In 1961, Payne and Weinberger showed that ‘among the class of membranes with given area, free along the interior boundaries and fixed along the outer boundary of given length, the concentric annulus has the highest fundamental frequency.’ In the present study, we extend this result for the first eigenvalue of the p-Laplacian, for p∈(1,∞), in higher dimensional domains where the outer boundary is a fixed sphere. As an application, we prove that the nodal set of the second eigenfunctions of the p-Laplacian (with mixed boundary conditions) on a ball cannot be a concentric sphere. © 2019 Elsevier Inc.

Anoop Thazhe Veetil

Department of Mathematics

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IIT Madras is a public technical and research university located in Chennai, Tamil Nadu. Founded in 1959, it is recognised as an Institute of National Importance.

IIT Madras has been ranked as the top engineering institute in India for four years in a row by the National Institutional Ranking Framework of the MHRD

It currently offers undergraduate, postgraduate and research degrees across 16 disciplines in Engineering, Sciences, Humanities and Management. About 596 faculty belonging to science and engineering departments and centres of the Institute are engaged in teaching, research and industrial consultancy.

IIT Madras

Journal of Mathematical Analysis and Applications

Let B1 be a ball in ℝN centred at the origin and let B0 be a smaller ball compactly contained in B1. For p ∈ (1, ∞), using the shape derivative method, we show that the first eigenvalue of the p-Laplacian in annulus B1 \B0 strictly decreases as the inner ball moves towards the boundary of the outer ball. The analogous results for the limit cases as p → 1 and p →∞ are also discussed. Using our main result, further we prove the nonradiality of the eigenfunctions associated with the points on the first nontrivial curve of the Fučik spectrum of the p-Laplacian on bounded radial domains. ©2018 American Mathematical Society.

Transactions of the American Mathematical Society

On the strict monotonicity of the first eigenvalue of the p-Laplacian on annuli

In this paper, we prove that the second eigenfunctions of the p- Laplacian, p &gt; 1, are not radial on the unit ball in RN, for any N ≥ 2. Our proof relies on the variational characterization of the second eigenvalue and a variant of the deformation lemma. We also construct an infinite sequence of eigenpairs {τn,Ψn} such that Ψn is nonradial and has exactly 2n nodal domains. A few related open problems are also stated. © 2015 American Mathematical Society.

Proceedings of the American Mathematical Society

On the structure of the second eigenfunctions of the p-laplacian on a ball

Proceedings of the Royal Society of Edinburgh: Section A Mathematics

An eigenvalue optimization problem for the p-Laplacian

Mathematische Nachrichten

Sharp bounds for the first eigenvalue and the torsional rigidity related to some anisotropic operators

Archiv der Mathematik

An upper bound for nonlinear eigenvalues on convex domains by means of the isoperimetric deficit

On reverse Faber-Krahn inequalities

Journal	Journal of Mathematical Analysis and Applications
Publisher	Academic Press Inc.
ISSN	0022247X
Open Access	Yes