莫爾斯–帕萊引理

令${\displaystyle (H,\langle \cdot ,\cdot \rangle )}$ 為實希爾伯特空間，並令U是H中原點的開鄰域。令${\displaystyle f:U\to \mathbb {R} }$ 是${\displaystyle (k+2)}$ -次連續可微函數，其中${\displaystyle k\geq 1}$ ，即${\displaystyle f\in C^{k+2}(U;\mathbb {R} )}$ 。設${\displaystyle f(0)=0}$ ，0是f的非退化臨界點，即二階導${\displaystyle D^{2}f(0)}$ 確定了H與其連續對偶空間${\displaystyle H^{*}}$ 的同構 $${\displaystyle H\ni x\mapsto \mathrm {D} ^{2}f(0)(x,-)\in H^{*}.}$$ 

則在U中存在0的子鄰域V、微分同胚映射${\displaystyle \varphi :V\to V}$ （${\displaystyle C^{k}}$ ，逆也是${\displaystyle C^{k}}$ ）、可逆對稱算子${\displaystyle A:H\to H}$ 使得 $${\displaystyle f(x)=\langle A\varphi (x),\varphi (x)\rangle \quad \forall x\in V.}$$ 

令${\displaystyle f:U\to \mathbb {R} }$ 是${\displaystyle f\in C^{k+2}}$ ，使得0是非退化臨界點。則存在逆為${\displaystyle C^{k}}$ 的${\displaystyle C^{k}}$ 微分同胚映射${\displaystyle \psi :V\to V}$ 、正交分解 $${\displaystyle H=G\oplus G^{\perp },}$$  使得若有 $${\displaystyle \psi (x)=y+z\quad {\mbox{ with }}y\in G,z\in G^{\perp },}$$  則 $${\displaystyle f(\psi (x))=\langle y,y\rangle -\langle z,z\rangle \quad {\text{ for all }}x\in V.}$$ 

• 弗雷歇導數

• Lang, Serge. Differential manifolds. Reading, Mass.–London–Don Mills, Ont.: Addison–Wesley Publishing Co., Inc. 1972.