Euclidean-time formulation of the eigenvalue moment method for finite dimensional systems, 1992
Ndow, G. L.
1990-1999
The eigenvalue moment method (EMM), developed by Handy and Bessis is examined from a Euclidean time reformulation. This alternative approach offers a more elegant and rigorous analysis than the conventional EMM theory. We will look at finite matrix analogues for the Euclidean time dependent problem H'F(x,t) = dt^x.t), analyzed from a moments problem perspective. This will enable the generation of converging upper and lower bounds to the "ground state" eigenvalue without the necessity of a discretization ansatz as is the case in conventional EMM theory.
text
application/pdf
1992-06-01
thesis
Master of Science (MS)
Clark Atlanta University
Department of Physics
Handy, Carlos
Georgia--Atlanta
http://hdl.handle.net/20.500.12322/cau.td:1992_ndow_g_l