Formalising the Local Compactness of the Adele Ring

The adele ring of a number field is a central object in modern number theory. Its status as a locally compact topological ring is one of the key reasons why, leading to its widespread use within the Langlands Program. We describe a formal proof that the adele ring of a number field is locally compact in the Lean 4 theorem prover. Our work includes the formalisations of new types, including the completion of a number field at an infinite place and the finite $S$-adele ring, as well as formal proofs that completions of a number field are locally compact and their rings of integers at finite places are compact.