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Abstract
We use a discrete version of Kramer's sampling theorem to derive sampling expansions for discrete transforms whose kernels arise from regular difference equations. The kernels may be taken to be either solutions or Green's functions of second order regular self-adjoint boundary-value problems. In both cases, the sampling eexpansions obtained are written in forms of finite-Lagrange-type interpolation expansions. Cauchy-type sampling expansions for periodic bandlimited signals will be derived using first order boundary-value problems. Illustrative exampls are also given.
∗Research supported by Alexander von Humboldt foundation under the number IV-1039259
‡On leave from Department of Mathematics. Faculty of sciencee. Cairo University. Giza, Egypt.
∗Research supported by Alexander von Humboldt foundation under the number IV-1039259
‡On leave from Department of Mathematics. Faculty of sciencee. Cairo University. Giza, Egypt.
Notes
∗Research supported by Alexander von Humboldt foundation under the number IV-1039259
‡On leave from Department of Mathematics. Faculty of sciencee. Cairo University. Giza, Egypt.