In this textbook, an elegant and fresh approach to complex analysis of single and multiple variables is presented. After an introduction of Cauchy's integral theorem and analytic continuation, harmonic functions are discussed in the first part. The second part is concerned with functional analytic methods, such as the Bergman kernel, to tackle the theory of multiple variables. In this textbook, a concise approach to complex analysis of one and several variables is presented. After an introduction of Cauchy's integral theorem general versions of Runge's approximation theorem and Mittag-Leffler's theorem are discussed. The fi rst part ends with an analytic characterization of simply connected domains. The second part is concerned with functional analytic methods: Fréchet and Hilbert spaces of holomorphic functions, the Bergman kernel, and unbounded operators on Hilbert spaces to tackle the theory of several variables, in particular the inhomogeneous Cauchy-Riemann equations and the d-bar Neumann operator.ContentsComplex numbers and functionsCauchy's Theorem and Cauchy's formulaAnalytic continuationConstruction and approximation of holomorphic functionsHarmonic functionsSeveral complex variablesBergman spacesThe canonical solution operator toNuclear Fréchet spaces of holomorphic functionsThe -complexThe twisted -complex and Schrödinger operators