3.3 • HARMONIC FUNCTIONS 113is known as Laplace's equation (sometimes referred to as the pot ential equa-
tion). If</>, </>x, </>in </>xx, </>xy, </>yx. a.nd
fies Laplace's equation, then
important in applied mathematics, engineering, and mathematical physics. They
are used to solve problems involving steady state temperatures, two-dimensional
electrostatics, and ideal fluid flow. In Chapter 11 we describe how complex anal-
ysis techniques can be used to solve some problems involving harmonic functions.
We begin with an important theorem relating analytic and harmonic functions.
If we have a function tt (x, y) that is harmonic on the domain D and if we
can find another harmonic function v (x, y) such that the partial derivatives for
tt and v satisfy the Cauchy- Riemann equations throughout D, then we say that
v(x,y) is a harmonic conjugate ofu(x,y). It then follows t hat the function