Prove if the minimal polynomial of T (linear operator) is of the form p(t)=(phi(t))^m ,...
70.2K
Verified Solution
Link Copied!
Question
Accounting
Prove if the minimal polynomial of T (linear operator) is of the form p(t)=(phi(t))^m , then there exists a rational canonical basis for T.
= Theorem 7.21. If the minimal polynomial of T is of the form p(t) ($(t))", then there exists a rational canonical basis for T. = Theorem 7.21. If the minimal polynomial of T is of the form p(t) ($(t))", then there exists a rational canonical basis for T
Answer & Explanation
Solved by verified expert
Get Answers to Unlimited Questions
Join us to gain access to millions of questions and expert answers. Enjoy exclusive benefits tailored just for you!
Membership Benefits:
Unlimited Question Access with detailed Answers
Zin AI - 3 Million Words
10 Dall-E 3 Images
20 Plot Generations
Conversation with Dialogue Memory
No Ads, Ever!
Access to Our Best AI Platform: Flex AI - Your personal assistant for all your inquiries!
