1. Brownian Motion -- 1.1 The One-Dimensional Random Walk -- 1.2 Multidimensional Random Walk -- 1.3 Generating Functions -- 1.4 The Continuum Limit -- 1.5 Imaginary Time -- 1.6 The Wiener Process -- 1.7 Expectation Values -- 1.8 The Ornstein-Uhlenbeck Process -- 2. The Feynman-Kac Formula -- 2.1 The Conditional Wiener Measure -- 2.2 The Integral Equation Method -- 2.3 The Lie-Trotter Product Method -- 2.4 The Brownian Tube -- 2.5 The Golden-Thompson-Symanzik Bound -- 2.6 Hamiltonians and Their Associated Processes -- 2.7 The Thermodynamical Formalism -- 2.8 A Case Study: the Harmonic Spin Chain -- 2.9 The Reflection Principle -- 2.10 Feynman Versus Wiener Integrals -- 3. The Brownian Bridge -- 3.1 The Canonical Scaling of Brownian Paths -- 3.2 Bounds on the Transition Amplitude -- 3.3 Variational Principles -- 3.4 Bound States -- 3.5 Monte Carlo Calculation of Path Integrals -- 4. Fourier Decomposition -- 4.1 Random Fourier Coefficients -- 4.2 The Wigner-Kirkwood Expansion of the Effective Potential -- 4.3 Coupled Systems -- 4.4 The Driven Harmonic Oscillator -- 4.5 Oscillating Electric Fields -- 5. The Linear-Coupling Theory of Bosons -- 5.1 Path Integrals for Bosons -- 5.2 A Random Potential for the Electron -- 5.3 The Polaron Problem -- 5.4 The Field Theory of the Polaron Model -- 6. Magnetic Fields -- 6.1 Heuristic Considerations -- 6.2 Itô Integrals -- 6.3 The Constant Magnetic Field -- 6.4 Diamagnetism of Electrons in a Solid -- 6.5 Magnetic Flux Lines -- 7. Euclidean Field Theory -- 7.1 What Is a Euclidean Field? -- 7.2 The Euclidean Two-Point Function -- 7.3 The Euclidean Free Field -- 7.4 Gaussian Functional Integrals -- 7.5 Basic Postulates -- 8. Field Theory on a Lattice -- 8.1 The Lattice Version of the Scalar Field -- 8.2 The Euclidean Propagator on the Lattice -- 8.3 The Variational Principle -- 8.4 The Effective Action -- 8.5 The Effective Potential -- 8.6 The Ginzburg-Landau Equations -- 8.7 The Mean-Field Approximation -- 8.8 The Gaussian Approximation -- 9. The Quantization of Gauge Theories -- 9.1 The Euclidean Version of Maxwell Theory -- 9.2 Non-Abelian Gauge Theories: Preliminaries -- 9.3 The Faddeev-Popov Quantization -- 9.4 Gauge Theories on a Lattice -- 9.5 Wegner-Wilson Loops -- 9.6 The SU(n) Higgs Model -- 10. Fermions -- 10.1 The Dirac Field in Minkowski Space -- 10.2 The Euclidean Dirac Field -- 10.3 Grassmann Algebras -- 10.4 Formal Derivatives -- 10.5 Formal Integration -- 10.6 Functional Integrals of QED -- 10.7 The SU(n) Gauge Theory with Fermions -- Appendices -- A List of Symbols and Glossary -- B Frequently Used Gaussian Processes -- C Jensen's Inequality -- D A Table of Path Integrals -- References.