On Freudenthal's spectral theorem
نویسندگان
چکیده
منابع مشابه
A note on spectral mapping theorem
This paper aims to present the well-known spectral mapping theorem for multi-variable functions.
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PM**£(*') f° r h£rS$2 where h ( < ^ ) is the point nearest to s* at which €(li)«<r(4j). If $(52)==<r(52), then let h~$%. For r<t2 let p(r) =p(^)+log log log fc — log log log r for Ui^r^h where #1 (<*2) is the point of intersection of y—p with y = p (£2) + log log log fe—log log log r. Let p(r)~p for r i^ rgwi . It is always possible to choose H SO large that r\<ti\. We repeat the procedure and ...
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For a general vector space V , and a linear operator T , we have already asked the question “when is there a basis of V consisting only of eigenvectors of T?” – this is exactly when T is diagonalizable. Now, for an inner product space V , we know how to check whether vectors are orthogonal, and we know how to define the norms of vectors, so we can ask “when is there an orthonormal basis of V co...
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ژورنال
عنوان ژورنال: Indagationes Mathematicae (Proceedings)
سال: 1986
ISSN: 1385-7258
DOI: 10.1016/1385-7258(86)90026-0