Frames and Pseudo-Inverses

Let T denote an operator on a Hilbert space • • , and let f i ∞ i=1 be a frame for the orthogonal complement of the kernel N T . We construct a sequence of operators n of the form n • = n i=1 • g n i f i which converges to the psuedoinverse T † of T in the strong operator topology as n → ∞. The oper

We show that there are duals {x \* n } to a given (nonexact) frame {x n } that are not usual frames. In particular, these duals are not Bessel sequences. We call them pseudo-duals. A characterization and a constructions of pseudo-duals are given. Examples and potential applications of pseudo-dual th

An accurate and practical testing technique to study seismic performance of multi-storey infilled frames is formulated. This technique is based on the pseudo-dynamic method which can provide an acceptable approximation of the dynamic performance of structures under the influence of earthquake excita

By comparing the Laplace transform L L with the differential operator D, we y1 Ž . y1 Ž . obtain a formula for the inverse Laplace transform L L s 1r V cos D VL L , where V is a unitary transformation operator. This helps us obtain an explicit spectral representation of L L. Some applications of the