词条 | Advanced measurement approach |
释义 |
Advanced measurement approaches (AMA) is one of three possible operational risk methods that can be used under Basel II by a bank or other financial institution. The other two are the Basic Indicator Approach and the Standardised Approach. The methods (or approaches) increase in sophistication and risk sensitivity with AMA being the most advanced of the three. Under AMA the banks are allowed to develop their own empirical model to quantify required capital for operational risk. Banks can use this approach only subject to approval from their local regulators. Once a bank has been approved to adopt AMA, it cannot revert to a simpler approach without supervisory approval. Also, according to section 664 of original Basel Accord, in order to qualify for use of the AMA a bank must satisfy its supervisor that, at a minimum:
The four data elementsAccording to the BCBS Supervisory Guidelines, an AMA framework must include the use of four data elements: (i) Internal loss data (ILD), (ii) External data (ED), (iii) Scenario analysis (SBA), and (iv) Business environment and internal control factors (BEICFs). Loss distribution approachWhile AMA does not specify the use of any particular modeling technique, one common approach taken in the banking industry is the loss distribution approach (LDA). With LDA, a bank first segments operational losses into homogeneous segments, called units of measure (UoMs). For each unit of measure, the bank then constructs a loss distribution that represents its expectation of total losses that can materialize in a one-year horizon. Given that data sufficiency is a major challenge for the industry, annual loss distribution cannot be built directly using annual loss figures. Instead, a bank will develop a frequency distribution that describes the number of loss events in a given year, and a severity distribution that describes the loss amount of a single loss event. The frequency and severity distributions are assumed to be independent. The convolution of these two distributions then give rise to the (annual) loss distribution.[1][2][3] See also
References1. ^{{cite journal |last1 = Frachot |first1 = A. |last2 = Georges |first2 = P. |last3 = Roncalli |first3 = T. |title = Loss Distribution Approach for Operational Risk |year = 2001 |journal = GRO, Crédit Lyonnais |doi=10.2139/ssrn.1032523|citeseerx = 10.1.1.636.8805 }} 2. ^{{cite journal |last1 = Guégan |first1 = D. |last2 = Hassani |first2 = B.K. |title = Operational risk: A Basel II++ step before Basel III |year = 2012 |journal = Journal of Risk Management in Financial Institutions |volume = 6 |pages = 37–53 |url = http://www.henrystewartpublications.com/jrm/v6}} 3. ^{{cite journal |last1 = Guégan |first1 = D. |last2 = Hassani |first2 = B.K. |title = Using a time series approach to correct serial correlation in Operational Risk capital calculation |year = 2013 |journal = Journal of Operational Risk |volume = 8 |issue = 3 |pages = 31–56 |url = http://www.risk.net/journal-of-operational-risk/journal/2292369/latest-issue-volume-8-number-3-fall-2013|doi = 10.21314/JOP.2013.126 }}
1 : Basel II |
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