Value at riskLa VaR (de l'anglais value at risk, mot à mot : « valeur à risque », ou « valeur en jeu ») est une notion utilisée généralement pour mesurer le risque de marché d'un portefeuille d'instruments financiers. Elle correspond au montant de pertes qui ne devrait être dépassé qu'avec une probabilité donnée sur un horizon temporel donné. L'utilisation de la VaR n'est désormais plus limitée aux instruments financiers : on peut en faire un outil de gestion des risques dans tous les domaines (, par exemple).
Entropic value at riskIn financial mathematics and stochastic optimization, the concept of risk measure is used to quantify the risk involved in a random outcome or risk position. Many risk measures have hitherto been proposed, each having certain characteristics. The entropic value at risk (EVaR) is a coherent risk measure introduced by Ahmadi-Javid, which is an upper bound for the value at risk (VaR) and the conditional value at risk (CVaR), obtained from the Chernoff inequality. The EVaR can also be represented by using the concept of relative entropy.
RisqueLe risque est la possibilité de survenue d'un événement indésirable, la probabilité d’occurrence d'un péril probable ou d'un aléa. Le risque est une notion complexe, de définitions multiples car d'usage multidisciplinaire. Néanmoins, il est un concept très usité depuis le , par exemple sous la forme de l'expression , notamment pour qualifier, dans le sens commun, un événement, un inconvénient qu'il est raisonnable de prévenir ou de redouter l'éventualité.
Coherent risk measureIn the fields of actuarial science and financial economics there are a number of ways that risk can be defined; to clarify the concept theoreticians have described a number of properties that a risk measure might or might not have. A coherent risk measure is a function that satisfies properties of monotonicity, sub-additivity, homogeneity, and translational invariance. Consider a random outcome viewed as an element of a linear space of measurable functions, defined on an appropriate probability space.
Risk measureIn financial mathematics, a risk measure is used to determine the amount of an asset or set of assets (traditionally currency) to be kept in reserve. The purpose of this reserve is to make the risks taken by financial institutions, such as banks and insurance companies, acceptable to the regulator. In recent years attention has turned towards convex and coherent risk measurement. A risk measure is defined as a mapping from a set of random variables to the real numbers. This set of random variables represents portfolio returns.
Expected shortfallExpected shortfall (ES) is a risk measure—a concept used in the field of financial risk measurement to evaluate the market risk or credit risk of a portfolio. The "expected shortfall at q% level" is the expected return on the portfolio in the worst of cases. ES is an alternative to value at risk that is more sensitive to the shape of the tail of the loss distribution. Expected shortfall is also called conditional value at risk (CVaR), average value at risk (AVaR), expected tail loss (ETL), and superquantile.
Tail value at riskTail value at risk (TVaR), also known as tail conditional expectation (TCE) or conditional tail expectation (CTE), is a risk measure associated with the more general value at risk. It quantifies the expected value of the loss given that an event outside a given probability level has occurred. There are a number of related, but subtly different, formulations for TVaR in the literature. A common case in literature is to define TVaR and average value at risk as the same measure.
Portfolio optimizationPortfolio optimization is the process of selecting the best portfolio (asset distribution), out of the set of all portfolios being considered, according to some objective. The objective typically maximizes factors such as expected return, and minimizes costs like financial risk. Factors being considered may range from tangible (such as assets, liabilities, earnings or other fundamentals) to intangible (such as selective divestment). Modern portfolio theory was introduced in a 1952 doctoral thesis by Harry Markowitz; see Markowitz model.
Loi normale multidimensionnelleEn théorie des probabilités, on appelle loi normale multidimensionnelle, ou normale multivariée ou loi multinormale ou loi de Gauss à plusieurs variables, la loi de probabilité qui est la généralisation multidimensionnelle de la loi normale. gauche|vignette|Différentes densités de lois normales en un dimension. gauche|vignette|Densité d'une loi gaussienne en 2D. Une loi normale classique est une loi dite « en cloche » en une dimension.
Elliptical distributionIn probability and statistics, an elliptical distribution is any member of a broad family of probability distributions that generalize the multivariate normal distribution. Intuitively, in the simplified two and three dimensional case, the joint distribution forms an ellipse and an ellipsoid, respectively, in iso-density plots. In statistics, the normal distribution is used in classical multivariate analysis, while elliptical distributions are used in generalized multivariate analysis, for the study of symmetric distributions with tails that are heavy, like the multivariate t-distribution, or light (in comparison with the normal distribution).
