15-metre class

A rational difference equation is a nonlinear difference equation of the form^[1][2]

${\displaystyle x_{n+1}=\frac{\alpha +{\displaystyle \sum _{i=0}^k}{\beta }_i{x}_{n-i}}{A+{\displaystyle \sum _{i=0}^k}{B}_i{x}_{n-i}},}$

where the initial conditions ${\displaystyle x_0,x_{-1},\dots ,x_{-k}}$ are such that the denominator is never zero for any ${\displaystyle n}$.

First-order rational difference equation

A first-order rational difference equation is a nonlinear difference equation of the form

${\displaystyle w_{t+1}=\frac{a{w}_t+b}{c{w}_t+d}.}$

When ${\displaystyle a,b,c,d}$ and the initial condition ${\displaystyle w_0}$ are real numbers, this difference equation is called a Riccati difference equation.^[2]

Such an equation can be solved by writing ${\displaystyle w_t}$ as a nonlinear transformation of another variable ${\displaystyle x_t}$ which itself evolves linearly. Then standard methods can be used to solve the linear difference equation in ${\displaystyle x_t}$.

Solving a first-order equation

First approach

One approach ^[3] to developing the transformed variable ${\displaystyle x_t}$, when ${\displaystyle ad-bc\ne 0}$, is to write

${\displaystyle y_{t+1}=\alpha -\frac{\beta }{y_t}}$

where ${\displaystyle \alpha =(a+d)/c}$ and ${\displaystyle \beta =(ad-bc)/c^2}$ and where ${\displaystyle w_t=y_t-d/c}$. Further writing ${\displaystyle y_t=x_{t+1}/x_t}$ can be shown to yield

${\displaystyle x_{t+2}-\alpha x_{t+1}+\beta x_t=0.}$

Second approach

This approach ^[4] gives a first-order difference equation for ${\displaystyle x_t}$ instead of a second-order one, for the case in which ${\displaystyle (d-a{)}^2+4bc}$ is non-negative. Write ${\displaystyle x_t=1/(\eta +w_t)}$ implying ${\displaystyle w_t=(1-\eta x_t)/x_t}$, where ${\displaystyle \eta }$ is given by ${\displaystyle \eta =(d-a+r)/2c}$ and where ${\displaystyle r=\sqrt{(d-a{)}^2+4bc}}$. Then it can be shown that ${\displaystyle x_t}$ evolves according to

${\displaystyle x_{t+1}=\frac{(d-\eta c)x_t}{\eta c+a}+\frac{c}{\eta c+a}.}$

Application

It was shown in ^[5] that a dynamic matrix Riccati equation of the form

${\displaystyle H_{t-1}=K+A^{\prime }{H}_{t}A-A^{\prime }{H}_{t}C(C^{\prime }{H}_{t}C{)}^{-1}{C}^{\prime }{H}_{t}A,}$

which can arise in some discrete-time optimal control problems, can be solved using the second approach above if the matrix C has only one more row than column.

References

See also

• Newth, Gerald, "World order from chaotic beginnings," Mathematical Gazette 88, March 2004, 39-45, for a trigonometric approach.

• Simons, Stuart, "A non-linear difference equation," Mathematical Gazette 93, November 2009, 500-504.