Let M be a Riemannian manifold with dimension n, and let B_M(p, r) be a geodesic ball centered at p with radius r less than the injectivity radius of p ∈ M. For each real number k, let N(k) denote the simply connected space form of dimension n and constant sectional curvature k. Cheng's eigenvalue comparison theorem compares the first eigenvalue λ₁(B_M(p, r)) of the Dirichlet problem in B_M(p, r) with the first eigenvalue in B_N(k)(r) for suitable values of k. There are two parts to the theorem:

• Suppose that K_M, the sectional curvature of M, satisfies

${\displaystyle K_{M}\leq k.}$ 

Then

${\displaystyle \lambda _{1}\left(B_{N(k)}(r)\right)\leq \lambda _{1}\left(B_{M}(p,r)\right).}$ 

The second part is a comparison theorem for the Ricci curvature of M:

• Suppose that the Ricci curvature of M satisfies, for every vector field X,

${\displaystyle \operatorname {Ric} (X,X)\geq k(n-1)|X|^{2}.}$ 

Then, with the same notation as above,

${\displaystyle \lambda _{1}\left(B_{N(k)}(r)\right)\geq \lambda _{1}\left(B_{M}(p,r)\right).}$ 

S.Y. Cheng used Barta's theorem to derive the eigenvalue comparison theorem. As a special case, if k = −1 and inj(p) = ∞, Cheng’s inequality becomes λ^*(N) ≥ λ^*(H ⁿ(−1)) which is McKean’s inequality.^[2]

• Comparison theorem
• Eigenvalue comparison theorem

Citations edit

Bibliography edit

• Bessa, G.P.; Montenegro, J.F. (2008), "On Cheng's eigenvalue comparison theorem", Mathematical Proceedings of the Cambridge Philosophical Society, 144 (3): 673–682, doi:10.1017/s0305004107000965, ISSN 0305-0041.
• Chavel, Isaac (1984), Eigenvalues in Riemannian geometry, Pure Appl. Math., vol. 115, Academic Press.
• Cheng, Shiu Yuen (1975a), "Eigenfunctions and eigenvalues of Laplacian", Differential geometry (Proc. Sympos. Pure Math., Vol. XXVII, Stanford Univ., Stanford, Calif., 1973), Part 2, Providence, R.I.: American Mathematical Society, pp. 185–193, MR 0378003
• Cheng, Shiu Yuen (1975b), "Eigenvalue Comparison Theorems and its Geometric Applications", Math. Z., 143: 289–297, doi:10.1007/BF01214381.
• Lee, Jeffrey M. (1990), "Eigenvalue Comparison for Tubular Domains", Proceedings of the American Mathematical Society, 109 (3), American Mathematical Society: 843–848, doi:10.2307/2048228, JSTOR 2048228.
• McKean, Henry (1970), "An upper bound for the spectrum of △ on a manifold of negative curvature", Journal of Differential Geometry, 4: 359–366.
• Lee, Jeffrey M.; Richardson, Ken (1998), "Riemannian foliations and eigenvalue comparison", Ann. Global Anal. Geom., 16: 497–525, doi:10.1023/A:1006573301591/