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Capital Controls or Macroprudential Regulation?1 Anton Korinek 1 Johns

1

Damiano Sandri

2

Hopkins University and NBER

2 IMF

Research Department

Capital Flows, Systemic Risk, and Policy Responses Reykjavik April 2016

1 The views expressed herein are those of the authors and should not be attributed to the IMF, its Executive Board, or its management. Korinek and Sandri (JHU and IMF)

Capital Controls or Macroprudential?

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Introduction

Motivation

How to protect open economies against financial instability? Two instruments: Capital controls (CC) Macroprudential regulation (MP)

Both curb credit booms, but so far studied in isolation In this paper, we ask following questions What are the relative merits? Does MP eliminate the need for CC? Or vice versa? If not, what determines the optimal mix?

Korinek and Sandri (JHU and IMF)

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Introduction

Definitions CC segment domestic and foreign capital markets MP places a wedge between domestic borrowers and all lenders

domestic borrowers

domestic borrowers

borrowers lenders international agents

domestic savers

international agents

Capital Controls

Korinek and Sandri (JHU and IMF)

domestic savers

Macroprudential Regulation

Capital Controls or Macroprudential?

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Introduction

Models of pecuniary externalities

We analyze CC and MP in models of pecuniary externalities Exchange rate externalities ⇒ both CC and MP are needed Asset price externalities ⇒ MP is sufficient, no need for CC

Korinek and Sandri (JHU and IMF)

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Introduction

Literature review Ex-ante prudential policies motivated by pecuniary externalities CC due to RER externalities Korinek (2007, 2010), Bianchi (2011) MP due to asset price externalities Lorenzoni (2008), Jeanne and Korinek (2010), Bianchi and Mendoza (2010)

Ex-post policies to alleviate credit crunch Gertler and Kiyotaki (2010), Gertler and Karadi (2011,2013), Del Negro, Ferrero, Eggertsson and Kiyotaki (2011), Sandri and Valencia (2013)

Korinek and Sandri (JHU and IMF)

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October 2015

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Model with RER externalities

Setup

Model with RER externalities Deterministic equilibrium Small open economy in three time periods t ∈ {0, 1, 2} Three classes of agents domestic borrowers B domestic savers S foreigners that borrow/lend at the risk-free rate

Discount factor and risk-free rate set to zero Domestic savers and borrowers maximize U i = u(ciT,0 ) + u(ciT,1 , ciN,1 ) + u(ciT,2 )

Korinek and Sandri (JHU and IMF)

Capital Controls or Macroprudential?

for

i = B, S

October 2015

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Model with RER externalities

Setup

Budget constraints Domestic agents: i i receive endowments yT,t , yN,1

buy/issue bonds denominated in tradable goods bit

Budget constraints: i ciT,0 + bi1 = yT,0 + bi0 i i ciT,1 + pciN,1 + bi2 = yT,1 + pyN,1 + bi1 i ciT,2 = yT,2 + bi2

In period 1, borrowers face credit constraint: B B bB 2 ≥ −φ yT,1 + pyN,1

Korinek and Sandri (JHU and IMF)

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October 2015

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Model with RER externalities

Laissez-faire equilibrium

Time 1 equilibrium

i , individual agents maximize Defining mi = bi1 + yT,1

i V i mi ; M B , M S = Log (ciT,1 )α (ciN,1 )1−α + Log yT,2 + bi2 i i i + µi mi + p(yN,1 − ciN,1 ) − ciT,1 − bi2 + λi bi2 + φ(yT,1 + pyN,1 )

The FOCs imply uiT,1 = uiT,2 + λi uiT,1 = uiN,1 /p

Korinek and Sandri (JHU and IMF)

Capital Controls or Macroprudential?

October 2015

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Model with RER externalities

Laissez-faire equilibrium

Aggregate wealth effects Impact of aggregate wealth on individual utility ∂V j = ujT,1 · ∂M i

∂p j (y − cjN,1 ) i N,1 ∂M {z } |

+ λj ·

redistribution between agents Rij

∂p j φyN,1 i ∂M | {z }

relaxation of constraint Φji

Using market clearing in non-tradable goods ∂p = κ · M P Ci ∂M i where M P CB = 1 Korinek and Sandri (JHU and IMF)

, M P C S = 1/2

Capital Controls or Macroprudential?

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Model with RER externalities

Laissez-faire equilibrium

Time 0 equilibrium

At time 0 agents solve u(ciT,0 ) + V i mi ; M B , M S

max

subject to i i mi = bi0 + yT,0 − ciT,0 + yT,1

Individual agents take prices as given Standard Euler equation uiT,0 =

Korinek and Sandri (JHU and IMF)

∂V i = uiT,1 ∂mi

Capital Controls or Macroprudential?

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Model with RER externalities

Planner’s solution

Optimal Prudential Policy

Prudential planner: sets B1i but leaves laissez-faire for t ≥ 1 (as in Stiglitz, 1982, Geanakoplos-Polemarchakis, 1986) The planner sets γ i uiT,0 =

γ i uiT,1 | {z }

private benefit

+

∂V i ∂V j + γj γi i i | ∂M {z ∂M } social benefit

internalizing the effects of borrowing on future exchange rates

Korinek and Sandri (JHU and IMF)

Capital Controls or Macroprudential?

October 2015

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Model with RER externalities

Planner’s solution

Implementation The planner’s solution can be implemented with borrowing taxes and saving subsidies uiT,1 uiT,0

= 1 − τi

Optimal taxes are

τ

B

∂p B λB ∂M B φYN,1 = B B − RB uT,0 1 + RB S

τB = Korinek and Sandri (JHU and IMF)

and

∂p B λB ∂M S φYN,1 τ = B B − RB uT,0 1 + RB S S

M P CB S ·τ >0 M P CS

Capital Controls or Macroprudential?

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Model with RER externalities

Planner’s solution

Capital controls or macroprudential regulation? Proposition In a model with RER externalities, both MP and CC are needed to achieve constrained efficiency. By segmenting domestic borrowers from capital markets ⇒ MP increases τ B without affecting τ S By segmenting domestic versus international markets ⇒ CC lead to an equal increase in both τ B and τ S The appropriate combination of MP and CC is given by 1 − τ CC 1 − τ MP Korinek and Sandri (JHU and IMF)

= 1 − τS 1 − τB = 1 − τS

Capital Controls or Macroprudential?

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Model with RER externalities

Planner’s solution

Stochastic setting

The results carry forward to a stochastic setting Without state contingent assets → Size of CC and MP depends on likelihood of constraints becoming binding With state contingent assets → Individual agents under-insure → CC and MP should be risk sensitive

Korinek and Sandri (JHU and IMF)

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October 2015

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Model with RER externalities

Numerical illustration

Numerical illustration: 1997 East Asian Crisis Current account (percent of GDP)

Real exchange rate (1997=100) 105 100 95 90 85 80 75

10 5 0 -5 1995

1997

1999

2001

1995

1997

1999

2001

Balanced growth path if constraint does not bind Financial constraint φ tightens with 5% probability → to match CA surplus and REER depreciation Pre-crisis net foreign assets equal to −40% α 0.3

i YT,0

1

i YT,1

α

Korinek and Sandri (JHU and IMF)

i YN,1

1−α

i YT,2

1−

B0i

B0B

B0S

π

φ(L)

φ(H)

−0.8

0

5%

0.65

∞

Capital Controls or Macroprudential?

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Model with RER externalities

Numerical illustration

Wealth inequality and optimal taxes Under benchmark calibration, 2 percent CC and MP taxes Current account (percent of GDP) 20 15

42

Planner ↙

0.7 ↗ Laissez faire

0.6

First best 40

12 10 8 6 4 2 0

0.8

5 0

Optimal taxes

First best

0.9 ↖ Planner

10

Real exchange rate 1.0

Laissez faire ↘

0.5 44

46

48

50

40

-BB0 (percent of GDP)

42

44

46

48

50

τB τS

40

-BB0 (percent of GDP)

42

44

46

48

50

-BB0 (percent of GDP)

Greater wealth inequality, i.e. larger gross positions, ⇒ higher optimal taxes Korinek and Sandri (JHU and IMF)

Capital Controls or Macroprudential?

October 2015

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Model with asset price externalities

Setup

Model with asset price externalities Domestic agents receive capital k1 that produces output at time 2 Borrowers have access to more efficient production technology F B (k2B ) = Ak2B

,

F S0 (0) = A

, F S00 (k2S ) < 0

Budget constraints: i + bi0 ciT,0 + bi1 = yT,0 i ciT,1 + bi2 = yT,1 + q(k1i − k2i ) + bi1 i ciT,2 = yT,2 + F i (k2i ) + bi2

In period 1, borrowers face credit constraint: B bB 2 ≥ −φqk2 Korinek and Sandri (JHU and IMF)

Capital Controls or Macroprudential?

October 2015

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Model with asset price externalities

Laissez-faire equilibrium

Aggregate wealth and asset prices Laissez-faire FOCs uiT,1 = uiT,2 + λi

and

q=

F i0 (k2i ) φ + (1 − φ)uiT,1 /uiT,2

For unconstrained savers, uST,1 = uST,2 and ∂q ∂M S

= 0

⇒ Fisherian separation between consumption and investment B For constrained borrowers, uB T,1 > uT,2 and

∂q ∂M B Korinek and Sandri (JHU and IMF)

> 0

Capital Controls or Macroprudential?

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Model with asset price externalities

Constrained efficient equilibrium

Planner’s solution The planner reduces borrowing, but does not distort saving τ B = λB

∂q φk2B ∂M B B 1 + RB

τS = 0

Proposition In a model with asset price externalities, MP is sufficient to achieve constrained efficiency. No need for CC.

Korinek and Sandri (JHU and IMF)

Capital Controls or Macroprudential?

October 2015

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Conclusions

Conclusions Contractionary RER depreciations ⇒ both CC and MP increase net worth of people who spend on domestic goods, i.e. both borrowers and savers but regulate borrowers more since higher M P C

τB =

M P CB S ·τ >0 M P CS

Fire sales of assets ⇒ MP is sufficient No need to increase savers’ wealth since no impact on asset prices

τB > 0 = τS

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