Probability:

Introduction to probability. Random experiment. Classical, frequentist, subjectivist approach. Axiomatic approach. Results space. Random events, algebra / σ-event algebra. Probability of an event, probability space. Axioms of probability. Additive / σ-additive; conditional probability. Stochastically independent, positively / negatively related events. Bayes theorem and its applications.

Random numbers. Borel-measurable functions. Random numbers, distribution function. Discrete random numbers, probability function. Examples of discrete distributions: uniform, binomial, Poisson. Continuous random numbers, probability density function. Examples of continuous distributions: uniform, exponential, normal. Expected value of a random number. Variance and standard deviation of a random number. Expected value of a function of a random number. Moments of a random number, reinterpretation of expected value and variance in terms of moments. Expected value, variance and standard deviation of an affine linear function of a random number.

Discrete random vectors. Random vectors. Two-dimensional random vectors: distribution function, stochastically independent random numbers. Discrete two-dimensional random vectors: probability function (joint and marginal). Vector of expected values of a random vector. Expected value of an affine linear function of a random vector. Covariance between two components of a random vector. Linear correlation between components; linear correlation coefficient of Bravais. Variance-covariance matrix of a random vector. Variance of an affine linear function of a random vector.

Financial calculus:

Financial laws. Capitalization, discount (or discounting). Initial capital, amount, interest, capitalization factor (or amount); nominal value at maturity, present value (or discounted value), discount, discount factor. Interest rate, discount rate. Financial laws, financial regimes. Conjugated factors. Financial laws of a variable. Ordinary schemes: simple capitalization, compound capitalization, capitalization at simple interest rates in advance; rational discount (or simple discount), compound discount, trade discount. Equivalent rates in simple and simple capitalization in advance. Equivalent rates in compound capitalization; convertible nominal annual rate, effective annual rate. Generality levels for laws of a variable. Follow-up factor. Financial laws of two variables. Generality levels by laws of two variables. Instant intensity of interest for laws of a variable; the case of compound capitalization. Separable by laws of a variable. Instant intensity of interest for laws of two variables. Separable by laws of two variables. Separability by product, Cantelli theorem. Application: the actuarial capitalization factor.

Cash Flows. Financial transactions, cash flows. Current value and amount of a cash flow. Annuities, investments, financing. Periodic rents in constant installments, in compound capitalization (temporary / perpetual, postponed / advanced); the symbols. DCF, VAN (or NPV), internal rates of a financial transaction. DCF chart for investments and financing. TIR (or IRR) of an investment, actual cost of a loan.

Depreciation. Amortization of a debt. Maturities, installments, capital shares, interest quotas, residual debt, extinguished debt, total interest. Amortization plan. Closing conditions: elementary, initial, final. Elementary approach, financial approach. The case of compound capitalization. Contract rate. Formulas for interest rates, recursive formulas for residual debts. Change of conditions. Italian amortization, French amortization. Applications: consumer credit, leasing. Rate calculation problems; time profile of payments. Rate calculation problems; TAN, APR.

Term structure. The term structure of prices. Spot (spot) prices of zero-coupon bonds, forward (forward) prices of zero-coupon bonds per unit. Arbitrages without risk. Impossibility of arbitrage without ri