A complete and balanced account of communication theory, providing an understanding of both Fourier analysis
(and the concepts associated with linear systems) and the characterization of such systems by mathematical operators.
Presents applications of the theories to the diffraction of optical wave-fields and the analysis of image-forming
systems. Emphasizes a strong mathematical foundation and includes an in-depth consideration of the phenomena of
diffraction. Combines all theories to describe the image-forming process in terms of a linear filtering operation
for both coherent and incoherent imaging. Chapters provide carefully designed sets of problems. Also includes extensive
tables of properties and pairs of Fourier transforms and Hankle Transforms.
Table of Contents
Representation of Physical Quantities by Mathematical Functions.
Special Functions.
Harmonic Analysis.
Mathematical Operators and Physical Systems.
Convolution.
The Fourier Transform.
Characteristics and Applications of Linear Filters.
Two-Dimensional Convolution and Fourier Transformation.
The Propagation and Diffraction of Optical Wave Fields.