Talk:Infinite-dimensional holomorphy

Untitled

"One can show that, in this more general context, it is still true that a holomorphic function is analytic, that is, it can be locally expanded in a power series".

I don't understand this sentance. if we are talking about banach spaces (and not banach algebras!) what does power series mean? — Preceding unsigned comment added by 84.108.112.10 (talk) 11:15, 2 September 2006 (UTC)

I can't verify the statement, but I would guess that "polynomial" means a sum of homogeneous polynomials, and a homogeneous polynomial would be a function that factors through the diagonal embedding into the ${\displaystyle n^{th}}$ tensor product. I guess a power series would then be a formal sum of homogeneous polynomials, and we could discuss convergence. But I'm not sure. Also, according to the topological tensor product page, there's some subtleness in the definition of tensor product for Banach spaces? Can someone else check this? CraigDesjardins (talk) 00:06, 10 June 2008 (UTC)

There is no need to invoke tensor products. A homogeneous polynomial is a function that factors through the space of continuous multilinear operators L^k(X, Y). This is explained later on in the article, although not all of the details are given. siℓℓy rabbit (talk) 01:40, 10 June 2008 (UTC)

It is not easy to find the sole corresponding section within the book by Kadison and Ringrose. Thus I've added "see Sect. 3.3". Boris Tsirelson (talk) 20:02, 21 March 2009 (UTC)

Typo?

I am not mistaken, the first example of Gâteaux holomorphy should read f ∈ H_G(U,Y) rather than f ∈ U. — Preceding unsigned comment added by 137.195.182.236 (talk) 14:58, 18 December 2012 (UTC)