Introduction. Planck's Quantum Energy Equation. Uncertainty Principle. Dirac Quantum Optics. Interference, Diffraction, Refraction, and Reflection via the Dirac Notation. Generalized Multiple-Prism Dispersion. Dirac Notation Identities. Laser Excitation. Laser Oscillators Described via the Dirac Notation. Interferometry via the Dirac Notation. Secure Interferometric Communications in Free Space. Schrödinger's Equation. Introduction to Feynman Path Integrals. Matrix Aspects of Quantum Mechanics. Classical Polarization. Quantum Polarization. Entangled Polarizations: Probability Amplitudes and Experimental Configurations. Quantum Computing. Quantum Cryptography and Teleportation. Quantum Measurements. Interpretational Issues in Quantum Mechanics.
Quantum Optics for Engineers provides a transparent and methodical introduction to quantum optics via the Dirac's bra-ket notation with an emphasis on practical applications and basic aspects of quantum mechanics such as Heisenberg's uncertainty principle and Schrodinger's equation.
Self-contained and using mainly first-year calculus and algebra tools, the book:
Illustrates the interferometric quantum origin of fundamental optical principles such as diffraction, refraction, and reflection
Provides a transparent introduction, via Dirac's notation, to the probability amplitude of quantum entanglement
Explains applications of the probability amplitude of quantum entanglement to optical communications, quantum cryptography, quantum teleportation, and quantum computing.
Quantum Optics for Engineers is succinct, transparent, and practical, revealing the intriguing world of quantum entanglement via many practical examples. Ample illustrations are used throughout its presentation and the theory is presented in a methodical, detailed approach.