Talk:Cauchy–Hadamard theorem

What the fuck is this: "The proof can be found in the book Introduction to Complex Analysis Part II functions in several Variables by B.V.Shabat"

I don't thinks this is the place for publicity

Multivariable version reference?
Could we get a reference for the multivariable version of the theorem? 218.208.8.112 (talk) 02:50, 28 September 2020 (UTC)
 * I added a proof 121.121.60.56 (talk) 04:48, 1 October 2020 (UTC)
 * The proof does not include the cases when R=0 or R=+infinity. 160.216.151.232 (talk) 17:36, 20 April 2023 (UTC)

What is a multi-index raised to a multi-index power?
The section Theorem for several complex variables contains this passage:

"Let $$\alpha$$ be a multi-index (a n-tuple of integers) with $$|\alpha|=\alpha_1+\cdots+\alpha_n$$, then $$f(x)$$ converges with radius of convergence $$\rho$$ (which is also a multi-index) if and only if" $$\limsup_{|\alpha|\to\infty} \sqrt[|\alpha|]{|c_\alpha|\rho^\alpha}=1$$ to the multidimensional power series $$\sum_{\alpha\geq0}c_\alpha(z-a)^\alpha := \sum_{\alpha_1\geq0,\ldots,\alpha_n\geq0}c_{\alpha_1,\ldots,\alpha_n}(z_1-a_1)^{\alpha_1}\cdots(z_n-a_n)^{\alpha_n}$$''"

I can try to guess what 𝝆𝛼 might be.

But it is much, much, much better if the article explained exactly what 𝝆𝛼 means, where both 𝝆 and 𝛼 are multi-indexes.

I hope someone knowledgeable about this subject can insert a definition.


 * I have added a definition of both. I removed the reference to "multi-index" and replaced it with the concept of a vector, which I hope is more precise. I changed the notation from $$|\alpha|$$ to $$||\alpha||$$ to avoid the confusion with $$|c_a|$$ which mean different things as I believe $$c_a$$ is not a vector. I found this notation used in Fuks Theory of Analytic Functions of Several Complex Variables which you can find in the openlibrary pp. 48. It is an old text, so I hope the notation is not out of date. I am not 100% sure that $$\alpha$$ is a vector of natural numbers. Dom walden (talk) 08:05, 7 April 2024 (UTC)