What is the Condition for a Unique Solution in a Complex Functional Equation?

[utkarshakash]

Homework Statement

Suppose f(z) is a possibly complex valued function of a complex valued function of a complex number z, which satisfies a functional equation of the form af(z)+bf(\omega ^2 z)=g(z) for all z in C, where a and b are some fixed complex numbers and g(z) is some function of z and ω is cube root of unity (ω≠1), then f(z) can be determined uniquely if
a)a+b=0
b)a^2+b^2≠0
c)a^3+b^3≠0
d)a^3+b^3=0

The Attempt at a Solution

If I substitute ω^2z in place of z the equation reduces to
af(\omega ^2 z) + bf(\omega z) = g(\omega ^2 z)

Now if I add both eqns f(\omega ^2 z)(a+b)+af(z)+bf(\omega z)=g(z)+g(\omega ^2 z)

 

[pasmith]

Homework Statement

Suppose f(z) is a possibly complex valued function of a complex valued function of a complex number z, which satisfies a functional equation of the form af(z)+bf(\omega ^2 z)=g(z) for all z in C, where a and b are some fixed complex numbers and g(z) is some function of z and ω is cube root of unity (ω≠1), then f(z) can be determined uniquely if
a)a+b=0
b)a^2+b^2≠0
c)a^3+b^3≠0
d)a^3+b^3=0

The Attempt at a Solution

If I substitute ω^2z in place of z the equation reduces to
af(\omega ^2 z) + bf(\omega z) = g(\omega ^2 z)

Good start.

You have three unknowns f(z), f(\omega z), f(\omega^2 z), so to determine them uniquely you need three equations. You have the original functional equation and the result of substituting \omega^2 z in place of z; can you think of a way to obtain a third equation?

 

[utkarshakash]

Good start.

You have three unknowns f(z), f(\omega z), f(\omega^2 z), so to determine them uniquely you need three equations. You have the original functional equation and the result of substituting \omega^2 z in place of z; can you think of a way to obtain a third equation?

I substituted ωz in place of z.

af(\omega z) + bf(z) = g(\omega z)

Now If I add all the three eqns I get

(a+b)(f(z)+f(\omega z)+f(\omega ^2 z))=g(z)+g(\omega z)+g(\omega ^2 z)

 

[pasmith]

I substituted ωz in place of z.

af(\omega z) + bf(z) = g(\omega z)

Now If I add all the three eqns I get

(a+b)(f(z)+f(\omega z)+f(\omega ^2 z))=g(z)+g(\omega z)+g(\omega ^2 z)

You have
<br /> af(z) + bf(\omega^2 z) = g(z) \\<br /> af(\omega z) + bf(z) = g(\omega z) \\<br /> af(\omega^2 z) + bf(\omega z) = g(\omega^2 z)<br />
which is a system of linear simultaneous equations for the unknowns f(z), f(\omega z), f(\omega^2 z). What condition do a and b have to satisfy for this linear system to have a unique solution?