Abstract
Abstract
In this survey the circle problem is treated in the broad sense, as the problem of the asymptotic properties of the quantity
, the remainder term in the circle problem. A survey of recent results in this direction is presented. The main focus is on the behaviour of
on short intervals. Several conjectures on the local behaviour of
which lead to a solution of the circle problem are presented. A strong universality conjecture is stated which links the behaviour of
with the behaviour of the second term in Weyl’s formula for the Laplace operator on a closed Riemannian 2-manifold with integrable geodesic flow.
Bibliography: 43 titles.
Cited by
6 articles.
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