Dirichlet Conditions refer to a set of mathematical criteria that a periodic function must satisfy for its Fourier series representation to converge at every point in its domain. These conditions ensure that the function is well-behaved, particularly concerning its continuity and the behavior of its discontinuities. They help in determining the convergence of the Fourier series, making it essential for analyzing periodic signals in various applications, including communications and control systems.
congrats on reading the definition of Dirichlet Conditions. now let's actually learn it.