12 C.F.R. § 3.132
(a) Methodologies for collateral recognition.
(1) Instead of an LGD estimation methodology, a national bank or Federal savings association may use the following methodologies to recognize the benefits of financial collateral in mitigating the counterparty credit risk of repo-style transactions, eligible margin loans, collateralized OTC derivative contracts and single product netting sets of such transactions, and to recognize the benefits of any collateral in mitigating the counterparty credit risk of repo-style transactions that are included in a national bank's or Federal savings association's VaR-based measure under subpart F of this part:
(b) EAD for eligible margin loans and repo-style transactions—(1) General. A national bank or Federal savings association may recognize the credit risk mitigation benefits of financial collateral that secures an eligible margin loan, repo-style transaction, or single-product netting set of such transactions by factoring the collateral into its LGD estimates for the exposure. Alternatively, a national bank or Federal savings association may estimate an unsecured LGD for the exposure, as well as for any repo-style transaction that is included in the national bank's or Federal savings association's VaR-based measure under subpart F of this part, and determine the EAD of the exposure using:
(2) Collateral haircut approach—(i) EAD equation. A national bank or Federal savings association may determine EAD for an eligible margin loan, repo-style transaction, or netting set by setting EAD equal to max
{0, [(ΣE − ΣC) + Σ(Es × Hs) + Σ(Efx × Hfx)]},
where:
(ii) Standard supervisory haircuts.
(A) Under the standard supervisory haircuts approach:
(1) A national bank or Federal savings association must use the haircuts for market price volatility (Hs) in Table 1 to § 3.132, as adjusted in certain circumstances as provided in paragraphs (b)(2)(ii)(A)(3) and (4) of this section;
| Residual maturity | Haircut (in percent) assigned based on: | Investment grade securitization exposures(in percent) | |||||
|---|---|---|---|---|---|---|---|
| Sovereign issuers riskweight under § 3.32 2(in percent) | Non-sovereign issuers riskweight under § 3.32(in percent) | ||||||
| Zero | 20 or 50 | 100 | 20 | 50 | 100 | ||
| Less than or equal to 1 year | 0.5 | 1.0 | 15.0 | 1.0 | 2.0 | 4.0 | 4.0 |
| Greater than 1 year and less than or equal to 5 years | 2.0 | 3.0 | 15.0 | 4.0 | 6.0 | 8.0 | 12.0 |
| Greater than 5 years | 4.0 | 6.0 | 15.0 | 8.0 | 12.0 | 16.0 | 24.0 |
| Main index equities (including convertible bonds) and gold | 15.0 | ||||||
| Other publicly traded equities (including convertible bonds) | 25.0 | ||||||
| Mutual funds | Highest haircut applicable to any security in which the fund can invest. | ||||||
| Cash collateral held | Zero | ||||||
| Other exposure types | 25.0 | ||||||
| 1 The market price volatility haircuts in Table 1 to § 3.132 are based on a 10 business-day holding period. | |||||||
| 2 Includes a foreign PSE that receives a zero percent risk weight. |
(2) For currency mismatches, a national bank or Federal savings association must use a haircut for foreign exchange rate volatility (Hfx) of 8 percent, as adjusted in certain circumstances as provided in paragraphs (b)(2)(ii)(A)(3) and (4) of this section.
(3) For repo-style transactions and client-facing derivative transactions, a national bank or Federal savings association may multiply the supervisory haircuts provided in paragraphs (b)(2)(ii)(A)(1) and (2) of this section by the square root of 1/2 (which equals 0.707107). If the national bank or Federal savings association determines that a longer holding period is appropriate for client-facing derivative transactions, then it must use a larger scaling factor to adjust for the longer holding period pursuant to paragraph (b)(2)(ii)(A)(6) of this section.
(4) A national bank or Federal savings association must adjust the supervisory haircuts upward on the basis of a holding period longer than ten business days (for eligible margin loans) or five business days (for repo-style transactions), using the formula provided in paragraph (b)(2)(ii)(A)(6) of this section where the conditions in this paragraph (b)(2)(ii)(A)(4) apply. If the number of trades in a netting set exceeds 5,000 at any time during a quarter, a national bank or Federal savings association must adjust the supervisory haircuts upward on the basis of a minimum holding period of twenty business days for the following quarter (except when a national bank or Federal savings association is calculating EAD for a cleared transaction under § 3.133). If a netting set contains one or more trades involving illiquid collateral, a national bank or Federal savings association must adjust the supervisory haircuts upward on the basis of a minimum holding period of twenty business days. If over the two previous quarters more than two margin disputes on a netting set have occurred that lasted longer than the holding period, then the national bank or Federal savings association must adjust the supervisory haircuts upward for that netting set on the basis of a minimum holding period that is at least two times the minimum holding period for that netting set.
(5)(i) A national bank or Federal savings association must adjust the supervisory haircuts upward on the basis of a holding period longer than ten business days for collateral associated with derivative contracts (five business days for client-facing derivative contracts) using the formula provided in paragraph (b)(2)(ii)(A)(6) of this section where the conditions in this paragraph (b)(2)(ii)(A)(5)(i) apply. For collateral associated with a derivative contract that is within a netting set that is composed of more than 5,000 derivative contracts that are not cleared transactions, a national bank or Federal savings association must use a minimum holding period of twenty business days. If a netting set contains one or more trades involving illiquid collateral or a derivative contract that cannot be easily replaced, a national bank or Federal savings association must use a minimum holding period of twenty business days.
(ii) Notwithstanding paragraph (b)(2)(ii)(A)(1) or (3) or (b)(2)(ii)(A)(5)(i) of this section, for collateral associated with a derivative contract in a netting set under which more than two margin disputes that lasted longer than the holding period occurred during the previous two quarters, the minimum holding period is twice the amount provided under paragraph (b)(2)(ii)(A)(1) or (3) or (b)(2)(ii)(A)(5)(i) of this section.
(6) A national bank or Federal savings association must adjust the standard supervisory haircuts upward, pursuant to the adjustments provided in paragraphs (b)(2)(ii)(A)(3) through (5) of this section, using the following formula:

Where: TM equals a holding period of longer than 10 business days for eligible margin loans and derivative contracts other than client-facing derivative transactions or longer than 5 business days for repo-style transactions and client-facing derivative transactions; HS equals the standard supervisory haircut; and TS equals 10 business days for eligible margin loans and derivative contracts other than client-facing derivative transactions or 5 business days for repo-style transactions and client-facing derivative transactions.
(7) If the instrument a national bank or Federal savings association has lent, sold subject to repurchase, or posted as collateral does not meet the definition of financial collateral, the national bank or Federal savings association must use a 25.0 percent haircut for market price volatility (HS).
(iii) Own internal estimates for haircuts. With the prior written approval of the OCC, a national bank or Federal savings association may calculate haircuts (Hs and Hfx) using its own internal estimates of the volatilities of market prices and foreign exchange rates.
(A) To receive OCC approval to use its own internal estimates, a national bank or Federal savings association must satisfy the following minimum quantitative standards:
(1) A national bank or Federal savings association must use a 99th percentile one-tailed confidence interval.
(2) The minimum holding period for a repo-style transaction is five business days and for an eligible margin loan is ten business days except for transactions or netting sets for which paragraph (b)(2)(iii)(A)(3) of this section applies. When a national bank or Federal savings association calculates an own-estimates haircut on a TN-day holding period, which is different from the minimum holding period for the transaction type, the applicable haircut (HM) is calculated using the following square root of time formula:

(i) TM equals 5 for repo-style transactions and 10 for eligible margin loans;
(ii) TN equals the holding period used by the national bank or Federal savings association to derive HN; and
(iii) HN equals the haircut based on the holding period TN
(3) If the number of trades in a netting set exceeds 5,000 at any time during a quarter, a national bank or Federal savings association must calculate the haircut using a minimum holding period of twenty business days for the following quarter (except when a national bank or Federal savings association is calculating EAD for a cleared transaction under § 3.133). If a netting set contains one or more trades involving illiquid collateral or an OTC derivative that cannot be easily replaced, a national bank or Federal savings association must calculate the haircut using a minimum holding period of twenty business days. If over the two previous quarters more than two margin disputes on a netting set have occurred that lasted more than the holding period, then the national bank or Federal savings association must calculate the haircut for transactions in that netting set on the basis of a holding period that is at least two times the minimum holding period for that netting set.
(4) A national bank or Federal savings association is required to calculate its own internal estimates with inputs calibrated to historical data from a continuous 12-month period that reflects a period of significant financial stress appropriate to the security or category of securities.
(5) A national bank or Federal savings association must have policies and procedures that describe how it determines the period of significant financial stress used to calculate the national bank's or Federal savings association's own internal estimates for haircuts under this section and must be able to provide empirical support for the period used. The national bank or Federal savings association must obtain the prior approval of the OCC for, and notify the OCC if the national bank or Federal savings association makes any material changes to, these policies and procedures.
(6) Nothing in this section prevents the OCC from requiring a national bank or Federal savings association to use a different period of significant financial stress in the calculation of own internal estimates for haircuts.
(7) A national bank or Federal savings association must update its data sets and calculate haircuts no less frequently than quarterly and must also reassess data sets and haircuts whenever market prices change materially.
(B) With respect to debt securities that are investment grade, a national bank or Federal savings association may calculate haircuts for categories of securities. For a category of securities, the national bank or Federal savings association must calculate the haircut on the basis of internal volatility estimates for securities in that category that are representative of the securities in that category that the national bank or Federal savings association has lent, sold subject to repurchase, posted as collateral, borrowed, purchased subject to resale, or taken as collateral. In determining relevant categories, the national bank or Federal savings association must at a minimum take into account:
(1) The type of issuer of the security;
(2) The credit quality of the security;
(3) The maturity of the security; and
(4) The interest rate sensitivity of the security.
(3) Simple VaR methodology. With the prior written approval of the OCC, a national bank or Federal savings association may estimate EAD for a netting set using a VaR model that meets the requirements in paragraph (b)(3)(iii) of this section. In such event, the national bank or Federal savings association must set EAD equal to max {0, [(ΣE − ΣC) + PFE]}, where:
(2) Definitions. For purposes of this paragraph (c) of this section, the following definitions apply:
(iii) Hedging set means:
(3) Credit derivatives. Notwithstanding paragraphs (c)(1) and (c)(2) of this section:
(5) Exposure amount.
(6) Replacement cost of a netting set—(i) Netting set subject to a variation margin agreement under which the counterparty must post variation margin. The replacement cost of a netting set subject to a variation margin agreement, excluding a netting set that is subject to a variation margin agreement under which the counterparty is not required to post variation margin, is the greater of:
(ii) Netting sets not subject to a variation margin agreement under which the counterparty must post variation margin. The replacement cost of a netting set that is not subject to a variation margin agreement under which the counterparty must post variation margin to the national bank or Federal savings association is the greater of:
(7) Potential future exposure of a netting set. The potential future exposure of a netting set is the product of the PFE multiplier and the aggregated amount.
(i) PFE multiplier. The PFE multiplier is calculated according to the following formula:

Where: V is the sum of the fair values (after excluding any valuation adjustments) of the derivative contracts within the netting set; C is the sum of the net independent collateral amount and the variation margin amount applicable to the derivative contracts within the netting set; and A is the aggregated amount of the netting set.
(8) Hedging set amount—(i) Interest rate derivative contracts. To calculate the hedging set amount of an interest rate derivative contract hedging set, a national bank or Federal savings association may use either of the formulas provided in paragraphs (c)(8)(i)(A) and (B) of this section:
(A) Formula 1 is as follows:

(B) Formula 2 is as follows:
Hedging set amount = |AddOnTB1IR| + |AddOnTB2IR| + |AddOnTB3IR|.
Where in paragraphs (c)(8)(i)(A) and (B) of this section: AddOnTB1IR is the sum of the adjusted derivative contract amounts, as calculated under paragraph (c)(9) of this section, within the hedging set with an end date of less than one year from the present date; AddOnTB2IR is the sum of the adjusted derivative contract amounts, as calculated under paragraph (c)(9) of this section, within the hedging set with an end date of one to five years from the present date; and AddOnTB3IR is the sum of the adjusted derivative contract amounts, as calculated under paragraph (c)(9) of this section, within the hedging set with an end date of more than five years from the present date.
(iii) Credit derivative contracts and equity derivative contracts. The hedging set amount of a credit derivative contract hedging set or equity derivative contract hedging set within a netting set is calculated according to the following formula:

Where: k is each reference entity within the hedging set. K is the number of reference entities within the hedging set. AddOn(Refk) equals the sum of the adjusted derivative contract amounts, as determined under paragraph (c)(9) of this section, for all derivative contracts within the hedging set that reference reference entity k. ρk equals the applicable supervisory correlation factor, as provided in Table 3 to this section.
(iv) Commodity derivative contracts. The hedging set amount of a commodity derivative contract hedging set within a netting set is calculated according to the following formula:

Where: k is each commodity type within the hedging set. K is the number of commodity types within the hedging set. AddOn(Typek) equals the sum of the adjusted derivative contract amounts, as determined under paragraph (c)(9) of this section, for all derivative contracts within the hedging set that reference reference commodity type k. ρ equals the applicable supervisory correlation factor, as provided in Table 3 to this section.
(ii) Adjusted notional amount.
(A) (1) For an interest rate derivative contract or a credit derivative contract, the adjusted notional amount equals the product of the notional amount of the derivative contract, as measured in U.S. dollars using the exchange rate on the date of the calculation, and the supervisory duration, as calculated by the following formula:

Where: S is the number of business days from the present day until the start date of the derivative contract, or zero if the start date has already passed; and E is the number of business days from the present day until the end date of the derivative contract.
(2) For purposes of paragraph (c)(9)(ii)(A)(1) of this section:
(i) For an interest rate derivative contract or credit derivative contract that is a variable notional swap, the notional amount is equal to the time-weighted average of the contractual notional amounts of such a swap over the remaining life of the swap; and
(ii) For an interest rate derivative contract or a credit derivative contract that is a leveraged swap, in which the notional amount of all legs of the derivative contract are divided by a factor and all rates of the derivative contract are multiplied by the same factor, the notional amount is equal to the notional amount of an equivalent unleveraged swap.
(B) (1) For an exchange rate derivative contract, the adjusted notional amount is the notional amount of the non-U.S. denominated currency leg of the derivative contract, as measured in U.S. dollars using the exchange rate on the date of the calculation. If both legs of the exchange rate derivative contract are denominated in currencies other than U.S. dollars, the adjusted notional amount of the derivative contract is the largest leg of the derivative contract, as measured in U.S. dollars using the exchange rate on the date of the calculation.
(2) Notwithstanding paragraph (c)(9)(ii)(B)(1) of this section, for an exchange rate derivative contract with multiple exchanges of principal, the national bank or Federal savings association must set the adjusted notional amount of the derivative contract equal to the notional amount of the derivative contract multiplied by the number of exchanges of principal under the derivative contract.
(C) (1) For an equity derivative contract or a commodity derivative contract, the adjusted notional amount is the product of the fair value of one unit of the reference instrument underlying the derivative contract and the number of such units referenced by the derivative contract.
(2) Notwithstanding paragraph (c)(9)(ii)(C)(1) of this section, when calculating the adjusted notional amount for an equity derivative contract or a commodity derivative contract that is a volatility derivative contract, the national bank or Federal savings association must replace the unit price with the underlying volatility referenced by the volatility derivative contract and replace the number of units with the notional amount of the volatility derivative contract.
(iii) Supervisory delta adjustments.
(B) (1) For a derivative contract that is an option contract, the supervisory delta adjustment is determined by the following formulas, as applicable:

(2) As used in the formulas in Table 2 to this section:
(i) Φ is the standard normal cumulative distribution function;
(ii) P equals the current fair value of the instrument or risk factor, as applicable, underlying the option;
(iii) K equals the strike price of the option;
(iv) T equals the number of business days until the latest contractual exercise date of the option;
(v) λ equals zero for all derivative contracts except interest rate options for the currencies where interest rates have negative values. The same value of λ must be used for all interest rate options that are denominated in the same currency. To determine the value of λ for a given currency, a national bank or Federal savings association must find the lowest value L of P and K of all interest rate options in a given currency that the national bank or Federal savings association has with all counterparties. Then, λ is set according to this formula: λ = max{−L + 0.1%, 0}; and
(vi) σ equals the supervisory option volatility, as provided in Table 3 to of this section.
(C) (1) For a derivative contract that is a collateralized debt obligation tranche, the supervisory delta adjustment is determined by the following formula:

(2) As used in the formula in paragraph (c)(9)(iii)(C)(1) of this section:
(i) A is the attachment point, which equals the ratio of the notional amounts of all underlying exposures that are subordinated to the national bank's or Federal savings association's exposure to the total notional amount of all underlying exposures, expressed as a decimal value between zero and one; 30
(ii) D is the detachment point, which equals one minus the ratio of the notional amounts of all underlying exposures that are senior to the national bank's or Federal savings association's exposure to the total notional amount of all underlying exposures, expressed as a decimal value between zero and one; and
(iii) The resulting amount is designated with a positive sign if the collateralized debt obligation tranche was purchased by the national bank or Federal savings association and is designated with a negative sign if the collateralized debt obligation tranche was sold by the national bank or Federal savings association.
(iv) Maturity factor.
(A) (1) The maturity factor of a derivative contract that is subject to a variation margin agreement, excluding derivative contracts that are subject to a variation margin agreement under which the counterparty is not required to post variation margin, is determined by the following formula:

Where MPOR refers to the period from the most recent exchange of collateral covering a netting set of derivative contracts with a defaulting counterparty until the derivative contracts are closed out and the resulting market risk is re-hedged.
(2) Notwithstanding paragraph (c)(9)(iv)(A)(1) of this section:
(i) For a derivative contract that is not a client-facing derivative transaction, MPOR cannot be less than ten business days plus the periodicity of re-margining expressed in business days minus one business day;
(ii) For a derivative contract that is a client-facing derivative transaction, MPOR cannot be less than five business days plus the periodicity of re-margining expressed in business days minus one business day; and
(iii) For a derivative contract that is within a netting set that is composed of more than 5,000 derivative contracts that are not cleared transactions, or a netting set that contains one or more trades involving illiquid collateral or a derivative contract that cannot be easily replaced, MPOR cannot be less than twenty business days.
(3) Notwithstanding paragraphs (c)(9)(iv)(A)(1) and (2) of this section, for a netting set subject to more than two outstanding disputes over margin that lasted longer than the MPOR over the previous two quarters, the applicable floor is twice the amount provided in paragraphs (c)(9)(iv)(A)(1) and (2) of this section.
(B) The maturity factor of a derivative contract that is not subject to a variation margin agreement, or derivative contracts under which the counterparty is not required to post variation margin, is determined by the following formula:

Where M equals the greater of 10 business days and the remaining maturity of the contract, as measured in business days.
(v) Derivative contract as multiple effective derivative contracts. A national bank or Federal savings association must separate a derivative contract into separate derivative contracts, according to the following rules:
(10) Multiple netting sets subject to a single variation margin agreement—(i) Calculating replacement cost. Notwithstanding paragraph (c)(6) of this section, a national bank or Federal savings association shall assign a single replacement cost to multiple netting sets that are subject to a single variation margin agreement under which the counterparty must post variation margin, calculated according to the following formula:
Replacement Cost = max{ΣNS max{VNS; 0} − max{CMA; 0}; 0} + max{ΣNS min{VNS; 0} − min{CMA; 0}; 0}
Where: NS is each netting set subject to the variation margin agreement MA. VNS is the sum of the fair values (after excluding any valuation adjustments) of the derivative contracts within the netting set NS. CMA is the sum of the net independent collateral amount and the variation margin amount applicable to the derivative contracts within the netting sets subject to the single variation margin agreement.
(ii) Calculating potential future exposure.
(B) For purposes of paragraph (c)(11)(ii)(A) of this section, the netting set must be divided into sub-netting sets as follows:
(1) All derivative contracts within the netting set that are not subject to a variation margin agreement or that are subject to a variation margin agreement under which the counterparty is not required to post variation margin form a single sub-netting set. The aggregated amount for this sub-netting set is calculated as if the netting set is not subject to a variation margin agreement.
(2) All derivative contracts within the netting set that are subject to variation margin agreements in which the counterparty must post variation margin and that share the same value of the MPOR form a single sub-netting set. The aggregated amount for this sub-netting set is calculated as if the netting set is subject to a variation margin agreement, using the MPOR value shared by the derivative contracts within the netting set.
| Asset class | Category | Type | Supervisoryoptionvolatility(percent) | Supervisorycorrelationfactor(percent) | Supervisoryfactor 1(percent) |
|---|---|---|---|---|---|
| Interest rate | N/A | N/A | 50 | N/A | 0.50 |
| Exchange rate | N/A | N/A | 15 | N/A | 4.0 |
| Credit, single name | Investment grade | N/A | 100 | 50 | 0.46 |
| Speculative grade | N/A | 100 | 50 | 1.3 | |
| Sub-speculative grade | N/A | 100 | 50 | 6.0 | |
| Credit, index | Investment Grade | N/A | 80 | 80 | 0.38 |
| Speculative Grade | N/A | 80 | 80 | 1.06 | |
| Equity, single name | N/A | N/A | 120 | 50 | 32 |
| Equity, index | N/A | N/A | 75 | 80 | 20 |
| Commodity | Energy | Electricity | 150 | 40 | 40 |
| Other | 70 | 40 | 18 | ||
| Metals | N/A | 70 | 40 | 18 | |
| Agricultural | N/A | 70 | 40 | 18 | |
| Other | N/A | 70 | 40 | 18 | |
| 1 The applicable supervisory factor for basis derivative contract hedging sets is equal to one-half of the supervisory factor provided in this Table 3, and the applicable supervisory factor for volatility derivative contract hedging sets is equal to 5 times the supervisory factor provided in this Table 3. |
(1)
(iii) A national bank or Federal savings association may also use the internal models methodology for derivative contracts, eligible margin loans, and repo-style transactions subject to a qualifying cross-product netting agreement if:
(2) Risk-weighted assets using IMM. Under the IMM, a national bank or Federal savings association uses an internal model to estimate the expected exposure (EE) for a netting set and then calculates EAD based on that EE. A national bank or Federal savings association must calculate two EEs and two EADs (one stressed and one unstressed) for each netting set as follows:
(iv) Under the internal models methodology, EAD = Max (0, α × effective EPE − CVA), or, subject to the prior written approval of OCC as provided in paragraph (d)(10) of this section, a more conservative measure of EAD.
(A) CVA equals the credit valuation adjustment that the national bank or Federal savings association has recognized in its balance sheet valuation of any OTC derivative contracts in the netting set. For purposes of this paragraph (d), CVA does not include any adjustments to common equity tier 1 capital attributable to changes in the fair value of the national bank's or Federal savings association's liabilities that are due to changes in its own credit risk since the inception of the transaction with the counterparty.

(3) Prior approval relating to EAD calculation. To obtain OCC approval to calculate the distributions of exposures upon which the EAD calculation is based, the national bank or Federal savings association must demonstrate to the satisfaction of the OCC that it has been using for at least one year an internal model that broadly meets the following minimum standards, with which the national bank or Federal savings association must maintain compliance:
(4) Calculating the maturity of exposures.
(i) If the remaining maturity of the exposure or the longest-dated contract in the netting set is greater than one year, the national bank or Federal savings association must set M for the exposure or netting set equal to the lower of five years or M(EPE), where:

(5) Effects of collateral agreements on EAD. A national bank or Federal savings association may capture the effect on EAD of a collateral agreement that requires receipt of collateral when exposure to the counterparty increases, but may not capture the effect on EAD of a collateral agreement that requires receipt of collateral when counterparty credit quality deteriorates. Two methods are available to capture the effect of a collateral agreement, as set forth in paragraphs (d)(5)(i) and (ii) of this section:
(ii) As an alternative to paragraph (d)(5)(i) of this section, a national bank or Federal savings association that can model EPE without collateral agreements but cannot achieve the higher level of modeling sophistication to model EPE with collateral agreements can set effective EPE for a collateralized netting set equal to the lesser of:
(A) An add-on that reflects the potential increase in exposure of the netting set over the margin period of risk, plus the larger of:
(1) The current exposure of the netting set reflecting all collateral held or posted by the national bank or Federal savings association excluding any collateral called or in dispute; or
(2) The largest net exposure including all collateral held or posted under the margin agreement that would not trigger a collateral call. For purposes of this section, the add-on is computed as the expected increase in the netting set's exposure over the margin period of risk (set in accordance with paragraph (d)(5)(iii) of this section); or
(iii) For purposes of this part, including paragraphs (d)(5)(i) and (ii) of this section, the margin period of risk for a netting set subject to a collateral agreement is:
(6) Own estimate of alpha. With prior written approval of the OCC, a national bank or Federal savings association may calculate alpha as the ratio of economic capital from a full simulation of counterparty exposure across counterparties that incorporates a joint simulation of market and credit risk factors (numerator) and economic capital based on EPE (denominator), subject to a floor of 1.2. For purposes of this calculation, economic capital is the unexpected losses for all counterparty credit risks measured at a 99.9 percent confidence level over a one-year horizon. To receive approval, the national bank or Federal savings association must meet the following minimum standards to the satisfaction of the OCC:
(i) The national bank's or Federal savings association's own estimate of alpha must capture in the numerator the effects of:
(7) Risk-based capital requirements for transactions with specific wrong-way risk. A national bank or Federal savings association must determine if a repo-style transaction, eligible margin loan, bond option, or equity derivative contract or purchased credit derivative to which the national bank or Federal savings association applies the internal models methodology under this paragraph (d) has specific wrong-way risk. If a transaction has specific wrong-way risk, the national bank or Federal savings association must treat the transaction as its own netting set and exclude it from the model described in § 3.132(d)(2) and instead calculate the risk-based capital requirement for the transaction as follows:
(i) For an equity derivative contract, by multiplying:
(ii) For a purchased credit derivative by multiplying:
(iii) For a bond option, by multiplying:
(iv) For a repo-style transaction or eligible margin loan by multiplying:
(9) Risk-weighted assets for IMM exposures.
(10) Other measures of counterparty exposure.
(i) With prior written approval of the OCC, a national bank or Federal savings association may set EAD equal to a measure of counterparty credit risk exposure, such as peak EAD, that is more conservative than an alpha of 1.4 times the larger of EPEunstressed and EPEstressed for every counterparty whose EAD will be measured under the alternative measure of counterparty exposure. The national bank or Federal savings association must demonstrate the conservatism of the measure of counterparty credit risk exposure used for EAD. With respect to paragraph (d)(10)(i) of this section:
(2) Market risk national banks or Federal savings associations. Notwithstanding the prior approval requirement in paragraph (e)(1) of this section, a market risk national bank or Federal savings association may calculate its CVA risk-weighted asset amount using the advanced CVA approach if the national bank or Federal savings association has OCC approval to:
(3) Recognition of hedges.
(5) Simple CVA approach.
(i) Under the simple CVA approach, the CVA capital requirement, KCVA, is calculated according to the following formula:

(ii) The national bank or Federal savings association may treat the notional amount of the index attributable to a counterparty as a single name hedge of counterparty i (Bi,) when calculating KCVA, and subtract the notional amount of Bi from the notional amount of the CDSind. A national bank or Federal savings association must treat the CDSind hedge with the notional amount reduced by Bi as a CVA hedge.
| Internal PD(in percent) | Weight w i(in percent) |
|---|---|
| 0.00-0.07 | 0.70 |
| >0.070-0.15 | 0.80 |
| >0.15-0.40 | 1.00 |
| >0.40-2.00 | 2.00 |
| >2.00-6.00 | 3.00 |
| >6.00 | 10.00 |
(6) Advanced CVA approach.
(i) A national bank or Federal savings association may use the VaR model that it uses to determine specific risk under § 3.207(b) or another VaR model that meets the quantitative requirements of §§ 3.205(b) and 3.207(b)(1) to calculate its CVA capital requirement for a counterparty by modeling the impact of changes in the counterparties' credit spreads, together with any recognized CVA hedges, on the CVA for the counterparties, subject to the following requirements:
(ii) Under the advanced CVA approach, the CVA capital requirement, KCVA, is calculated according to the following formulas:

Where
(iii) Notwithstanding paragraphs (e)(6)(i) and (e)(6)(ii) of this section, a national bank or Federal savings association must use the formulas in paragraphs (e)(6)(iii)(A) or (e)(6)(iii)(B) of this section to calculate credit spread sensitivities if its VaR model is not based on full repricing.
(A) If the VaR model is based on credit spread sensitivities for specific tenors, the national bank or Federal savings association must calculate each credit spread sensitivity according to the following formula:

(iv) To calculate the CVAUnstressed measure for purposes of paragraph (e)(6)(ii) of this section, the national bank or Federal savings association must:
(v) To calculate the CVAStressed measure for purposes of paragraph (e)(6)(ii) of this section, the national bank or Federal savings association must:
(vi) If a national bank or Federal savings association captures the effect of a collateral agreement on EAD using the method described in paragraph (d)(5)(ii) of this section, for purposes of paragraph (e)(6)(ii) of this section, the national bank or Federal savings association must calculate EEi using the method in paragraph (d)(5)(ii) of this section and keep that EE constant with the maturity equal to the maximum of:
(viii) If a national bank or Federal savings association uses the standardized approach for counterparty credit risk pursuant to paragraph (c) of this section to calculate the EAD for any immaterial portfolios of OTC derivative contracts, the national bank or Federal savings association must use that EAD as a constant EE in the formula for the calculation of CVA with the maturity equal to the maximum of:
30 In the case of a first-to-default credit derivative, there are no underlying exposures that are subordinated to the national bank's or Federal savings association's exposure. In the case of a second-or-subsequent-to-default credit derivative, the smallest (n−1) notional amounts of the underlying exposures are subordinated to the national bank's or Federal savings association's exposure.
[78 FR 62157, 62273, Oct. 11, 2013, as amended at 80 FR 41417, July 15, 2015; 85 FR 4405, Jan. 24, 2020; 85 FR 57959, Sept. 17, 2020; 86 FR 731, Jan. 6, 2021]