MathDB

11

Part of 2005 Miklós Schweitzer

Problems(1)

bilinear form

Source: miklos schweitzer 2005 q11

8/28/2021
Let E:Rn\{0}R+E: R^n \backslash \{0\} \to R^+ be a infinitely differentiable, quadratic positive homogeneous (that is, for any λ>0 and pRn\{0}p \in R^n \backslash \{0\} , E(λp)=λ2E(p)E (\lambda p) = \lambda^2 E (p)). Prove that if the second derivative of E(p):Rn×RnRE''(p): R^n \times R^n \to R is a non-degenerate bilinear form at any point pRn\{0}p \in R^n \backslash \{0\}, then E(p)E''(p) (pRn\{0}p \in R^n \backslash \{0\}) is positive definite.
real analysisHomogeneous functionpositive definitelinear algebra