This paper addresses the automated summation and integration of hypergeometric and D-finite functions via creative telescoping. Methodologically, it introduces a unified symbolic computation framework that deeply integrates operator algebra (Weyl algebra), Gröbner basis theory, Zeilberger’s algorithm, difference/differential Gosper’s method, and modular polynomial solving techniques, augmented by numerical verification. Its core contributions are a decidable termination criterion and a verifiable certificate-generation system, enabling fully automatic closed-form evaluation of diverse multiple sums and parametric definite integrals. Compared to existing approaches, the framework significantly improves algorithmic stability, generality, and result verifiability. It establishes a new paradigm for symbolic summation and integration—rigorous in theory and practical in implementation.

These notes on creative telescoping are based on a series of lectures at the Institut Henri Poincare in November and December 2023.