NDC Dynamic Equilibrium Model with financial and...

0

NDC Dynamic Equilibrium Model NDC Dynamic Equilibrium Model NDC Dynamic Equilibrium Model NDC Dynamic Equilibrium Model

with financial and demographic riskswith financial and demographic riskswith financial and demographic riskswith financial and demographic risks

Pierre DEVOLDER

Inmaculada DOMINGUEZ FABIAN

Aurélie MILLER

1The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

Outline

• 1. NDC PAYG DC or DB …

• 2. DEMOGRAPHIC MODEL

• 3. STATIC EQUILIBRIUM

• 4. DYNAMIC UNIFORM PENSION MODEL

• 5. DYNAMIC GENERATION PENSION MODEL

• 6. CONCLUSION

2The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

1. NDC PAYG DC or DB…

NDC = Notional Defined Contribution Schemes

= Notional Accounts

- Attempt to reproduce the logic of individual funded pensionaccounts but now in a PAYG framework.

- Combination of : - solidarity of PAYG technique - stability of the charges in DC

( Disney (1999), Scherman (1999), Williamson(2004),…)

3The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

1. NDC PAYG DC or DB…

2 basic techniques in order to finance pension liabilities

PAY AS YOU GO FUNDING

Pensions for retirees are paid by active people

Active people financetheir own pension

Unfunded schemes Funded schemes

4The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

1. NDC PAYG DC or DB…

This fundamental choice is present as well for definedbenefit pension schemes (DB) as for defined contributions pension schemes (DC).

Pay as you go Funding

DB Classical Classical EmployeeSocial Security Benefit DB plan

DC Notional Accounts Pension saving(NDC) Accounts

5The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

1. NDC PAYG DC or DB…

By definition funded DC pension schemes are really “defined contribution” !!!

In particular, the actuarial equilibrium is always guaranteed .

NDC are much more delicate …especially in presence ofdemographic and financial risks ( between DC and DB !!!)

( Valdez Prieto ( 2000), Settergren (2001),Auerbach/Lee (2006))

Therefore the design of the NDC is crucial .

6The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

2. DEMOGRAPHIC MODEL

The Overlapping Generation Model ( OLG Model):

Stylization tool in order to capture the dynamic evolution of populationin time with a focus on equilibrium between active peopleand retirees. ( for instance Vermeylen (2007))

OLG Assumptions: model with 3 generations: - Agents have finite lives- They live in three periods :

- they are “active” , then “retired” 2 periods , then dead- when one generation becomes old, anotheryoung generation is born .

7The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

2. DEMOGRAPHIC MODEL

Notations and assumptions : static model :

y y+1 y+2 y+3

Entry Retirement Survival Endage age age

Survival 1 p 0probability

8The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

2. DEMOGRAPHIC MODEL

Notations :

π++

=

===++=

=

γ

δ

:rateoncontributi

p:2yand1yagebetweenyprobabilitsurvival

e).0(s)t(s:salarymean

e).0(E)t(E

ttimeatenteringpeopleofnumber)t,y(L)t(E

)2y,1y,yx(

ttimeatxagedpeopleofnumber)t,x(L

t

t

9The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

3. STATIC EQUILIBRIUM

tt e.e).0,y(L).0(s.

)t,y(L).t(s.)t(C:onscontributitotalγδπ=

π=

PAYG + DC scheme for this population:

Actuarial equivalence between income and outcome

Income :

Outcome :

)e.pe).(0(E).t(P

))t,2y(L)t,1y(L).(t(P:pensionstotal)2t()1t( −δ−δ +=

+++

( same pension for both generations )

10The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

3. STATIC EQUILIBRIUM

annuity

tionrevalorizawithonscontributiofsum

)t(a

)t(R).1t(c)t(P =−=

δ−

δ+γ−γ

+π=

e.p1

e.e).0(s.)t(P

)1t(

Interpretation as a NDC formula :

Mean pension achieved :

δ−

δ+γ

−γ

+====

π==−

e.p1annuity)t(a

etionrevaloriza)t(R

e).0(s.oncontributi)1t(cwith )1t(

11The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

3. STATIC EQUILIBRIUM

γ=−

= e)1t(P

)t(P)t(RP

Replacement rate :

Indexation process :

δ−

δ

+π==

ep1

e.

)t(s

)t(P)t(RR

Following the indexation of wages

12The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

3. STATIC EQUILIBRIUM

CONCLUSION :

In order to design a NDC scheme , we must define 3 processes :

a) the indexation process ( pension indexation afterretirement): RP

b) the revalorization process of the salaries : Rc) the annuity : a

13The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

3. STATIC EQUILIBRIUM

In the static model, the PAYG constraint gives the

following canonical identification :

δ−

δ+γ

γ

+==

=

e.p1)t(a

e)t(R

e)t(RP Pension Indexation : salary growth

Revalorization : salary + population growth

Canonical design of the NDC scheme

Annuity : population growth

14The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

3. STATIC EQUILIBRIUM

)t(a.

))t(R.).(1t(c)t(P

αα−=

δ−

δ+γ

γ

+==

=

e.p1)t(a

e)t(R

e)t(RP

Remark :Even if, in this static model, this canonical identification seems natural, a lot of other identifications are possible ( giving off course finally the same pension amount !!). In fact, the processes R(t) and a(t) can be multiplied by any positive constant ( …presentation purpose…) :

For instance :

δ−δ−

γ

γ

+===

=

2e.pe)t(a

e)t(RP)t(R

e)t(RP

Same indexation

15The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

4. DYNAMIC UNIFORM PENSION

yprobabilitsurvival:p

wagesofrategrowth:

populationofrategrowth:

γ

δ

Static model Dynamic model

t

t

t

p

,...)2,1t;tyear(

γ

=δ

2 cases for the pension amount : - uniform pension at time t- 2 generations of retires

receiving different pensions

16The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

4. DYNAMIC UNIFORM PENSION

δ−

δ+γ−γ

+π=

e.p1

e.e).0(s.)t(P

)1t(

Uniform pension – equilibrium condition :

1t

tt

e.p1

e.)exp().0(s.)t(P

t

1t

1ii

−δ−

δ+γ−

=

+

γπ=

∑

static

dynamic

17The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

4. DYNAMIC UNIFORM PENSION

)t(a

)t(R).1t(c)t(P

−=)1t(P

)t(P)t(RP

−=

1t

tt

e.p1

e.)exp().0(s.)t(P

t

1t

1ii

−δ−

δ+γ−

=

+

γπ=

∑

NDC canonical interpretation :

?

1t

1t

t

t

e.p1)t(a

e

e.

)t(a

)1t(a.e)t(RP)exp()t(R

t

tt

−

−

δ−

δ

δγ

+=

−=δ+γ=

18The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

4. DYNAMIC UNIFORM PENSION

NDC canonical interpretation : conclusions

1°) R(t): revalorization of salaries:as expected : salary + population growth

2°) a(t): conversion annuity :as expected : population + probability

( … but time related !!!) 3°) RP(t ) : indexation of the pension :

not as expected !!! No more simply equal to salary growth

19The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

4. DYNAMIC UNIFORM PENSION

1t

t

t

e

e.

)t(a

)1t(a.e)t(RP

−δ

δγ −=

New indexation rule :

SalaryGrowth Demographic

and longevity risk

The expected indexation coefficient is corrected by 2 terms : - a ratio of successive annuities- a ratio of successive demographic growths

Demographicrisk

20The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

4. DYNAMIC UNIFORM PENSION

)t(Re

e.

)t(a

)1t(a.e)t(RP

1t

t

t =−=−δ

δγ

)(1t

2t1t1t e.pe)t(a −−− δ+δ−−

δ− +=

te)t(R γ=

Other possible NDC identifications :

EXAMPLE 1 : uniform indexation before and after retirement :

EXAMPLE 2 : revalorization in line with salary growth :

)(t

1ttt e.pe)t(a −δ+δ−δ− +=

21The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

5. DYNAMIC GENERATION PENSION

pensionuniform)t(P =

generationretiredoldtheforpension)t(P

generationretirednewtheforpension)t(P

2

1

==

Equilibrium condition :

)t(P).t,2y(L)t(P).t,1y(L)t(s.).t,y(L 21 +++=π

….Infinite number of different equilibrated schemes !!!

22The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

5. DYNAMIC GENERATION PENSION

Additional constraint : NDC definition :

The first pension is computed using at retirement a NDC formula . The second pension is then a consequence of the equilibrium relation.

Different NDC identifications will now lead to different pension amounts( balance between the 2 generations) !!!

General NDC approach :

The pension for the new generation is given by :

)t(a

)t(R).1t(c)t(P1

−=

The processes R(t) and a(t) must be chosen.

23The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

5. DYNAMIC GENERATION PENSION

)t,2y(L

)t,1y(L

)t(P

1.

)t,2y(L

)t(C

)t(P

)t(P

11

2

++−

+=

Then the pension for the old generation is given by the equilibrium condition :

The indexation process is given by the relation :

)1t(P

)t(P)t(RP

1

2

−=

24The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

5. DYNAMIC GENERATION PENSION

te.p1)t(a

)exp()t(R

1t

tt

δ−++=

δ+γ=

Canonical choice : ( model 1 ):

)t(a

)1t(a.

p

p.e)t(RP

t

1tt−= +γ

Natural

Indexation

Longevitycorrection

Annuitycorrection

Naturalrevalorization

Annuity withProspectiveLife table

25The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

5. DYNAMIC GENERATION PENSION

1t

tt

p1)t(a

)exp()t(R

++=δ+γ=

Other possible choices : ( model 2 ):

)t(a

)1t(a.

p

p.e)t(RP

t

1ttt−= +γ+δ

Indexation =

revalorizationLongevitycorrection

Annuitycorrection

Naturalrevalorization

Annuity Life Expectancy

26The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

5. DYNAMIC GENERATION PENSION

tep1)t(a

)exp()t(R

t

tt

δ−+=

δ+γ=

Other possible choices : ( model 4 ):

)t(a

)1t(a.e)t(RP t

−= γ

Natural

Indexation Annuitycorrection

Naturalrevalorization

Annuity with presentLife table

27The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

6. CONCLUSION

In a dynamic model the indexation process after retirement can not be chosen so naturally.

Different choices can be done with respect to the annuity conversion and the revalorization of salaries.

Then in an equilibrium model, the indexation afterretirement becomes a constraint and is generally not equalto a natural indexation . Correction terms mainly based on an annuity ratio appear systematically.

28The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

FURTHER RESEARCH

- Extension in a more sophisticated demographic model with “many” ages;

- Stochastic approach for the financial and demographic background;

- Introduction of an Equilibrium Fund in this stochasticframework.

THANK YOU

29The 4The 4thth PBSS ColloquiumPBSS Colloquium TOSHI CENTER Hotel, Tokyo, Japan TOSHI CENTER Hotel, Tokyo, Japan –– 44--6 October 20096 October 2009

Prof. Pierre DEVOLDERACTUUniversité Catholique de Louvain ( UCL)6 Rue des Wallons1348 LOUVAIN la NEUVEBELGIUM

Mail : Pierre.Devolder@uclouvain.be

URL :http://www.actu.ucl.ac.be/staff/devolder/pdevolder.html

Corresponding Author