Abstract
The simplest linear partial differential equations whose local solvability is not automatic are those defined by complex, smooth, nowhere vanishing vector fields in regions of the plane. Let \(L = A\left( {{x_1},{x_2}} \right)\partial /\partial {x_1} + B\left( {{x_1},{x_2}} \right)\partial /{\partial _2} \) be such a vector field, defined in a domain Ω ⊂ R 2. The (inhomogeneous) equation $$Lu = f$$ (1) is said to be locally solvable at a point O ∈ Ω if there is an open neighborhood U ⊂ Ω of O such that, given any f ∈ C ∞(Ω), there is a distribution u ∈ D′(U) that satisfies (1) in the open set U. One can vary this definition by asking that u be a C ∞ function, in which case one may talk of local solvability in C ∞; or by asking that there be a distribution solution u in U, for each f ∈ D′(Ω). A moment of thought will also show that there is no loss of generality if we restrict our attention to right hand sides f whose support is compact and contained in U.
Sign-in/Register to access full text options 
Free) 
Talk to us
Join us for a 30 min session where you can share your feedback and ask us any queries you have
Schedule a call
