Rayleigh–Faber–Krahn inequality

In spectral geometry, the Rayleigh–Faber–Krahn inequality, named after its conjecturer, Lord Rayleigh, and two individuals who independently proved the conjecture, G. Faber and Edgar Krahn, is an inequality concerning the lowest Dirichlet eigenvalue of the Laplace operator on a bounded domain in $\mathbb {R} ^{n}$ , $n\geq 2$ .^[1] It states that the first Dirichlet eigenvalue is no less than the corresponding Dirichlet eigenvalue of a Euclidean ball having the same volume. Furthermore, the inequality is rigid in the sense that if the first Dirichlet eigenvalue is equal to that of the corresponding ball, then the domain must actually be a ball. In the case of $n=2$ , the inequality essentially states that among all drums of equal area, the circular drum (uniquely) has the lowest voice.

More generally, the Faber–Krahn inequality holds in any Riemannian manifold in which the isoperimetric inequality holds.^[2] In particular, according to Cartan–Hadamard conjecture, it should hold in all simply connected manifolds of nonpositive curvature.

References

^ Benguria, Rafael D. (2001) [1994], "Rayleigh–Faber–Krahn inequality", Encyclopedia of Mathematics, SpringerLink, retrieved 6 November 2011
^ Chavel, Isaac (1984). Eigenvalues in Riemannian geometry. OCLC 1106800772.

Linear algebra

Basic concepts

Scalar
Vector
Vector space
Scalar multiplication
Vector projection
Linear span
Linear map
Linear projection
Linear independence
Linear combination
Basis
Change of basis
Row and column vectors
Row and column spaces
Kernel
Eigenvalues and eigenvectors
Transpose
Linear equations

Matrices

Bilinear

Multilinear algebra

Vector space constructions

Numerical

Category

Functional analysis (topics – glossary)

Spaces

Banach Besov Fréchet Hilbert Hölder Nuclear Orlicz Schwartz Sobolev Topological vector
Properties	Barrelled Complete Dual (Algebraic/Topological) Locally convex Reflexive Separable

Theorems

Operators

Algebras

Open problems

Applications

Advanced topics

Category

v t e Major mathematics areas
History Timeline Future Lists Glossary
Foundations	Category theory Information theory Mathematical logic Philosophy of mathematics Set theory Type theory
Algebra	Abstract Commutative Elementary Group theory Linear Multilinear Universal Homological
Analysis	Calculus Real analysis Complex analysis Hypercomplex analysis Differential equations Functional analysis Harmonic analysis Measure theory
Discrete	Combinatorics Graph theory Order theory
Geometry	Algebraic Analytic Arithmetic Differential Discrete Euclidean Finite
Number theory	Arithmetic Algebraic number theory Analytic number theory Diophantine geometry
Topology	General Algebraic Differential Geometric Homotopy theory
Applied	Engineering mathematics Mathematical biology Mathematical chemistry Mathematical economics Mathematical finance Mathematical physics Mathematical psychology Mathematical sociology Mathematical statistics Probability Statistics Systems science Control theory Game theory Operations research
Computational	Computer science Theory of computation Computational complexity theory Numerical analysis Optimization Computer algebra
Related topics	Mathematicians lists Informal mathematics Films about mathematicians Recreational mathematics Mathematics and art Mathematics education
Mathematics portal Category Commons WikiProject