In
number theory one may study a
Diophantine equation, for example, modulo
p for all primes
p, looking for constraints on solutions. The next step is to look modulo prime powers, and then for solutions in the
p-adic field. This kind of local analysis provides conditions for solution that are
necessary. In cases where local analysis (plus the condition that there are real solutions) provides also
sufficient conditions, one says that the
Hasse principle holds: this is the best possible situation. It does for
quadratic forms, but certainly not in general (for example for
elliptic curves). The point of view that one would like to understand what extra conditions are needed has been very influential, for example for
cubic forms. Some form of local analysis underlies both the standard applications of the
Hardy–Littlewood circle method in
analytic number theory, and the use of
adele rings, making this one of the unifying principles across number theory. == See also ==