Bruce Schneier. A comprehensive tutorial and reference but a little light on mathematical theory.
Richard A. Mollin. Intended for a one-semester introductory undergraduate course in cryptography. Covers symmetric and public key systems with chapters on advanced topics.
Oded Goldreich. Focuses on the basic mathematical tools needed for cryptographic design: computational difficulty (one-way functions), pseudorandomness and zero-knowledge proofs.
Richard Bondi. Subtitled "A Programmer's Guide to the Microsoft CryptoAPI" which describes what the book is about.
Robert Churchhouse. Describes and analyses systems from the earliest to the most recent.
Schneier, et al. Covers design, performance, instructions and source code in C.
Jon C. Graff. Geared to nontechnical managers who want to explore the underlying concepts of this topic.
Evangelos Kranakis. A comprehensive account of recent algorithms developed in computational number theory and primality testing.
Gustavus J. Simmons. Subtitled "The Science of Information Integrity". Has emphasis on the cryptographic elements of the subject.
S.C. Coutinho. An introduction to number theory and its applications to cryptography. A revised and updated translation from original in Portuguese.
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