Euler partial differential equations and Schwartz distributions
Abstract
Euler operators are partial differential operators of the form P(θ) where P is a polynomial and θj = xj ∂/∂ xj. They are surjective on the space of temperate distributions on Rd. We show that this is, in general, not true for the space of Schwartz distributions on Rd, d 3, for d=1, however, it is true. It is also true for the space of distributions of finite order on Rd and on certain open sets ⊂ Rd, like the euclidian unit ball.
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