1 / 46

The Pricing of Bull and Bear Floating Rate Notes: An Application of Financial Engineering Donald J. Smith

The Pricing of Bull and Bear Floating Rate Notes: An Application of Financial Engineering Donald J. Smith. 財金所 碩一 蔡佩伶 林瑋莉 洪婉瑜. Agenda. Definition of bull & bear FRN Equilibrium pricing on bull & bear FRN without constraint

gerik
Télécharger la présentation

The Pricing of Bull and Bear Floating Rate Notes: An Application of Financial Engineering Donald J. Smith

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. The Pricing of Bull and Bear Floating Rate Notes: An Application of Financial EngineeringDonald J. Smith 財金所 碩一 蔡佩伶 林瑋莉 洪婉瑜

  2. Agenda • Definition of bull & bear FRN • Equilibrium pricing on bull & bear FRN without constraint • Equilibrium pricing on bull & bear FRN with constraint • The pricing sensitivity of bull & bear floaters • Market condition • Example:Far Eastern Textile Bull-Bear notes

  3. PART 1 Definition of Bull & Bear FRN

  4. Definition of Bull & Bear FRN • Traditional FRN • C = LIBOR + 0.25% • Bull floaters(inverse floaters or yield curve notes) • C = 17.2% - LIBOR •  coupon rate as the market rate ( bond price ) •  attract investor who is “bullish” on bond price • Bear floaters • C = 2 LIBOR - 9.12% •  coupon rate as the market rate ( bond price ) •  attract investor who is “bearish” on bond price

  5. Definition of Bull & Bear FRN • General expression for the coupon reset formula on an FRN: • C = A R + B • ( C >= 0 non-negativity constraint ) • C: periodic coupon rate • R: variable reference rate (ex:LIBOR) • A is characteristic parameter which determines the type of the note. • How to determine B ?

  6. Definition of Bull & Bear FRN C = AR + B fixed rate note traditional FRN • 01 • bull floaterquasi-fixedbear floater • (17.2% - LIBOR) (0.5LIBOR+5%) (2LIBOR – 9.12%) • Fixed rate note: C=F A=0 , B=F • Traditional FRN: C=R+M A=1 , B=M A

  7. PART 2 Pricing on Bull & Bear FRNwithout Constraint

  8. Pricing on Bull & Bear FRN without Constraint --- Example 1 fixed rate note 10% (F) Firm Issuer Investor or LIBOR+0.25% (R+M) 9.75% (F-M) LIBOR (R) traditional FRN Interest rate swap Counterpart No arbitrage!!

  9. Pricing on Bull & Bear FRN without Constraint --- Example 1 • If the firm considers issuing a bull floater with C=X-LIBOR how to determine the break-even XB such that if X<XB , a cost saving is achieved? X-LIBOR Investor Firm Issuer 9.75% LIBOR COF = (XB - LIBOR) + (LIBOR - 9.75%) = 10% (F)  XB= 19.75% Counterpart

  10. Pricing on Bull & Bear FRN without Constraint --- Example 2 • If the firm considers issuing a bear floater with C=2*LIBOR-Y, how to determine the break-even YB such that if Y>YB, a cost saving is achieved? Firm Issuer 2 LIBOR - Y Investor LIBOR 9.75% COF = (2 LIBOR -YB) + 2(9.75% - LIBOR) = 10% (F)  YB= 9.5% Counterpart

  11. Pricing on Bull & Bear FRN without Constraint --- Generalized Floater coupon SWAP COF = AR + Bu+ A [ ( F – M ) - R] = Bu +A [ ( F – M )] Equilibrium condition : COF = F Bu = (1-A) F + AM for any A bull ex : A= -1Bu = 2 F - M = 2*10% - 0.25% = 19.75% bear ex : A= 2  Bu = (-1) F + 2M = (-10%) +2*0.25% = -9.5%

  12. Pricing on Bull & Bear FRN without Constraint Problem: • In example 1, the bull floater : C=19.75% - LIBOR What if LIBOR > 19.75% ?  COF = Max [0, (19.75% - LIBOR)] + (LIBOR - 9.75%) > 10% • In example 2, the bear floater : C= 2 LIBOR – 9.5% What if LIBOR < 4.75% ?  COF = Max [0, ( 2 LIBOR – 9.5%)] + 2 (9.75% - LIBOR) >10% C >= 0 --- the non-negativity constraint !!

  13. PART 3 Pricing on Bull & Bear FRNwith Constraint

  14. Bull Floating Rate Noteswith Constraint Section 1

  15. Problem Solution Sol Diagram Pricing of Restricted Floater Bull FRN with Constraint CF ( - ) 10% LIBOR 9.75% 19.75% ( + ) Problem: causing from SWAP If LIBOR>19.75%, the issuer can’t lock the cost of fund at 10%

  16. Problem Solution Sol Diagram Pricing of Restricted Floater • CAPCALL option on the RATE • PUT option on the PRICE • Cost of CAP(S, X, T, r, σ) 5-year semiannual settlement on 6-mon LIBOR X = 19.5% Premium = 96 b.p. 25 b.p.(per year) Bull FRN with Constraint SOLUTION To buy a INTEREST CAP

  17. Problem Solution Sol Diagram Pricing of Restricted Floater Bull FRN with Constraint COF FRN Max(0,19.5% - LIBOR) Swap LIBOR - 9.75% F = 10% CAP & its cost - Max(0,LIBOR-19.5%) + 0.25%

  18. Problem Solution Sol Diagram Pricing of Restricted Floater CF CF 9.75% LIBOR LIBOR 0.25% 0 19.5% 19.5% Buying a CAP Bull Floater + SWAP CF 10% LIBOR 0 Bull FRN with Constraint Cost of CAP ( - ) ( - ) ( + ) ( + ) ( - ) ( + )

  19. Problem Solution Sol Diagram Pricing of Restricted Floater • C = AR + Br • Bull Floater A < 0 • Cap • Payoff on Cap = Max(0, R-X) • C = AR + Br > 0 X = - Br/A • Zcap(- Br/A): amortized costs of a cap • ( ~premium of a call option ) Bull FRN with Constraint

  20. Problem Solution Sol Diagram Pricing of Restricted Floater • COF • = Max(0, AR + Br) Floater(1) + A [ ( F -M ) - R] SWAP(2) - A [ Z cap ( - Br/ A ) ] Cost of CAP(3) + A Max [ 0 , R - ( - Br/ A) ] CAP(4) • Simplification Procedure • R  - Br/ A(4) is 0 and (1) is AR + Br • R > - Br/ A(4) is AR + Br and (1) is 0 Bull FRN with Constraint COF = AR + Br + A [ ( F - M ) - R]- A [ Z cap ( - Br/ A ) ] (1) + (4) (2) (3)

  21. Problem Solution Sol Diagram Pricing of Restricted Floater Bull FRN with Constraint • COF • = AR + Br + A [(F -M) - R] - A [Z cap ( - Br/ A )] • = F if A< 0, Br = (1 - A) F + AM + A [ Z cap (- Br/ A ) ]

  22. Bear Floating Rate Noteswith Constraint Section 2

  23. Problem Solution Sol Diagram Pricing of Restricted Floater Bear FRN with Constraint ( - ) CF 10% LIBOR 9.75% 4.75% ( + ) Problem: causing from SWAP If LIBOR < 4.75%, the issuer can’t lock the cost of fund at 10%

  24. Problem Solution Sol Diagram Pricing of Restricted Floater • FLOORPUT option on the RATE • CALL option on the PRICE • Cost of FLOOR(S, X, T, r, σ) 5-year semiannual settlement on 6-mon LIBOR X = 5.25% Premium = 193 b.p. 50 b.p.(per year) Bear FRN with Constraint SOLUTION To buy a INTEREST FLOOR

  25. Problem Solution Sol Diagram Pricing of Restricted Floater Bear FRN with Constraint COF FRN Max(0, 2*LIBOR-10.5%) 2 Swaps 2*(9.75% - LIBOR) F = 10% 2 (FLOOR & its cost) - 2*Max(0, 5.25%-LIBOR) + 2*(0.5%)

  26. Problem Solution Sol Diagram Pricing of Restricted Floater CF CF 9% 1% LIBOR LIBOR 0 5.25% 5.25% Bear FRN + 2SWAP Buying two Floor CF 10% LIBOR 0 Bear FRN with Constraint ( - ) ( - ) Cost of Floor ( + ) ( + ) ( - ) ( + )

  27. Problem Solution Sol Diagram Pricing of Restricted Floater • C = AR + Br • Bear Floater A > 1 • Floor • Payoff on Floor = Max(0, X-R) • C = AR + Br > 0 X = - Br/A • Zfloor(- Br/A): amortized costs of a floor • ( ~premium of a put option ) Bear FRN with Constraint

  28. Problem Solution Sol Diagram Pricing of Restricted Floater • COF • = Max(0, AR + Br) Floater(1) + A [ ( F -M ) - R] SWAP(2) + A [ Z floor ( - Br/ A ) ] Cost of Flo(3) - A Max [ 0 , ( - Br/ A) - R ] FLOOR(4) • Simplification Procedure • R  - Br/ A(4) is AR + Br and (1) is 0 • R > - Br/ A(4) is 0 and (1) is AR + Br Bear FRN with Constraint COF = AR + Br + A [ ( F – M ) - R]+ A [ Z floor ( - Br/ A ) ] (2) (3) (1) + (4)

  29. Problem Solution Sol Diagram Pricing of Restricted Floater Bull FRN with Constraint • COF • = AR + Br + A [(F -M) - R] + A [Z floor( - Br/ A )] • = F if A > 1, Br = (1 - A) F + AM - A [ Z floor(- Br/ A ) ]

  30. Generalized Pricing ofBull & Bear Floater Section 3

  31. Generalized Equilibrium Pricing • if A < 0 Bull Floater Br = ( 1- A ) F + AM + A [ Z cap ( - Br/ A ) ] • if A > 1 Bear Floater Br = ( 1 – A ) F + AM - A [ Z floor ( - Br/ A ) ] replicated portfolio

  32. PART 4 The Pricing Sensitivity of Bull & Bear Floaters

  33. Pricing Sensitivity of Fixed Rate Notes Price 115 110 103.24 105 Traditional fixed rate note at 10%: • Market rate & price are • NEGATIVELY related 100.00 100 95 96.89 90 8% 9%10%11% 12% Market fixed rates for four years to maturity

  34. Pricing Sensitivity of Traditional FRN Price 115 Traditional FRN at LIBOR+0.25%:  Coupon rate in line with market yield  Price is near PAR  LESS price sensitive 110 105 FRN 100 95 Fixed 90 8% 9% 10% 11% 12% Market fixed rates for four years to maturity

  35. Pricing sensitivity of Bull Floater Price Bull floater at 19.5-LIBOR: F to 11% • Future coupon , DR • MORE price sensitive • New bull floater: • 21.5% - LIBOR • Opportunity loss of about 200bp 115 110 105 FRN 100 96.89 100 Fixed 95 93.67 Bull 90 8% 9% 10%  11% 12% Market fixed rates for four years to maturity formula for Br

  36. Pricing sensitivity of BearFloater Bear floater at 2*LIBOR-10.5%: F to 11% • Future coupon , DR • ΔDR < Δfuture coupon • Market rate & price are POSITIVELY related • New bear floater: • 2*LIBOR - 11.5% • Opportunity gain of about 100bp Price Bear 115 103.17 110 105 FRN 100 100 95 Fixed Bull 90 8% 9% 10%  11% 12% Market fixed rates for four years to maturity formula for Br

  37. Implied Duration NEGATIVE Duration Price Bear floater at 2*LIBOR-10.5% 115 110 D = the time until the next reset date Traditional FRN at LIBOR+0.25% 105 100 Traditional fixed rate note at 10% 95 LONGER duration than fixed rate notes 90 Bull floater at 19.5-LIBOR 8% 9% 10% 11% 12% Market fixed rates for four years to maturity

  38. Duration of Replicated Portfolio • Coupon reset formula: Cr = AR+Br formula for Br = A [R+M+Zcap]+(1-A)Fif A<0 A [R+M]+(1-A)Fif 0<A<1 A [R+M+Zfloor]+(1-A)Fif A>1 Bull Quasi Bear • Cr :portfolio of capped / floored floaters & fixed rate notes • Cr>0: Bull:Max(Cr) = -F(1-A) / A • Bear:Min(Cr) = -F(1-A) / A • Dbull/bear= ADcap/floor + (1-A)Dfixed

  39. PART 5 Market Condition

  40. Trend of LIBOR 1 yr:7.5% 1 yr:3.7% Redemption rage of bond fund Recession 1 yr:1.0%

  41. PART 6 Example: Far Eastern Textile Bull-Bear Notes

  42. Terms COF Diagram Historical coupon Example: Far Eastern Textile Bear Floater Bond Max(0, 7.5% + (R - 6.9%) ) Bull Floater Bond Max(0, 7.5%+ (6.9% - R) Cater to investors’ different needs for floaters CAP R<14.4% Floor R>14.4% Cater to Far Eastern’s need for fixed rate debts Lock at 15%

  43. Example: Far Eastern Textile CF • Terms • COF Diagram • Historical coupon CF 14.40% LIBOR 0.6% LIBOR 0 0 14.40% 14.40% Max(0, 14.40%-R)+Cap Max(0, R+0.6%)+Floor CF 15% LIBOR 0

  44. Example: Far Eastern Textile • Terms • COF Diagram • Historical coupon Bull Bear Bull Bear Reference Rate

  45. Equilibrium pricing condition of Bull & Bear floaters: Implicit rate on synthetic structure equals the explicit alternative Bull:more sensitive to market rate than fixed rate higher interest risk Bear:price positively related to market rates negative duration Conclusions Notice the role bull & bear floaters play in interest rate risk management

  46. Thanks for Your Attention

More Related