2.1. Banks

Given the idiosyncratic liquidity risk, a banking contract arises endogenously to allocate currency and CBDC and the other assets across the types of buyers. Without this insurance arrangement, type 1 buyers could run out of currency/CBDC and holding idle government bonds while type 2 buyers could hold low-yielding currency/CBDC instead of other high-yielding assets. Therefore, the banking contract can provide liquidity insurance by allocating currency/CBDC to type 1 buyers and the rest of assets to type 2 buyers. Given the perfect competition, any agents can suggest an optimal banking contract that maximizes the expected utility of buyers and play a role as banks.

Under private information the banks cannot verify the type of individual buyers, so one type of buyers can mimic the other type of buyers. In general this private information friction does not matter because the reserves cannot be accessed by the buyers as shown in Sanches and Williamson (Reference Sanches and Williamson2010) and Williamson (Reference Williamson2016). However, if CBDC is introduced and buyers can access to their reserve accounts additionally, then it is difficult for banks to reveal the types by providing different types of assets. For example, type 1 buyers are willing to mimic type 2 buyers for receiving a sufficient amount of reserves, because they can use their reserve balances as CBDC in the retail transactions. Therefore, given the excess reserves, the banks are required to adjust the amount of assets for both types of buyers to separate the types efficiently, and thus the effect of monetary policy could be changed.

We assume that all the claims issued by the banks and the central bank are not counterfeitable and buyers can meet only one bank after their liquidity shock is realized to prevent the banking contract from being unraveled.Footnote ²¹

In order to know whether this problem is created by the insurance contract or not, we introduce a type of liquidity market from Berentsen et al. (Reference Berentsen, Camera and Waller2007) as shown in the Appendix B, and find that the main results are maintained.

2.2. Government

At $t=0$ government bonds are issued by the fiscal authority, and then currency, CBDC and reserves are injected by the central bank through open-market purchases. The initial revenue of issuing currency, CBDC, reserves, and government bonds is transferred to buyers. After $t=0$ , outstanding currency, CBDC, reserves and government bonds amounts can be supported by collecting taxes or providing transfers over time. So the consolidated government budget constraints can be written as

\begin{equation*}\phi _{0}(C_{0}+D_{0}+M_{0}+q_{0}B_{0})=\tau _{0}=V\end{equation*}

and

\begin{align*} \phi _{t}\{C_{t}-C_{t-1}+D_{t}-R^{d}_{t-1}D_{t-1}+M_{t}-R^{m}_{t-1}M_{t-1}+q_{t}B_{t}-B_{t-1}\}&=\tau _{t},\: t=1,2,3,\ldots \end{align*}

where $C_{t}$ , $D_{t}$ , $M_{t}$ and $B_{t}$ denote the nominal quantities of currency, CBDC, reserves and government bonds held by the private sector in the CM at time $t$ , respectively. In the model the central bank can buy and sell the private assets such as the Lucas trees.Footnote ²² $\tau _{t}$ denotes the real value of the lump-sum transfer from the fiscal authority to each buyer in the CM at period $t$ . As described in Williamson (Reference Williamson2012, Reference Williamson2016), we assume that the fiscal authority keeps the total value of the outstanding consolidated government debt as a constant, $V$ , after the fixed amount, $\tau _{0}$ , is transferred at $t=0$ . This fiscal rule plays a role as separating fiscal policy and monetary policy. The fiscal policy manages the total quantity of government debt, and the monetary policy adjust the composition of the debt by exchanging liquid assets such as currency, CBDC, reserves with government debt. Since this fiscal rule restricts the total supply of public safe assets as scarce, in the model we analyze the monetary policy effect when the fiscal policy is limited.Footnote ²³

On the other hand, the amount of private liquidity in this economy can vary by the price level of the Lucas tree. Since the real rate of return on the Lucas tree is negatively related to its equilibrium price level in this model, the aggregate liquidity supply could increase as the real interest rate falls. With this setting, we can observe the effect of monetary policy on aggregate liquidity in the private sector.

In every period to maintain the real value of outstanding consolidated government debt, the real term of lump-sum transfer $\tau _{t}$ is derived passively from

\begin{align*} & \begin {array}{cccc} \tau _{t}= & \underbrace {(1-\frac {\phi _{t}}{\phi _{t-1}})V} & +\underbrace {\frac {\phi _{t}}{\phi _{t-1}}\{(1-R^d_{t-1})\phi _{t-1}D_{t-1}+(1-R^m_{t-1})\phi _{t-1}M_{t-1}+(q_{t-1}-1)\phi _{t-1}B_{t-1}}\},\: \\ & seigniorage & real\, interest\, payment \end {array}\\[5pt] &t=1,2,3,\ldots . \end{align*}

Note that the lump-sum transfer consists of seigniorage from inflation, real interest payments for government bonds and reserves, and investment earning from the Lucas tree.

4.1. Channel systems

In a channel system the central bank can set the interests on CBDC and reserves, $R^d$ and $R^d R^m$ , lower than the nominal interest rate on government bonds, $\frac{1}{q}-1$ , which is controlled by open-market-operations, $\delta$ . So banks will not hold any excess reserves in equilibrium, $m=0$ and $x^{m}_{2}=0$ , in this case. We also know that the constraints (3)-(5) always bind when the first-best allocation is not feasible. The first step of characterization is to solve for the equilibrium conditions without the binding incentive constraints (6)-(7). If $\lambda _{1}=\lambda _{2}=0$ , then the first-order conditions (9) and (11) can be reduced into

(17) \begin{equation} \frac{\mu }{\beta R^d} =u'(x_{1}), \end{equation}

(18) \begin{equation} q\frac{\mu }{\beta }=u'(x_{2}), \end{equation}

respectively. By using these first-order conditions (18)-(19) and the binding constraints (3) and (5), the government budget constraint (13) can be transformed into a feasibility condition,

(19) \begin{equation} \rho x_{1}u'(x_{1})+(1-\rho )x_{2}u'(x_{2})=V. \end{equation}

Note that given a nominal interest rate target $\frac{1}{q}-1$ , $x_{1}$ and $x_{2}$ have a strictly positive relationship as $q R^d u'(x_{1})=u'(x_{2})$ in (17)-(18) and a strictly negative relationship in (19). So there is a unique equilibrium allocation $(x_{1},x_{2})$ , which satisfies with (17)-(19). In order to support this equilibrium allocation $(x_{1}, x_{2},q)$ , the central bank can implement open-market-operations by choosing $\delta$ as

(20) \begin{equation} \delta = \frac{\rho x_{1}u'(x_{1})}{V}, \end{equation}

which can be derived from (14) and (19). Notice that the equilibrium allocation $(x_1,x_2)$ is determined by the relative rate between the interest on CBDC, $R^d$ , and the nominal interest rate, $\frac{1}{q}$ . That means, when $R^d$ varies, only the nominal interest rate and the inflation rate, $\mu$ , will change along with it and the other real allocations are maintained. Thus, without the loss of generality, we assume that the interest on CBDC is normalized as one, $R^d=1$ , from now on. Further details on how monetary policy is implemented in the channel system are described in the Appendix A, because the mechanism is the same as shown in Williamson (Reference Williamson2012, Reference Williamson2016).

Lemma 1 shows that both the incentive constraints do not bind in the channel system. The insurance contract provides currency for type 1 buyers and government bonds for type 2 buyers to make the marginal rate of substitution between currency and government bonds equivalent to the given nominal interest rate. Without the excess reserves, type 1 buyers prefer currency/CBDC because it is unavailable to use government bonds in retail transactions. Type 2 buyers prefer government bonds as long as the rate of return in government bonds is greater than the rates of return on currency and CBDC. Therefore, the optimal insurance contract does not violate the truth-telling incentive constraints without excess reserves.

Therefore, if the monetary policy is implemented in a channel system, there is no effect on real allocations when an account-based CBDC is introduced to the agents.

4.2. Floor systems

In a floor system the interest on reserves must be greater than or equal to the nominal interest rate, $R^m \geq \frac{1}{q}$ , to have excess reserves. Given the interest on reserves, $R^m$ , if $\delta =\bar{\delta }$ then we have the same equilibrium as in channel systems with no excess reserves, $m=0$ and $x^{m}_{2}=0$ , so when $\delta \gt \bar{\delta }$ , banks hold strictly positive excess reserves on their balance sheets as $m\gt 0$ and $x^{m}_{2}\gt 0$ . In order to implement floor systems, the central bank can set $ R^m\geq 1$ and $\delta \gt \bar{\delta }$ where $\bar{\delta }$ satisfies with $R^m=\bigg (\frac{1-\rho }{\rho }\frac{\bar{\delta }}{1-\bar{\delta }}\bigg )^{-\frac{\gamma }{1-\gamma }}$ , given the utility function $u(x)=\frac{x^{1-\gamma }}{1-\gamma }$ .

Define $\alpha$ as a proportion of type 2 buyer’s consumption supported by excess reserves, $\alpha =\frac{x^{m}_{2}}{x^{m}_{2}+x^{b}_{2}}$ . Note that $\alpha \in [0,1]$ increases in $\delta$ and corresponds to $\delta \in [\bar{\delta },1]$ since $\alpha =\frac{\delta -\bar{\delta }}{1-\bar{\delta }}$ holds from the binding constraints (3)-(5) and (13)-(14).Footnote ²⁷ Then the truth-telling constraint (6) can be rewritten as

(21) \begin{equation} R^m x_{1}\geq \alpha x_{2}. \end{equation}

Lemma 2 shows that the incentive constraint for type 1 buyers can bind when the excess reserves are sufficiently large. In a floor system, the interest on reserves plays the same role as the nominal interest rate in the channel system to adjust the marginal rate of substitution between currency/CBDC and government bonds. However, when CBDC is introduced, type 1 buyers can use CBDC by accessing to the reserve accounts. So, the optimal allocation cannot be obtained when the large excess reserves are provided to type 2 buyers, because type 1 buyers can mimic type 2 buyers.

Notice that only type 1 buyers deviate in this model unlike Diamond and Dybvig (Reference Diamond and Dybvig1983) where type 2 buyers deviate in a similar setting, because we assume that the coefficient of relative risk aversion, $\gamma$ , is less than 1. Since the insurance contract makes type 1 buyers worse off and type 2 buyers better off with $\gamma \lt 1$ , type 1 buyers tend to deviate and the incentive constraint (6) is binding here.Footnote ²⁸

Therefore, we can describe our equilibrium cases as shown in Figure 2. Given $R^m\gt 1$ , if $\tilde{\delta } \leq \delta \leq \bar{\delta }$ then we can conduct open-market operations in channel systems. Given $R^m\gt 1$ , if $\delta \gt \bar{\delta }$ we need to implement monetary policy in floor systems. In case of $\bar{\delta }\lt \delta \leq \hat{\delta }$ then the incentive constraint (21) does not bind, but it binds in case of $\hat{\delta }\lt \delta \leq 1$ .Footnote ²⁹

Figure 2. Equilibrium cases.

4.3. Floor system without large excess reserves

When $\lambda _{1}=0$ , the equilibrium allocation at $R^m\gt 1$ in a floor system is the same as one in a channel system with $\frac{1}{q}=R^m\gt 1$ , because given $\lambda _{1}=0$ , $\frac{1}{q}=R^m$ holds in (10)-(11) and the equilibrium conditions (17)-(19) still hold. Therefore, introducing CBDC does not affect the real allocations in a floor system without large excess reserves. Additional explanations on how monetary policy is implemented in the floor system without large excess reserves are described in the Appendix A.

4.4. Floor system with large excess reserves

When $\lambda _{1}\gt 0$ , the feasibility condition (19) does not change, but the truth-telling constraint (21) binds with equality instead of the first-order conditions (17)-(18).Footnote ³⁰ Thus, in this case given $(R^m,\delta )$ , the equilibrium allocation $(x_{1},x_{2})$ in the floor system with $\lambda _{1}\gt 0$ is determined by (19) and (21) with equality. Define $(x^{i}_{1}, x^{i}_{2})$ as the equilibrium allocations in the channel system ( $c$ ) and floor system ( $f$ ), respectively, where $i=\{c,f\}$ . As shown in Figure 3, given the same level of interest on reserves, $R^m$ , the equilibrium allocation $(x^{f}_{1},x^{f}_{2})$ in the floor system with $\lambda _{1}\gt 0$ can be described as the point $F$ while the equilibrium allocation $(x^{c}_{1},x^{c}_{2})$ in the channel system(or in the floor system with $\lambda _{1}=0$ ) can be shown as the point $C$ . Notice that $x^{c}_{1}\lt x^{f}_{1}$ and $x^{c}_{2}\gt x^{f}_{2}$ in the graph, because $(x^{c}_{1},x^{c}_{2})$ and $(x^{f}_{1},x^{f}_{2})$ still satisfy with the same feasibility condition (19) while (21) violates at $(x^{c}_{1}, x^{c}_{2})$ because of $\lambda _{1}\gt 0$ . Given the large excess reserves, the bank cannot provide plentiful reserves to type 2 buyers because type 1 buyers could mimic them. Therefore, the bank would provide more currency/CBDC to type 1 buyers and less reserves to type 2 buyers.

Therefore, given the interest on reserves, $R^m$ , the inflation rate and the real interest rate on government bonds can be changed from the ones in the channel system. When $\lambda _{1}\gt 0$ , from (9)-(11) we obtain

(22) \begin{equation} \frac{1}{\beta r^{f}_{m}} := \frac{\mu ^{f}}{\beta R^m} =\frac{\rho u'(x^{f}_{1})}{R^m}+(1-\rho )u'(x^{f}_{2}), \end{equation}

(23) \begin{equation} \frac{1}{\beta r^{f}_{b}} :=q\frac{\mu ^{f}}{\beta } =u'(x^{f}_{2}). \end{equation}

where $\mu ^{i}$ , $r_{m}^{i}$ , $r_{b}^{i}$ denote the inflation rate, the rate of return on reserves, and the rate of return on government bonds in the channel system ( $c$ ) and floor system ( $f$ ), respectively, where $i=\{c,f\}$ .Footnote ³¹

Figure 3. Equilibrium in floor system.

In this case, the liquidity premia of reserves do not depend only on the collateral transactions market condition, because excess reserves can tighten the truth-telling constraint for the retail market transactions. Thus, the liquidity premium in reserves is calculated as a weighted average of the marginal utility in both types of trades as shown in (22).

Given $\lambda _{1}\gt 0$ , since the point $C$ is not achieved, the marginal rate of substitution between type 1 buyer’s consumption and type 2 buyer’s consumption, $\frac{u'(x^{f}_{1})}{u'(x^{f}_{2})}$ , is lower than the interest on reserves, $R^m$ . It is optimal for the banks to raise $x_{2}$ and reduce $x_{1}$ , but it is not feasible because they cannot reveal the types under private information. Therefore, there arises a positive liquidity premium on currency in (9) and a negative liquidity premium on reserves in (10) with $\lambda _{1}\gt 0$ . Moreover, the liquidity premium on government bonds is greater than the liquidity premium on reserves with $\lambda _{1}\gt 0$ in (11), because government bonds are more useful than reserves to reveal the types. Therefore, in equilibrium, we have a return dominance between reserves and government bonds, $r_m^f\gt r_b^f$ , as shown in (22)-(23) because $\frac{1}{q}\lt R^m$ and $R^m u'(x_{2})\gt u'(x_{1})$ holds when (21) binds. Thus, open-market operations, the exchange between reserves and government bonds, can be effective in this case. Notice that the nominal interest rate, $\frac{1}{q}$ , is lower than the interest on reserves, $R^m$ , in the model which actually happened in the U.S. federal funds market recently. In reality, the reason is based on a specific feature of the U.S. financial system, but our model shows that a similar phenomenon can occur when the reserve accounts are allowed to the public with large excess reserves.Footnote ³² When the people can use the reserves as CBDC, the reserves become more liquid. Thus, it can be difficult to distribute liquidity by types efficiently because the supply of illiquid assets such as government bonds is scarce with the large excess reserves. In this respect our result also emphasizes the role of illiquid assets to distribute liquidity efficiently as shown in Kocherlakota (Reference Kocherlakota2003).

4.4.2. Interest on reserves ( $\triangle R^m$ )

Given $\delta$ , if the interest rate on reserves, $R^m$ , is raised, then the equilibrium allocation $(x^{f}_{1},x^{f}_{2})$ also moves from point $F$ toward point $C$ in Figure 3 as the $FOC$ curve (21) shifts to the left.

Proposition 2. Given $\delta$ , both the inflation rate and the real interest rate on government bonds increase in the interest of reserves, $R^m$ , in the floor system with LER.

Proof. See the appendix.

When the interest on reserves goes up, the truth-telling constraint (21) is relaxed with higher $\lambda _{1}$ . Therefore, the liquidity premium in currency goes up while the liquidity premium in government bonds decreases additionally in the floor system with LER. So, the real interest rate on government bonds increases further than it would in the floor system without LER.

Table 1. Comparative statics

The effects of monetary policy implementations on the inflation rate and the real interest rates by different cases are summarized in Table 1. In the channel system only the open-market operations are effective, while only adjusting the interest on reserves is effective in the floor system without LER. In the floor system with LER, both adjusting the interest on reserves and the open-market operations are effective. Moreover, the direction of the real interest rate is opposite in the case of open-market operations.

5.1. Open-market operations( $\triangle \delta$ )

In Figure 2, given $R^m\in (1,\frac{1}{\tilde{q}})$ , as the central bank raises $\delta$ from $\tilde{\delta }$ to 1, the equilibrium allocation starts with the channel system regime and passes the floor system without LER regime and reaches floor system with LER regime. Since the open-market operations are ineffective in the floor without LER regime, in Figure 4 a once the equilibrium allocation arrives at the point $H$ with $\delta =\tilde{\delta }$ , it remains when $\delta$ increases further. When $\delta$ reaches $\hat{\delta }$ in the floor system with LER regime, raising $\delta$ tightens the binding incentive constraint (21), so the real interest rate goes up and the asset price falls. Therefore, we have a kink at the point $H$ and the feasibility of equilibrium allocations in the floor system with LER becomes restricted more than that in the channel system.

As summarized in Table 1, when $\delta$ increases, both the inflation rate and the real interest rate decrease in the channel system whereas the inflation rate falls and the real interest rate goes up in the floor system with LER, so we can describe the inflation rate and the rate of return on government bonds as shown in Figure 4 b. The dotted lines in Figure 4 b show the paths of the rates of return on currency/CBDC and government bonds when $\delta$ increases only in the channel system.

5.2. Interest on reserves( $\triangle R^m$ )

Similarly, given $\delta \in (\rho, 1)$ when the central bank raises $R^m$ from 1 to $\frac{1}{\tilde{q}}$ , the equilibrium allocation starts with the floor system without LER and reaches the floor system with LER as shown in Figure 2. Since changing the interest on reserves in the floor system without LER has the same effect as in the channel system, when $R^m$ is raised, the equilibrium allocation moves along the curve (24) from point $I$ to point $J$ in Figure 5 a. However, when $R^m$ increases, the real interest rate in the floor system with LER goes up further than one in the floor system without LER as shown in Proposition 3. Thus, the asset prices go down further and the feasibility equilibrium condition (24) moves towards the origin as described in Figure 5 a.

Given a sufficiently large excess reserve, $\delta$ , if $R^m$ is raised then the allocation moves from the floor system without LER into the floor system with LER in Figure 2. In this case both the inflation rate and the real interest rate increase either in the floor system without LER or in the floor system with LER. However, both the inflation rate and the real interest rate rise further in the floor system with LER as described in Figure 5 b.

Figure 5. Interest on reserves ( $\triangle R^m$ ).

5.3. Welfare

Since the utility and production functions are linear in the CM, all the surplus is generated from trades in the DM. So the welfare function is

(30) \begin{equation} W(x_{1},x_{2})=\rho \{u(x_{1})-x_{1}\}+(1-\rho )\{u(x_{2})-x_{2}\}+yA, \end{equation}

which consists of the trading gains in the DM and the dividend from the Lucas tree. However, it is important to consider the costs of operating a currency/CBDC system when we evaluate the effects of monetary policy. It includes not only the direct cost of managing the stock of currency and data in the central bank server, but also the indirect social costs to inhibit the illegal activities such as theft, counterfeiting, hacking, etc. One way to reflect this operating cost is to assume that a fraction $\omega$ of currency/CBDC trade is socially useless as suggested in Williamson (Reference Williamson2012, Reference Williamson2016). Then, our welfare measure becomes

(31) \begin{equation} \hat{W}(x_{1},x_{2})=\rho \{(1-\omega )u(x_{1})-x_{1}\}+(1-\rho )\{u(x_{2})-x_{2}\}+yA. \end{equation}

As shown in Figures 4 a and 5 a, raising $\delta$ and $R^m$ in the floor system with LER regime lead the feasibility equilibrium condition (24) to move towards the origin. So, if given $(\delta, R^m)$ an equilibrium allocation is located at the floor system with LER in Figure 2, there is a possibility to improve welfare by expanding the feasibility set. For example, by reducing $\delta$ to $\bar{\delta }$ , and then reducing $R^m$ in the floor system without LER regime, the allocation can move from point $G$ to point $H$ , and then to point $G'$ in Figure 4 a, where $\hat{W}$ represents the welfare curve. Similarly, by reducing $R^m$ to reach the floor system without LER regime, and then reducing $\delta$ to the channel system in Figure 2, the allocation can move from point $J$ to point $I$ , and then to point $J'$ in Figure 5 a. If there are no restrictions on the policy variables $(\delta, R^m)$ , the channel system with $\delta \in (\tilde{\delta },\rho ]$ and $R^m=1$ is desirable to maximize the feasibility of the equilibrium allocations.

Proposition 4 shows that reducing the amount of excess reserves can be beneficial when the cost of operating a currency/CBDC system is sufficiently large. If the cost of operating a currency/CBDC system is large, then it is optimal to raise the nominal interest rate high enough because it can discourage the currency trade. When the nominal interest rate goes up, the aggregate liquidity supply decreases further with the large excess reserves, thus a policy mix that raises the interest on reserves and reduces the excess reserves simultaneously can improve welfare.