Manifolds with Group Actions and Elliptic Operators
Vladimir I︠A︡kovlevich Lin · Yehuda Pinchover
ଜାନୁଆରୀ 1994 · American Mathematical Society: Memoirs of the American Mathematical Society540 ବହି · American Mathematical Soc.
ଇବୁକ୍
78
ପୃଷ୍ଠାଗୁଡ଼ିକ
ନିଃଶୁଳ୍କ ନମୁନା
ଏହି ଇବୁକ୍ ବିଷୟରେ
This work studies equivariant linear second order elliptic operators P on a connected noncompact manifold X with a given action of a group G . The action is assumed to be cocompact, meaning that GV=X for some compact subset V of X . The aim is to study the structure of the convex cone of all positive solutions of Pu= 0. It turns out that the set of all normalized positive solutions which are also eigenfunctions of the given G -action can be realized as a real analytic submanifold *G [0 of an appropriate topological vector space *H . When G is finitely generated, *H has finite dimension, and in nontrivial cases *G [0 is the boundary of a strictly convex body in *H. When G is nilpotent, any positive solution u can be represented as an integral with respect to some uniquely defined positive Borel measure over *G [0 . Lin and Pinchover also discuss related results for parabolic equations on X and for elliptic operators on noncompact manifolds with boundary.