The present work aims at implementing a quantitative model to articulate the banking risk appetite framework (RAF). The research hopes to achieve two main objectives: (1) to build up the risk appetite statement (RAS) as a static ‘picture’ of the banks’ risk profile; and (2) to develop a quantitative approach with which to implement the RAF. First, the authors calculated eight indicators describing the consumption of the banks’ capital by the three risks stated in Pillar I of the Basel II accord. They then assumed that the variables would follow a standardised Student’s t-distribution; they found the 99th and the 95th percentile of the distribution as the risk tolerance (RT) and risk limit (RL) levels, respectively. The authors attained the second objective by analysing the variables defined in the first step with a multiple linear regression (OLS). The main outcomes confirm that the model allows for the generalising of the relation among risks, in terms of capital consumption. The work contributes by enlarging the academic literature about banking risk management; it also contributes by tackling the shortage of regulatory rules. Moreover it offers external analysts and regulators a standardised technical instrument with which to analyse the banks’ risk appetite profiles.
A quantitative model to articulate the banking risk appetite framework
BALDAN, CINZIA;GERETTO, ENRICO;ZEN, FRANCESCO
2016
Abstract
The present work aims at implementing a quantitative model to articulate the banking risk appetite framework (RAF). The research hopes to achieve two main objectives: (1) to build up the risk appetite statement (RAS) as a static ‘picture’ of the banks’ risk profile; and (2) to develop a quantitative approach with which to implement the RAF. First, the authors calculated eight indicators describing the consumption of the banks’ capital by the three risks stated in Pillar I of the Basel II accord. They then assumed that the variables would follow a standardised Student’s t-distribution; they found the 99th and the 95th percentile of the distribution as the risk tolerance (RT) and risk limit (RL) levels, respectively. The authors attained the second objective by analysing the variables defined in the first step with a multiple linear regression (OLS). The main outcomes confirm that the model allows for the generalising of the relation among risks, in terms of capital consumption. The work contributes by enlarging the academic literature about banking risk management; it also contributes by tackling the shortage of regulatory rules. Moreover it offers external analysts and regulators a standardised technical instrument with which to analyse the banks’ risk appetite profiles.Pubblicazioni consigliate
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.