%0 Journal Article
%T Non Hermitian Matrix Quasi-Exactly Solvable Hamiltonian
%A Ancilla Nininahazwe
%J Open Journal of Microphysics
%P 15-25
%@ 2162-2469
%D 2018
%I Scientific Research Publishing
%R 10.4236/ojm.2018.83003
%X <div style=\"text-align:justify;\">
	A new example of <em>PT</em>-symmetric quasi-exactly solvable (QES) 22กม-matrix Hamiltonian which is associated to a trigonometric Razhavi potential is con-sidered. Like the QES analytic method considered in the Ref. [1] [2], we es-tablish three necessary and sufficient algebraic conditions for this Hamilto-nian to have a finite-dimensional invariant vector space whose generic ele-ment is polynomial. This non hermitian matrix Hamiltonian is called <em>qua-si-exactly solvable</em> [3].
</div>
%K &lt
%K em&gt
%K PT&lt
%K /em&gt
%K -Symmetry
%K Razhavi potential
%K Quasi-Exact Solvability
%K QES Analytic Method
%U http://www.scirp.org/journal/PaperInformation.aspx?PaperID=86852