consistent pricing of vix derivatives and spx options with the heston++ model
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IntroductionOur approach
Empirical investigationConclusions
Consistent Pricing of VIX Derivativesand SPX Options
with the Heston++ model
G. Pompa1 C. Pacati2 R. Renò2
1IMT Institute for Advanced Studies Lucca, Italy
2Dipartimento di Economia Politica e StatisticaUniversità di Siena, Italy
XVI Workshop on Quantitative Finance, Parma 2015
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
Outline1 Introduction
The problemVIX & Co.Standard approaches
2 Our approachThe basic Heston++ modelMultifactor ++ extensionsSPX Vanilla pricingVIX index modelingVIX Futures and Options pricing
3 Empirical investigationDataSPX Vanilla + VIX Futures calibrationVIX options pricing out-of-sample
4 Conclusions
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The problemVIX & Co.Standard approaches
The problem
The growing demand for trading volatility and managingvolatility risk has lead today to a liquid market for derivatives onrealized variance, such as VIX options and VIX futures. Theseare derivatives written on S&P500 volatility index (VIX):
there is need of a pricing framework for consistent pricingboth equity derivatives and volatility derivatives;since SPX and VIX derivatives both provide informationson the same volatility process, a model which is able toprice one market, but not the other, is inherentlymisspecified;if a model is misspecified, inferred dynamics andrisk-premia are unreliable.
we tackle the problem of jointly fit the IV surface of SPX indexoptions, together with the term structure of VIX futures.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The problemVIX & Co.Standard approaches
The problem
The growing demand for trading volatility and managingvolatility risk has lead today to a liquid market for derivatives onrealized variance, such as VIX options and VIX futures. Theseare derivatives written on S&P500 volatility index (VIX):
there is need of a pricing framework for consistent pricingboth equity derivatives and volatility derivatives;since SPX and VIX derivatives both provide informationson the same volatility process, a model which is able toprice one market, but not the other, is inherentlymisspecified;if a model is misspecified, inferred dynamics andrisk-premia are unreliable.
we tackle the problem of jointly fit the IV surface of SPX indexoptions, together with the term structure of VIX futures.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The problemVIX & Co.Standard approaches
The problem
The growing demand for trading volatility and managingvolatility risk has lead today to a liquid market for derivatives onrealized variance, such as VIX options and VIX futures. Theseare derivatives written on S&P500 volatility index (VIX):
there is need of a pricing framework for consistent pricingboth equity derivatives and volatility derivatives;since SPX and VIX derivatives both provide informationson the same volatility process, a model which is able toprice one market, but not the other, is inherentlymisspecified;if a model is misspecified, inferred dynamics andrisk-premia are unreliable.
we tackle the problem of jointly fit the IV surface of SPX indexoptions, together with the term structure of VIX futures.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The problemVIX & Co.Standard approaches
The problem
The growing demand for trading volatility and managingvolatility risk has lead today to a liquid market for derivatives onrealized variance, such as VIX options and VIX futures. Theseare derivatives written on S&P500 volatility index (VIX):
there is need of a pricing framework for consistent pricingboth equity derivatives and volatility derivatives;since SPX and VIX derivatives both provide informationson the same volatility process, a model which is able toprice one market, but not the other, is inherentlymisspecified;if a model is misspecified, inferred dynamics andrisk-premia are unreliable.
we tackle the problem of jointly fit the IV surface of SPX indexoptions, together with the term structure of VIX futures.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The problemVIX & Co.Standard approaches
The problem
The growing demand for trading volatility and managingvolatility risk has lead today to a liquid market for derivatives onrealized variance, such as VIX options and VIX futures. Theseare derivatives written on S&P500 volatility index (VIX):
there is need of a pricing framework for consistent pricingboth equity derivatives and volatility derivatives;since SPX and VIX derivatives both provide informationson the same volatility process, a model which is able toprice one market, but not the other, is inherentlymisspecified;if a model is misspecified, inferred dynamics andrisk-premia are unreliable.
we tackle the problem of jointly fit the IV surface of SPX indexoptions, together with the term structure of VIX futures.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The problemVIX & Co.Standard approaches
VIX: stylized facts
Introduced in 1993, the VIX quotation is computed by CBOE asa model-free replication of the S&P500 realized volatility overthe following 30 days (CBOE VIX white paper, 2003):
Leverage effect: inverse relationship SPX-VIX
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The problemVIX & Co.Standard approaches
VIX: stylized facts
Introduced in 1993, the VIX quotation is computed by CBOE asa model-free replication of the S&P500 realized volatility overthe following 30 days (CBOE VIX white paper, 2003):
Positively skewed and leptokurtic distribution (years1990-2013 plotted)
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The problemVIX & Co.Standard approaches
Modeling VIX and VIX derivatives: literature review
Standalone approach: volatility is directly modeled,separated from the underlying stock price process (Whaley1993, Grünbichler and Longstaff 1996, Detemple andOsakwe 2000, Mencia and Sentana 2013);Consistent approach: VIX is derived from the specificationof SPX dynamics (Bardgett, Gourier and Leippold 2013,Cont Kokholm 2013).
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The problemVIX & Co.Standard approaches
Modeling VIX and VIX derivatives: literature review
Gatheral (2008): inadequacy of Heston model in reproducingpositive skew of VIX options IV
Figure : Call options on VIX, 29/06/2009.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The problemVIX & Co.Standard approaches
Modeling VIX and VIX derivatives: literature review
Gatheral (2008): inadequacy of Heston model in reproducingpositive skew of VIX options IV⇒ Sepp (2008 a,b) addsvolatility jumps
Figure : Call options on VIX, 29/06/2009.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The basic Heston++ modelMultifactor ++ extensionsSPX Vanilla pricingVIX index modelingVIX Futures and Options pricing
The basic Heston++ model
Pacati, Renò and Santilli (2014) consider a deterministic shiftextension (Brigo and Mercurio in short rates modeling, 2001) ofthe SV of the Heston class of models: the Heston++ model(H1f++) is the basic example
dSt
St= (r − q)dt +
√σ2
t + φtdW St
dσ2t = α(β − σ2
t )dt + ΛσtdW σt
(1)
under Q, where φ0 = 0, φt ≥ 0 is called the displacement andthe model is affine provided that
corr(dW St ,dW σ
t ) = ρ
√σ2
t
σ2t + φt
dt (2)
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The basic Heston++ modelMultifactor ++ extensionsSPX Vanilla pricingVIX index modelingVIX Futures and Options pricing
The basic Heston++ model
The displacement φ increases the flexibility in fitting the ATMterm structure
H1f Vs H1f++ e/US$ FX options, July 3, 2009. Source: Pacati, C., Renò, R. and
Santilli, M. (2014). Heston Model: shifting on the volatility surface. Risk (2014)
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The basic Heston++ modelMultifactor ++ extensionsSPX Vanilla pricingVIX index modelingVIX Futures and Options pricing
The basic Heston++ model
The displacement φ increases the flexibility in fitting the ATMterm structure of IV surface⇒ eases the fit of the whole surface
H1f Vs H1f++ e/US$ FX options, July 3, 2009. Source: Pacati, C., Renò, R. and
Santilli, M. (2014). Heston Model: shifting on the volatility surface. Risk (2014)G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The basic Heston++ modelMultifactor ++ extensionsSPX Vanilla pricingVIX index modelingVIX Futures and Options pricing
Multifactor extensions
We consider several multifactor affine specifications for theS&P500 dynamics (φt ≡ 0), along with their displacedcounterparts (φt ≥ 0):
classical H1f Heston (1993);two factor H2f (Christoffelsen, Heston and Jacob, 2009);models with jump in price only: Bates (1996) like modelH1fj and corresponding two factor version H2fj;H1fcoj model with synchronous correlated jumps in priceand in volatility (Duffie, Pan and Singleton, 2000) and twofactor version H2fcoj;
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The basic Heston++ modelMultifactor ++ extensionsSPX Vanilla pricingVIX index modelingVIX Futures and Options pricing
The Heston 2-factor and co-jumps ++ model
The most general specification for the S&P500 dynamics thatwe consider is the H2fcoj++ model, under Q:
dSt
St−= (r − q − λµ̄) dt +
√σ2
1,t + φtdW S1,t + σ2,tdW S
2,t + (ezx − 1)dNt
dσ21,t = α1(β1 − σ2
1,t )dt + Λ1σ1,tdW σ1,t + z1dNt
dσ22,t = α2(β2 − σ2
2,t )dt + Λ2σ2,tdW σ2,t
where jumps are (zx , z1) ∼ N(µx + ρJz1, δ
2x)× E(µ1) and
corr(dW S1,t ,dW σ
1,t ) = ρ1
√√√√ σ21,t
σ21,t + φt
dt
corr(dW S2,t ,dW σ
2,t ) = ρ2dt
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The basic Heston++ modelMultifactor ++ extensionsSPX Vanilla pricingVIX index modelingVIX Futures and Options pricing
SPX vanilla option pricing in the H2fcoj++ model
Under H2fcoj++, the arbitrage free price of a Call on S&P500(Bakshi Madan 2000 and Schoutens 2003 if φt ≡ 0)
C(t ,T ,K ) = Ste−qτQ1 − Ke−rτQ2 (1)
Q1 =12
+1π
∫ ∞0
Re(
e−iz log K f (z − i)izf (−i)
)dz
Q2 =12
+1π
∫ ∞0
Re(
e−iz log K f (z)
iz
)dz
(2)
where f (z) = EQ[eiz log ST |Ft ] is the risk-neutral conditional CFof log-index at maturity (τ = T − t , Iφ(t1, t2) =
∫ t2t1φtdt)
f (z; log St , σ21,t , σ
22,t , t ,T ) = f H(z; log St , σ
21,t , σ
22,t , τ)︸ ︷︷ ︸
H2fcoj CF
×
++ correction︷ ︸︸ ︷e−
12 z(i+z)Iφ(t ,T )
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The basic Heston++ modelMultifactor ++ extensionsSPX Vanilla pricingVIX index modelingVIX Futures and Options pricing
SPX vanilla option pricing in the H2fcoj++ model
Under H2fcoj++, the arbitrage free price of a Call on S&P500(Bakshi Madan 2000 and Schoutens 2003 if φt ≡ 0)
C(t ,T ,K ) = Ste−qτQ1 − Ke−rτQ2 (1)
Q1 =12
+1π
∫ ∞0
Re(
e−iz log K f (z − i)izf (−i)
)dz
Q2 =12
+1π
∫ ∞0
Re(
e−iz log K f (z)
iz
)dz
(2)
where f (z) = EQ[eiz log ST |Ft ] is the risk-neutral conditional CFof log-index at maturity (τ = T − t , Iφ(t1, t2) =
∫ t2t1φtdt)
f (z; log St , σ21,t , σ
22,t , t ,T ) = f H(z; log St , σ
21,t , σ
22,t , τ)︸ ︷︷ ︸
H2fcoj CF
×
++ correction︷ ︸︸ ︷e−
12 z(i+z)Iφ(t ,T )
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The basic Heston++ modelMultifactor ++ extensionsSPX Vanilla pricingVIX index modelingVIX Futures and Options pricing
VIX index in the H2fcoj++ model
The squared VIXt is an affine function of the volatility statevector Σt = (σ1,t , σ2,t )
>:(VIXt
100
)2
= Aφ(t , τ̄) + B(τ̄) · Σt (3)
where τ̄ = 30/365 and
Aφ(t , τ̄) = A(τ̄)︸︷︷︸affinity
+
++ correction︷ ︸︸ ︷1τ̄
Iφ(t , t + τ̄) (4)
Coefficients A(τ̄) and B(τ̄) depend on the VIX time scale τ̄ only.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The basic Heston++ modelMultifactor ++ extensionsSPX Vanilla pricingVIX index modelingVIX Futures and Options pricing
VIX Futures & Options in the H2fcoj++ model
Price of a tenor T VIX futures is (Zhu and Lian 2012, if φt ≡ 0)
F Tt
100=
12√π
∫ ∞0
1− e−sAφ(T ,τ̄)F (isB(τ̄))
s3/2 ds
and for a Call option on VIX (Lian and Zhu 2013, if φt ≡ 0)
C(t ,T ,K )
100=
e−rτ
2√π
∫ ∞0
Re(
e−izAφ(T ,τ̄)F (−zB(τ̄))1− erf (K/100
√−iz)
(−iz)3/2
)dRe(z)
Volatility factor CF does not depend on displacement φ
F (Z1,Z2;σ21,t , σ
22,t , t ,T ) = EQ[eiZ1σ
21,T +iZ2σ
22,T |Ft ] =
∏k=1,2
Fk (Zk , σ2k ,t , τ)
factorizes in 1-factor CFs (Duffie, Pan and Singleton, 2000).G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
The basic Heston++ modelMultifactor ++ extensionsSPX Vanilla pricingVIX index modelingVIX Futures and Options pricing
VIX Futures & Options in the H2fcoj++ model
Price of a tenor T VIX futures is (Zhu and Lian 2012, if φt ≡ 0)
F Tt
100=
12√π
∫ ∞0
1− e−sAφ(T ,τ̄)F (isB(τ̄))
s3/2 ds
and for a Call option on VIX (Lian and Zhu 2013, if φt ≡ 0)
C(t ,T ,K )
100=
e−rτ
2√π
∫ ∞0
Re(
e−izAφ(T ,τ̄)F (−zB(τ̄))1− erf (K/100
√−iz)
(−iz)3/2
)dRe(z)
Volatility factor CF does not depend on displacement φ
F (Z1,Z2;σ21,t , σ
22,t , t ,T ) = EQ[eiZ1σ
21,T +iZ2σ
22,T |Ft ] =
∏k=1,2
Fk (Zk , σ2k ,t , τ)
factorizes in 1-factor CFs (Duffie, Pan and Singleton, 2000).G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
DataSPX Vanilla + VIX Futures calibrationVIX options pricing out-of-sample
Data: SPX Vanilla & VIX Futures
Figure : Implied volatility surface, European calls and puts on S&P500, 29/06/2009.G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
DataSPX Vanilla + VIX Futures calibrationVIX options pricing out-of-sample
Data: SPX Vanilla & VIX Futures
Figure : VIX index and VIX Futures term structure, 29/06/2009.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
DataSPX Vanilla + VIX Futures calibrationVIX options pricing out-of-sample
Data: SPX Vanilla & VIX Futures
We optimize parameters of each model on the SPX volatility surface and VIX futuresterm structure minimizing the normalized SSE:
loss(π) =∑{Vanilla}
(IV %
MKT − IV %model (π)
)2+
NVanilla
NVIX-Futures
∑{VIX-Futures}
(FMKT−Fmodel (π)
)2
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
DataSPX Vanilla + VIX Futures calibrationVIX options pricing out-of-sample
SPX + VIX Futures
Figure : Fit error on SPX Vanilla surface and VIX Futures term structure separately,calibration on {SPX Vanilla, VIX Futures}, 29/06/2009.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
DataSPX Vanilla + VIX Futures calibrationVIX options pricing out-of-sample
SPX + VIX Futures: H1f Vs H1f++
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
DataSPX Vanilla + VIX Futures calibrationVIX options pricing out-of-sample
SPX + VIX Futures: H1fcoj Vs H1fcoj++
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
DataSPX Vanilla + VIX Futures calibrationVIX options pricing out-of-sample
SPX + VIX Futures: H2fcoj Vs H2fcoj++
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
DataSPX Vanilla + VIX Futures calibrationVIX options pricing out-of-sample
SPX + VIX Futures
Figure : Fit error on SPX Vanilla surface and VIX Futures term structure separately,calibration on {SPX Vanilla, VIX Futures}, 29/06/2009.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
DataSPX Vanilla + VIX Futures calibrationVIX options pricing out-of-sample
SPX + VIX Futures: H1f Vs H1f++
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
DataSPX Vanilla + VIX Futures calibrationVIX options pricing out-of-sample
SPX + VIX Futures: H1fcoj Vs H1fcoj++
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
DataSPX Vanilla + VIX Futures calibrationVIX options pricing out-of-sample
SPX + VIX Futures: H2fcoj Vs H2fcoj++
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
DataSPX Vanilla + VIX Futures calibrationVIX options pricing out-of-sample
VIX options pricing out-of-sample
Figure : Call options on VIX, 29/06/2009.G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
DataSPX Vanilla + VIX Futures calibrationVIX options pricing out-of-sample
VIX options pricing out-of-sample
Figure : Filters for Call options on VIX, 29/06/2009.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
DataSPX Vanilla + VIX Futures calibrationVIX options pricing out-of-sample
VIX options pricing out-of-sample: H2fcoj Vs H2fcoj++
Figure : Call options on VIX, 29/06/2009. Calibration on {Vanilla, VIX Futures} onlyG. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
Summary and Conclusions
we have characterized a class of Heston-like displaced modelsfinding pricing formulas for SPX Vanilla (Pacati, Reno’, Santilli2014), VIX Futures (new) and VIX Options (new); theintroduction of displacement does not alter the affinity of themodel and comes almost at no additional computational costw.r.t. non-displaced model;
we have calibrated several Heston-like affine models on theS&P500 Vanilla surface together with the VIX Futures termstructure; the displacement looks promising as:
1 improves the fit of SPX surface, especially long-term options;2 provides an - almost exact - fit of the VIX futures term structure;3 in out-of-sample exercise it seems to better capture the positive skew of
VIX options surface. In-sample exercises (not shown today) suggest thatdisplaced models keep doing better over non-displaced models. Work inprogress...
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
Summary and Conclusions
we have characterized a class of Heston-like displaced modelsfinding pricing formulas for SPX Vanilla (Pacati, Reno’, Santilli2014), VIX Futures (new) and VIX Options (new); theintroduction of displacement does not alter the affinity of themodel and comes almost at no additional computational costw.r.t. non-displaced model;
we have calibrated several Heston-like affine models on theS&P500 Vanilla surface together with the VIX Futures termstructure; the displacement looks promising as:
1 improves the fit of SPX surface, especially long-term options;2 provides an - almost exact - fit of the VIX futures term structure;3 in out-of-sample exercise it seems to better capture the positive skew of
VIX options surface. In-sample exercises (not shown today) suggest thatdisplaced models keep doing better over non-displaced models. Work inprogress...
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
Summary and Conclusions
we have characterized a class of Heston-like displaced modelsfinding pricing formulas for SPX Vanilla (Pacati, Reno’, Santilli2014), VIX Futures (new) and VIX Options (new); theintroduction of displacement does not alter the affinity of themodel and comes almost at no additional computational costw.r.t. non-displaced model;
we have calibrated several Heston-like affine models on theS&P500 Vanilla surface together with the VIX Futures termstructure; the displacement looks promising as:
1 improves the fit of SPX surface, especially long-term options;2 provides an - almost exact - fit of the VIX futures term structure;3 in out-of-sample exercise it seems to better capture the positive skew of
VIX options surface. In-sample exercises (not shown today) suggest thatdisplaced models keep doing better over non-displaced models. Work inprogress...
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
Summary and Conclusions
we have characterized a class of Heston-like displaced modelsfinding pricing formulas for SPX Vanilla (Pacati, Reno’, Santilli2014), VIX Futures (new) and VIX Options (new); theintroduction of displacement does not alter the affinity of themodel and comes almost at no additional computational costw.r.t. non-displaced model;
we have calibrated several Heston-like affine models on theS&P500 Vanilla surface together with the VIX Futures termstructure; the displacement looks promising as:
1 improves the fit of SPX surface, especially long-term options;2 provides an - almost exact - fit of the VIX futures term structure;3 in out-of-sample exercise it seems to better capture the positive skew of
VIX options surface. In-sample exercises (not shown today) suggest thatdisplaced models keep doing better over non-displaced models. Work inprogress...
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
Summary and Conclusions
we have characterized a class of Heston-like displaced modelsfinding pricing formulas for SPX Vanilla (Pacati, Reno’, Santilli2014), VIX Futures (new) and VIX Options (new); theintroduction of displacement does not alter the affinity of themodel and comes almost at no additional computational costw.r.t. non-displaced model;
we have calibrated several Heston-like affine models on theS&P500 Vanilla surface together with the VIX Futures termstructure; the displacement looks promising as:
1 improves the fit of SPX surface, especially long-term options;2 provides an - almost exact - fit of the VIX futures term structure;3 in out-of-sample exercise it seems to better capture the positive skew of
VIX options surface. In-sample exercises (not shown today) suggest thatdisplaced models keep doing better over non-displaced models. Work inprogress...
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
Summary and Conclusions
we have characterized a class of Heston-like displaced modelsfinding pricing formulas for SPX Vanilla (Pacati, Reno’, Santilli2014), VIX Futures (new) and VIX Options (new); theintroduction of displacement does not alter the affinity of themodel and comes almost at no additional computational costw.r.t. non-displaced model;
we have calibrated several Heston-like affine models on theS&P500 Vanilla surface together with the VIX Futures termstructure; the displacement looks promising as:
1 improves the fit of SPX surface, especially long-term options;2 provides an - almost exact - fit of the VIX futures term structure;3 in out-of-sample exercise it seems to better capture the positive skew of
VIX options surface. In-sample exercises (not shown today) suggest thatdisplaced models keep doing better over non-displaced models. Work inprogress...
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
Agenda
confirm the effectiveness of the displacement with VIXoptions calibrated consistently with SPX vanilla and VIXfutures;confirm the effectiveness of the displacement on a widertime domain;evaluate the effectiveness of the displacement on differentaffine specifications, e.g. stochastic mean reverting level(Bardgett, Gourier and Leippold, 2013), stochasticvol-of-vol (Branger and Volkert, 2012);test the time consistency of the displacement (one functionφt per dataset)⇒ estimate risk premia.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
Agenda
confirm the effectiveness of the displacement with VIXoptions calibrated consistently with SPX vanilla and VIXfutures;confirm the effectiveness of the displacement on a widertime domain;evaluate the effectiveness of the displacement on differentaffine specifications, e.g. stochastic mean reverting level(Bardgett, Gourier and Leippold, 2013), stochasticvol-of-vol (Branger and Volkert, 2012);test the time consistency of the displacement (one functionφt per dataset)⇒ estimate risk premia.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
Agenda
confirm the effectiveness of the displacement with VIXoptions calibrated consistently with SPX vanilla and VIXfutures;confirm the effectiveness of the displacement on a widertime domain;evaluate the effectiveness of the displacement on differentaffine specifications, e.g. stochastic mean reverting level(Bardgett, Gourier and Leippold, 2013), stochasticvol-of-vol (Branger and Volkert, 2012);test the time consistency of the displacement (one functionφt per dataset)⇒ estimate risk premia.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
Agenda
confirm the effectiveness of the displacement with VIXoptions calibrated consistently with SPX vanilla and VIXfutures;confirm the effectiveness of the displacement on a widertime domain;evaluate the effectiveness of the displacement on differentaffine specifications, e.g. stochastic mean reverting level(Bardgett, Gourier and Leippold, 2013), stochasticvol-of-vol (Branger and Volkert, 2012);test the time consistency of the displacement (one functionφt per dataset)⇒ estimate risk premia.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
Agenda
confirm the effectiveness of the displacement with VIXoptions calibrated consistently with SPX vanilla and VIXfutures;confirm the effectiveness of the displacement on a widertime domain;evaluate the effectiveness of the displacement on differentaffine specifications, e.g. stochastic mean reverting level(Bardgett, Gourier and Leippold, 2013), stochasticvol-of-vol (Branger and Volkert, 2012);test the time consistency of the displacement (one functionφt per dataset)⇒ estimate risk premia.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
IntroductionOur approach
Empirical investigationConclusions
Thanks for your attention!
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
Appendix References
References I
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Grünbichler, Andreas, and Francis A. Longstaff. Valuing futures and options onvolatility. Journal of Banking & Finance 20.6 (1996): 985-1001.
Wang, Zhiguang, and Robert T. Daigler. The performance of VIX option pricingmodels: empirical evidence beyond simulation. Journal of Futures Markets 31.3(2011): 251-281.
Mencia, Javier, and Enrique Sentana. Valuation of VIX derivatives. Journal ofFinancial Economics 108.2 (2013): 367-391.
Bardgett, Chris, Elise Gourier, and Markus Leipold. Inferring volatility dynamicsand risk premia from the S&P 500 and VIX markets. Swiss Finance InstituteResearch Paper 13-40 (2013).
Cont, Rama, and Thomas Kokholm. A consistent pricing model for index optionsand volatility derivatives. Mathematical Finance 23.2 (2013): 248-274.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
Appendix References
References II
Gatheral, Jim. Consistent modeling of SPX and VIX options. Bachelier Congress.2008.
Sepp, Artur. Pricing options on realized variance in the Heston model with jumpsin returns and volatility. Journal of Computational Finance 11.4 (2008): 33.
Sepp, Artur. VIX option pricing in a jump-diffusion model. Risk magazine (2008):84-89.
Pacati, C., Reno’, R. and Santilli, M. (2014). Heston Model: shifting on thevolatility surface. Risk (2014), November, pp 54-59
Brigo, Damiano, and Fabio Mercurio. A deterministicÐshift extension ofanalyticallyÐtractable and timeÐhomogeneous shortÐrate models. Finance andStochastics 5.3 (2001): 369-387.
Bakshi, Gurdip, and Dilip Madan. Spanning and derivative-security valuation.Journal of Financial Economics 55.2 (2000): 205-238.
Schoutens, Wim. Levy processes in Finance: Pricing Financial Derivatives. Wiley,2003.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
Appendix References
References III
Duffie, Darrell, Jun Pan, and Kenneth Singleton. Transform analysis and assetpricing for affine jump-diffusions. Econometrica 68.6 (2000): 1343-1376.
Zhu, Song-Ping, and Guang-Hua Lian. An analytical formula for VIX futures andits applications. Journal of Futures Markets 32.2 (2012): 166-190.
Lian, Guang-Hua, and Song-Ping Zhu. Pricing VIX options with stochasticvolatility and random jumps. Decisions in Economics and Finance 36.1 (2013):71-88.
Heston, Steven L. A closed-form solution for options with stochastic volatility withapplications to bond and currency options. Review of financial studies 6.2 (1993):327-343.
Christoffersen, Peter, Steven Heston, and Kris Jacobs. The shape and termstructure of the index option smirk: Why multifactor stochastic volatility modelswork so well.
Bates, David S. Jumps and stochastic volatility: Exchange rate processes implicitin deutsche mark options. Review of financial studies 9.1 (1996): 69-107.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
Appendix References
References IV
Branger, Nicole, and Clemens Völkert. The fine structure of variance: Consistentpricing of VIX derivatives. Paris December 2012 Finance MeetingEUROFIDAI-AFFI Paper. 2013.
G. Pompa, C. Pacati, R. Renò Consistent Pricing of VIX Derivatives and SPX Options
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