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Harmonic differentialIn mathematics, a real differential one-form ω on a surface is called a harmonic differential if ω and its conjugate one-form, written as ω∗, are both closed. ExplanationConsider the case of real one-forms defined on a two dimensional real manifold. Moreover, consider real one-forms that are the real parts of complex differentials. Let ω = A dx + B dy, and formally define the conjugate one-form to be ω∗ = A dy − B dx. MotivationThere is a clear connection with complex analysis. Let us write a complex number z in terms of its real and imaginary parts, say x and y respectively, i.e. z = x + iy. Since ω + iω∗ = (A − iB)(dx + i dy), from the point of view of complex analysis, the quotient (ω + iω∗)/dz tends to a limit as dz tends to 0. In other words, the definition of ω∗ was chosen for its connection with the concept of a derivative (analyticity). Another connection with the complex unit is that (ω∗)∗ = −ω (just as i2 = −1). For a given function f, let us write ω = df, i.e. ω = ∂f/∂x dx + ∂f/∂y dy, where ∂ denotes the partial derivative. Then (df)∗ = ∂f/∂x dy − ∂f/∂y dx. Now d((df)∗) is not always zero, indeed d((df)∗) = Δf dx dy, where Δf = ∂2f/∂x2 + ∂2f/∂y2. Cauchy–Riemann equationsAs we have seen above: we call the one-form ω harmonic if both ω and ω∗ are closed. This means that ∂A/∂y = ∂B/∂x (ω is closed) and ∂B/∂y = −∂A/∂x (ω∗ is closed). These are called the Cauchy–Riemann equations on A − iB. Usually they are expressed in terms of u(x, y) + iv(x, y) as ∂u/∂x = ∂v/∂y and ∂v/∂x = −∂u/∂y. Notable results
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