parameter Sturm-Liouville equation −(py′)′ + qy = (λf − μr)y is studied for ...
We consider eigenvalue problems for second-order differential equa-tion on a finite interval having ...
We obtain the asymptotic distribution of the nonprincipal eigenvalues associated with the singular p...
We obtain the asymptotic distribution of the nonprincipal eigenvalues associated with the singular p...
summary:We consider linear differential equations of the form \[ (p(t)x^{\prime })^{\prime }+\lambda...
The study of non-self-adjoint differential operators is a historical issue. Before and until now, mo...
In this work, we obtain asymptotic formulas for eigenvalues and eigenfunctions of the second order b...
AbstractWe consider the asymptotic form of the eigenvalues of the linear differential equation −y″(x...
AbstractWe consider the asymptotic form of the eigenvalues of the linear differential equation −y″(x...
AbstractThe leading asymptotics for the growth of the number of eigenvalues of the two-dimensional D...
AbstractIn this paper we derive the higher order asymptotic distribution of the positive eigenvalues...
AbstractWe study the behavior of the eigenvalue distribution functionn(λ) for the equation−λu″=Vuon ...
Abstract. When approximating infinite dimensional linear (and nonlinear) equations, sequences of mat...
AbstractIn this work we consider the eigenfunctionV(λ,t) satisfying a condition at infinity of a sin...
In this paper we study the asymptotic behavior of the Steklov eigenvalues of the p-Laplacian. We sho...
AbstractThe regular two parameter Sturm-Liouville equation −(py′)′ + qy = (λf − μr)y is studied for ...
We consider eigenvalue problems for second-order differential equa-tion on a finite interval having ...