| Abstrakt: |
The sufficient conditions under which the S-matrix orthogonal part U(k) is real and even are proved. These conditions are required for generalization of the projection matrices method in the N×N Riemann–Hilbert boundary value problem, N=2,3,...,N<+∞. The dependence of the analytical properties of the orthogonal matrix U(k) on the S-matrix diagonal part is thoroughly considered. The examples in which the sufficient conditions are not realized and Re U(k)≠0, U(-k)=-U(k) are demonstrated. © 2001 American Institute of Physics. [ABSTRACT FROM AUTHOR] |
