Truncated K-moment problems in several variables
Abstract
Let ββ(2n) be an N-dimensional real multi-sequence of degree 2n, with associated moment matrix M(n) M(n)(β), and let r:=rank M(n). We prove that if M(n) is positive semidefinite and admits a rank-preserving moment matrix extension M(n+1), then M(n+1) has a unique representing measure μ, which is r-atomic, with supp μ equal to V(M(n+1)), the algebraic variety of M(n+1). Further, β has an r-atomic (minimal) representing measure supported in a semi-algebraic set KQ subordinate to a family Q% \qi\i=1m⊂eqR[t1,...,tN] if and only if M(n) is positive semidefinite and admits a rank-preserving extension M(n+1) for which the associated localizing matrices Mqi(n+[1+ qi2]) are positive semidefinite (1≤ i≤ m); in this case, μ (as above) satisfies supp μ⊂eq KQ, and μ has precisely rank M(n)-rank Mqi(n+[1+ qi2]) atoms in Z(qi) t∈RN:qi(t)=0, 1≤ i≤ m$.
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