Operational Umbral Calculus (2407.16348v3)

Abstract: In this paper, we explore the effectiveness of almost purely operational methods in the study of umbral calculus. To accomplish this goal, we systematically reconstruct the theory operationally, offering new proofs and results throughout. Our approach is applied to the study of invertible power series, where we notably offer a concise two-line proof of Lagrange's inversion theorem, derive formulas for both fractional and regular compositional iterates and generalize Jabotinsky matrices. In addition, we will develop several new insights into umbral operators, including their fractional exponents and novel expressions, in connection with the previously discussed applications. Finally, we will elaborate on both established and new concepts and examples, such as pseudoinverses of delta operators and a natural generalization of the Laguerre polynomials.