Abstract
The explicit method of factorization and inversion developed in [BGK1], [BGK5] and [BGK6] is extended to a larger class of Wiener-Hopf integral equations, namely those with mxm matrix symbols of the form \( I - \hat{k}\left( \lambda \right) \), where k is the Fourier tranform of a function k from the class \( {e^{\omega }}^{{\left| t \right|}}L_1^{{m \times m}}\left( \mathbb{R} \right),\;\omega < 0 \)
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