Let $M$ be a compact connected manifold of dimension $n$ endowed with aconformal class $C$ of Riemannian metrics of volume one. For any integer$k\geq0$, we consider the conformal invariant $\lambda_k ^c (C)$ defined as thesupremum of the $k$-th eigenvalue $\lambda_k (g)$ of the Laplace-Beltramioperator $\Delta_g$, where $g$ runs over $C$. First, we give a sharp universallower bound for $\lambda_k ^c (C)$ extending to all $k$ a result obtained byFriedlander and Nadirashvili for $k=1$. Then, we show that the sequence $\{\lambda_k ^c (C) \}$, that we call "conformal spectrum", is strictlyincreasing and satisfies, $\forall k\geq 0$, $\lambda_{k+1} ^c (C)^{n/2} -\lambda_k ^c (C)^{n/2} \geq n^{n/2} \omega_n $, where $\omega_n $ is the volumeof the $n$-dimensional standard sphere. When $M$ is an orientable surface ofgenus $\gamma$, we also consider the supremum $\lambda_k ^{top} (\gamma)$ of$\lambda_k(g)$ over the set of all the area one Riemannian metrics on $M$, andstudy the behavior of $\lambda_k ^{top} (\gamma)$ in terms of $\gamma$.
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机译:假设$ M $是维度为nn $的紧凑连通流形,具有第一卷的黎曼度量的保形类$ C $。对于任何整数$ k \ geq0 $,我们考虑保形不变$ \ lambda_k ^ c(C)$定义为Laplace-Beltramioperator $ \ Delta_g $的第k个特征值$ \ lambda_k(g)$ ,其中$ g $运行于$ C $以上。首先,我们给出$ \ lambda_k ^ c(C)$的尖锐通用下界,将其扩展到所有$ k $,这是Friedlander和Nadirashvili对于$ k = 1 $的结果。然后,我们证明序列$ \ {\ lambda_k ^ c(C)\} $(我们称为“等角频谱”)严格增加并满足,$ \ forall k \ geq 0 $,$ \ lambda_ {k + 1 } ^ c(C)^ {n / 2}-\ lambda_k ^ c(C)^ {n / 2} \ geq n ^ {n / 2} \ omega_n $,其中$ \ omega_n $是$ n的容量$维标准球体。当$ M $是$ \ gamma $的可定向曲面时,我们还考虑黎曼度量的所有区域的集合中$ \ lambda_k(g)$的最高\\ lambda_k ^ {top}(\ gamma)$ $ M $,并根据$ \ gamma $研究$ \ lambda_k ^ {top}(\ gamma)$的行为。
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