| dc.description.abstract | The exponential and spectrum of bounded linear operators have been investigated to
a fair extend with regard to their characterization. Numerous studies have emphasized
on the exponential stability of semigroups of linear operators in terms of its actions and
the asymptotic behaviours. Similarly, Banach spaces have been studied and various
f
indings have been obtained. Due to the fundamental fact that operators on Banach
spaces are bounded and linear, our main objective in this study was to investigate the
exponential and approximate point spectrum of a bounded linear operator in Banach
spaces. Specifically we have defined the operator exp(T) for a bounded linear operator
T in a Banach space X and determined if exp(T) is invertible. We have shown that if
S is a bounded linear operator in X and S commutes with T then exp(S +T) equals
exp(T).exp(S) . If H is a Hilbert space and T is a bounded linear operator in H
which is normal such that T commutes with a bounded linear operator S in H, then S
commutes with the adjoint of T. We have shown that the converse of this statement
holds. The spectrum of T can be expressed as the union of the approximate point
spectrum of T and the compression spectrum of T. These two sets may overlap. For
A a bounded linear operator in H, we have shown that the boundary of the spectrum
of A is contained in the approximate point spectrum of A. Finally we have shown
that if A and B are bounded linear operators in H which are similar, then A and B
have the same spectrum, point spectrum, approximate point spectrum and compression
spectrum. There exist some known results in spectral theory, for example the spectral
mapping theorem which we have explored and demonstrated that the exponential and
approximate point spectrum are independent of the Banach space. We have used
the Fuglede’s Theorem to its converse. We have also exploited the properties of the
spectrum and used the convergence norm to determine our result. The results we have
obtained in this study will be of great importance to the study of the theory of analysis
and spectral theory | en_US |
