On the fine spectrum of the operator over the sequence spaces and

Let 1 be the closed unit interval or 1=[1Ân; n=1, 2, ..., ]. We give a complete characterization of BKW-operators on C(1) for the test functions [1, t, t 2 ]. 1996 Academic Press, Inc. \* &T \* f&Tf& =0 for f # S, it follows that [T \* ] \* converges strongly to T on X. We denote by BKW(X, Y; S ) th

In this paper we study the action of a bounded linear operator over different kinds of sequences of a Banach space. Our work is mainly devoted to minimal and Mbasic sequences. PLANS and GARC~A CASTELL~N have characterized the boundedneas of a linear operator T by requiring the minimality of any seq

We represent the real hyperbolic space H" as the rank one homogeneous space Spin (1, n)/ Spin (n) and the spinor bundle S of H as the homogeneous bundle Spin (1, n) x (",V, where V, is the spinor representation space of Spin (n). The representation theoretic decomposition of L2(H, S) combined with t