1 Random Perturbations -- §1. Probabilities and Random Variables -- §2. Random Processes. General Properties -- §3. Wiener Process. Stochastic Integral -- §4. Markov Processes and Semigroups -- §5. Diffusion Processes and Differential Equations -- 2 Small Random Perturbations on a Finite Time Interval -- §1. Zeroth Approximation -- §2. Expansion in Powers of a Small Parameter -- §3. Elliptic and Parabolic Differential Equations with a Small Parameter at the Derivatives of Highest Order -- 3 Action Functional -- §1. Laplace's Method in a Function Space -- §2. Exponential Estimates -- §3. Action Functional. General Properties -- §4. Action Functional for Gaussian Random Processes and Fields -- 4 Gaussian Perturbations of Dynamical Systems. Neighborhood of an Equilibrium Point -- §1. Action Functional -- §2. The Problem of Exit from a Domain -- §3. Properties of the Quasipotential. Examples -- §4. Asymptotics of the Mean Exit Time and Invariant Measure for the Neighborhood of an Equilibrium Position -- §5. Gaussian Perturbations of General Form -- 5 Perturbations Leading to Markov Processes -- §1. Legendre Transformation -- §2. Locally Infinitely Divisible Processes -- §3. Special Cases. Generalizations -- §4. Consequences. Generalization of Results of Chapter 4 -- 6 Markov Perturbations on Large Time Intervals -- §1. Auxiliary Results. Equivalence Relation -- §2. Markov Chains Connected with the Process $$(X_t^\varepsilon, \,{\text{P}}_x^\varepsilon )$$ -- §3. Lemmas on Markov Chains -- §4. The Problem of the Invariant Measure -- §5. The Problem of Exit from a Domain -- §6. Decomposition into Cycles. Sublimit Distributions -- §7. Eigenvalue Problems -- 7 The Averaging Principle. Fluctuations in Dynamical Systems with Averaging -- §1. The Averaging Principle in the Theory of Ordinary Differential Equations -- §2. The Averaging Principle when the Fast Motion is a Random Process -- §3. Normal Deviations from an Averaged System -- §4. Large Deviations from an Averaged System -- §5. Large Deviations Continued -- §6. The Behavior of the System on Large Time Intervals -- §7. Not Very Large Deviations -- §8. Examples -- §9. The Averaging Principle for Stochastic Differential Equations -- 8 Stability Under Random Perturbations -- §1. Formulation of the Problem -- §2. The Problem of Optimal Stabilization -- §3. Examples -- 9 Sharpenings and Generalizations -- §1. Local Theorems and Sharp Asymptotics -- §2. Large Deviations for Random Measures -- §3. Processes with Small Diffusion with Reflection at the Boundary -- References.