Interpolation of Closed Subspaces and Invertibility of Operators

Pub Date : 2015-01-08 DOI:10.4171/ZAA/1525
I. Asekritova, F. Cobos, N. Kruglyak
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引用次数: 3

Abstract

Let (Y0, Y1) be a Banach couple and let Xj be a closed complemented subspace of Yj ; (j = 0; 1). We present several results for the general problem of finding necessary and sufficient conditions on the parameters (θ, q) such that the real interpolation space (X0, X1)θ, q is a closed subspace of (Y0, Y1)θ, q : In particular, we establish conditions which are necessary and sufficient for the equality (X0, X1)θ, q =(Y0, Y1)θ, q, with the proof based on a previous result by Asekritova and Kruglyak on invertibility of operators. We also generalize the theorem by Ivanov and Kalton where this problem was solved under several rather restrictive conditions, such as that X1 = Y1 and X0 is a subspace of codimension one in Y0
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闭子空间的插值与算子的可逆性
设(Y0, Y1)是Banach对设Xj是Yj的闭补子空间;(j = 0;1).对于求实插值空间(X0, X1)θ, q是(Y0, Y1)θ, q的闭子空间的一般问题(θ, q)的充要条件给出了几个结果:特别地,我们建立了等式(X0, X1)θ, q =(Y0, Y1)θ, q的充要条件,并基于Asekritova和Kruglyak关于算子可逆性的先前结果进行了证明。我们还推广了伊万诺夫和卡尔顿的定理,在这些定理中,这个问题在几个相当严格的条件下得到了解决,比如X1 = Y1, X0是Y0中余维数为1的子空间
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