Affiliation:
1. School of Mathematical Sciences, Inner Mongolia Normal University, Hohhot, P.R.China
2. School of Mathematical Sciences, Inner Mongolia University, Hohhot, P.R.China
3. Department of Mathematics, Hohhot Minzu College, Hohhot, P.R. China
Abstract
The point and residual spectra of an operator are, respectively, split into
1,2-point spectrum and 1,2-residual spectrum, based on the denseness and
closedness of its range. Let H,K be infinite dimensional complex separable
Hilbert spaces and write MX = (AX0B) ? B(H?K). For given operators A
? B(H) and B ? B(K), the sets ? X?B(K,H) ?+,i(MX)(+ = p,r;i = 1,2), are
characterized. Moreover, we obtain some necessary and sufficient condition
such that ?*,i(MX) = ?*,i(A) ?*,i(B) (* = p,r;i = 1,2) for every X ?
B(K,H).
Publisher
National Library of Serbia