On the concatenability of solutions of partial differential equations
Abstract
Let D'(Rd) denote the space of distributions on Rd. For a linear partial different equation p(∂∂ x1,·s, ∂∂ xd, ∂∂ t) u=0 (briefly Dpu=0) corresponding to a polynomial p∈ C[1,·s, d,τ], let Sp:=\u∈ C(R, D'(Rd)):Dpu=0\. The set Sp has the `concatenability property' if whenever u1,u2∈ Sp C1(R, D'(Rd)) are such that u1(0)=u2(0), their concatenation u1\& u2 (defined to be u1(t) for t 0, and u2(t) for t 0) belongs to Sp. It is shown that for p=a0+a1τ+·s+adτd∈ C[1,·s, d][τ], where a0,·s, ad∈ C[1,·s, d] and d∈ N, Sp has the concatenation property if and only if d=1.
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