In monetary economics, the equation of exchange is the relation:
M ⋅ V=P ⋅ Q
where, for a given period,
M
V
P
Q
Thus PQ is the level of nominal expenditures. This equation is a rearrangement of the definition of velocity: V = PQ / M. As such, without the introduction of any assumptions, it is a tautology. The quantity theory of money adds assumptions about the money supply, the price level, and the effect of interest rates on velocity to create a theory about the causes of inflation and the effects of monetary policy.
In earlier analysis before the wide availability of the national income and product accounts, the equation of exchange was more frequently expressed in transactions form:
M ⋅ VT=P ⋅ T
VT
T
The foundation of the equation of exchange is the more complex relation:
M ⋅ VT=\sumi(pi ⋅
| T ⋅ q | |
| q | |
| i)=p |
pi
qi
| pT |
pi
q
qi
M ⋅ VT=P ⋅ T
M ⋅ VT=P ⋅
| T ⋅ q) | |
| (p | |
| real |
=P ⋅ T
| T | |
| p | |
| real |
M ⋅ V=P ⋅ Q.
In 2008 economist Andrew Naganoff (Russian: Эндрю Наганов) proposed an integral form of the equation of exchange, where on the left side of the equation is
M(V)dV
PiQi
N
N
\int M(V)dV
| N | |
| \sum\limits | |
| i=1 |
{kiPiQi}
and
| b | |
| \int\limits | |
| a |
M(V)dV
| N | |
| \leqslant\sum\limits | |
| i=1 |
{kiPiQi}
The simplest cases for the dissipative scaling factors and
PiQi
ki=\pm1
PiQi=const
Also,
ki
W'(V)=M(V)
| Vmax | |
| \int\limits | |
| 0 |
M(V)dV
M(Vm)Vmax=W(Vmax)-W(0)
Naganoff's formula is used to describe in details the processes of inflation and deflation, Internet trading and cryptocurrencies.
The quantity theory of money is most often expressed and explained in mainstream economics by reference to the equation of exchange. For example, a rudimentary theory could begin with the rearrangement
| P= | M ⋅ V |
| Q |
V
Q
| dP | |
| P |
=
| dM | |
| M |
| dP/P | = | |
| dt |
| dM/M | |
| dt |
t
V
Q
An opponent of the quantity theory would not be bound to reject the equation of exchange, but could instead postulate offsetting responses (direct or indirect) of
Q
V
| dM/M | |
| dt |
Economists Alfred Marshall, A.C. Pigou, and John Maynard Keynes, associated with Cambridge University, focusing on money demand instead of money supply, argued that a certain portion of the money supply will not be used for transactions, but instead it will be held for the convenience and security of having cash on hand. This proportion of cash is commonly represented as
k
nY
MD=k ⋅ nY
Q
MD=k ⋅ P ⋅ Q
Assuming that the economy is at equilibrium (
MD=M
| M ⋅ | 1 |
| k |
=P ⋅ Q
The money demand function is often conceptualized in terms of a liquidity function,
L(r,Y)
MD=P ⋅ L(r,Y)
Y
r
V
r
| L(r,Q)= | Q |
| V(r) |
The equation of exchange was stated by John Stuart Mill[2] who expanded on the ideas of David Hume.[3] The algebraic formulation comes from Irving Fisher, 1911.