- A Let V Be A Finite Dimensional Vector Space With Two Norms K K And Show That There Are Constants 0 A 1 (19.16 KiB) Viewed 33 times
A. Let V be a finite-dimensional vector space with two norms k· k and |||·|||. Show that there are constants 0 < a
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A. Let V be a finite-dimensional vector space with two norms k· k and |||·|||. Show that there are constants 0 < a
A. Let V be a finite-dimensional vector space with two norms k· k and |||·|||. Show that there are constants 0 < a < A such that akvk ≤ |||v||| ≤ Akvk for all v ∈ V.
A. Let V be a finite-dimensional vector space with two norms ||· || and ||| . |||. Show that there are constants 0 < a < A such that a||v|| ≤ |||v||| ≤ A||v|| for all v € V.
A. Let V be a finite-dimensional vector space with two norms ||· || and ||| . |||. Show that there are constants 0 < a < A such that a||v|| ≤ |||v||| ≤ A||v|| for all v € V.