Timeline for What would be the explicit formula for the remainder in Taylor's theorem for functional calculus? [closed]
Current License: CC BY-SA 4.0
7 events
| when toggle format | what | by | license | comment | |
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| Mar 10, 2022 at 22:37 | history | closed |
abx Deane Yang LeechLattice Brian Hopkins Amir Sagiv |
Not suitable for this site | |
| Feb 18, 2022 at 1:33 | comment | added | Ryan Budney | I think perhaps your question has some typos in it. How do you input an $n \times n$ matrix into a function of a real variable $f$, when $n>1$? | |
| Feb 16, 2022 at 17:47 | comment | added | Deane Yang | First, this is more appropriate for math.stack.exchange.com. Second, I suggest you try the integral form of the error term. | |
| Feb 16, 2022 at 5:19 | review | Close votes | |||
| Mar 10, 2022 at 22:37 | |||||
| Feb 16, 2022 at 1:56 | comment | added | Isaac | Ok, I will look for the references. How about the above specific case? | |
| Feb 15, 2022 at 23:32 | comment | added | Ryan Budney | If I understand you correctly, this is basically all worked out in many multi-variable calculus textbooks, like Hubbard's. Taylor expansions of functions that take matrices as input often have rather beautiful, non-commutative expressions. | |
| Feb 15, 2022 at 23:27 | history | asked | Isaac | CC BY-SA 4.0 |