The of (f) is defined as the vector field in the plane given by
The field ((v, u)) appears as the Pólya field of (-i f(z)). Connection to harmonic functions Since (f) is analytic, (u) and (v) are harmonic and satisfy the Cauchy–Riemann equations:
We want (\mathbfV_f = (u, -v) = (\partial \psi / \partial y,; -\partial \psi / \partial x)). From the first component: (\partial \psi / \partial y = u). From the second: (-\partial \psi / \partial x = -v \Rightarrow \partial \psi / \partial x = v).
Thus (\nabla \psi = (v, u)). Check integrability: (\partial_x (v) = v_x = u_y) and (\partial_y (u) = u_y) — they match. So (\psi) exists (since domain simply connected). So:
Polya Vector Field Page
The of (f) is defined as the vector field in the plane given by
The field ((v, u)) appears as the Pólya field of (-i f(z)). Connection to harmonic functions Since (f) is analytic, (u) and (v) are harmonic and satisfy the Cauchy–Riemann equations: polya vector field
We want (\mathbfV_f = (u, -v) = (\partial \psi / \partial y,; -\partial \psi / \partial x)). From the first component: (\partial \psi / \partial y = u). From the second: (-\partial \psi / \partial x = -v \Rightarrow \partial \psi / \partial x = v). The of (f) is defined as the vector
Thus (\nabla \psi = (v, u)). Check integrability: (\partial_x (v) = v_x = u_y) and (\partial_y (u) = u_y) — they match. So (\psi) exists (since domain simply connected). So: polya vector field