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Monetary policy, banking and systemic risk in open economies Jaromir Benes (IMF) Andrea Gerali (Banco d’Italia) David Vavra (Czech National Bank) Plan of presentation • Motivation • Features added • Prototypical SOE model • Policy experiments Motivation • A simple (DSGE) model framework with interactions between real and banking sectors • Provide dynamic and macro consistency in systemic risk, early warning, or contagion exercises • Integrated approach to monetary cum macroprudential policies • Evaluate policy options under various constraints – – – – Shock to bank capitalisation Currency mismatches Maturity mismatches Booms and busts in asset prices Motivation • Reminiscences of 20 years ago – Monetary policy paradigm not established in the early 1990s as it is now – Model-based frameworks popped up (BoC, RNBZ) with many ad-hoc features that became justified by proper theory only later on • Our work tries to incorporate some of the important links between real economy and banking (and monetary policy and macro-prudential policy) taking a few shortcuts to keep the framework operational, e.g. – no explicit debt/loan contracts – cost function increasing in banks’ leverage Features added • Banks as agents with their own net worth – Bank capital subject to regulation – Bank capitalisation affects lending rates and volumes – Fresh capital not trivial to raise • Banks bear (some of the) aggregate macro risk: non-performing loans – Different from most of the current literature. Bernanke, Gertler & Gilchrist 1998 accelerator assumes debt contract contingent upon macro outcomes – Bank capital subject to losses Features added • Simple housing – fixed supply of houses – house prices subject to bubbles • Multi-period loans – banks issue multi-period loans, refinance themselves short – hence exposed to maturity mismatches • ...hence multiple balance-sheet effects – currency mismatch risk – loan-to-value ratio affects premium – maturity mismatch risk Design of the real sector Exports Consumption Local production Imports Intermediates Design of the real sector • Simple but flexible to get aggregate elasticities right • Roundabout production function Pro-cyclical real marginal cost, no explicit labour market • Imports both directly consumed (Leontieff) and used as inputs (Cobb-Douglas) – Helps to flexibly calibrate the aggregate elasticity of import demand and exchange rate pass-through to the CPI • Price-elastic export demand with export prices subject to costs of deviating from world prices – A wide range of assumptions about responses in export prices and export volumes • Simple housing (fixed supply of houses) => LTV Design of the banking sector Foreign funds Loans to consumers Bank capital (equity, net worth) Design of the banking sector • Consumers net debtors at all time, foreign borrowing intermediated through banks • Banks combine foreign funds and their own net worth (bank capital, equity) to make loans • Bank capital is made indispensable by introducing a cost function increasing in leverage: – Regulatory costs – Reputational costs – Smooth cost function rather than an inequality constraint analogy with inventory stock-out models Design of the banking sector • Banks extend multi-period loans • Multi-period loans can be handled easily on the consumers’ side • …but to keep the problem tractable on the banks’ side, we in fact split the bank into its “wholesale” and “retail” branches that take the other’s decisions as given • This split is (for ease of this exposition) not presented here Banks (For ease of notation here: all assets and liabilities except F denominated in local currency.) • Balance sheet Lt Bt Ft Et • Gross earnings Vt : RL ,t 1Lt 1 1 gt Rt 1Bt 1 R F St * t 1 t 1 St 1 Et 1 · f Lt 1 / Et 1 Non-performing loans Banks’ costs increasing in leverage Banks • Banks must follow a fixed dividend policy dividends dt ·Vt new equity Et (1 )·Vt • This is to give bank capital non-trivial role – capital not easy to raise fresh capital – consumers (owners) cannot simply pour money into banks to re-capitalise them – shock to capital (leverage) costly for the banks What does the cost function do? • Prevents banks from going infinitely leveraged— return on equity diminishes in leverage RE ,t : RL ,t 1 1 gt Rt ELtt Rt f (Lt / Et ) • Affects marginal cost of lending => lending rates RL ,t Rt f t / et • After a hypothetical shock to bank capital: – – – – the total costs increases… …but the marginal costs increase more still so does retail lending rate lending volumes drops in response Non-performing loans • NPLs are still repaid by the consumers, but the repayments never reach the bank • NPLs are an ad-hoc function of some macro variables • We experiment with NPL functions decreasing in – loan-to-value ratios (=used in simulations here) – loan-to-current-income ratios • Non-linear function with a “threshold” • Must be, though, sigmoid (flattens for very large values) – otherwise the simulation would explode Non-performing loans Multi-period loans • Model the effects of the existence of multi-period (nominal) loans, not portfolio/term-structure choice • Introduce a “geometric” loan – infinite number of geometrically decaying instalments – instalments cannot be re-negotiated at a later time • Why geometric? – everything can be expressed recursively – average maturity (Macaulay’s duration) can be calibrated using just one parameter – no new state variables needed to mimic very long terms Multi-period loans • Average maturity (duration) imposed, not determined endogenously or optimally. • Consumer ex-ante intertemporal choice not affected (up to first order) by multi-period loans: Euler equation still has the underlying one-period rate in it. • Ex post, duration of loans matters to the extent the economy is hit by unforeseen shocks (e.g. large increases in short-term rates make consumers better off if they go long). Simulation experiments • Expose the country to a premium shock • Full dollarisation of the banking sector and the loans • NPLs function of loan-to-value ratio • Simulate two policy regimes – IT with a flexible exchange rate – An exchange rate peg • Simulate two magnitudes of the shock – a “small” shock (100 bp) – a “large” shock (1,000 bp) going beyond the threshold of the NPL function, resulting in sizeable balance sheet effects 100 bp country premium shock 1,000 bp country premium shock Comments on simulations • First, notice the non-linearities from the NPL function – Large shock simulation is more than just 10x the small shock simul (the shock is 10x bigger, in a linear world the simulations would be identical, just the magnitudes would multiply), and variables have different profiles – Output loss under IT is closer to output loss under peg in large shock simul (than in small shock simul) – this the balance sheet effect. A large depreciation (plus drops in house prices) raises the loan-to-value ratio significantly, and triggers defaults (NPLs) • Second, let’s turn to the large shock simulation. Banks run huge losses in the first period (unexpected NPLs were not reflected in the lending rate setting) Comments on simulations • How do the banks react to losses and drops in bank capital? • Their total costs increase, but even more so the marginal costs. The banks raise the lending rates significantly. • This has two main implications: – The banks start making profits, and cumulate bank capital again (recall profits are the only source of new capital). – Demand for loans drops. Comments on simulations • In real world, the banks would not lift the lending rates so much (above 50 % PA in simulations – not shown in the graphs), but would combine lending rate increases with credit rationing. • However, with credit rationing, the shadow value of loans would increase exactly so as to depress demand sufficiently to restore equilibrium at the rationed levels. • Whether the drop in loans is because of credit rationing or high market rates is therefore irrelevant. Comments on simulations • Differences in the two policy regimes: – An IT central bank can “transform” an interest rate shock to an exchange rate shock (by cutting the rates). The exchange rate shock is more favourable to the real economy, because re-directs demand from foreign goods towards local goods, whereas interest rates shocks depress overall demand. – On the other hand, flexible exchange rates can trigger large valuation effects, seeing the households default on their debt, and the banks run losses.