The Proof of restriction conjecture In R3
Abstract
If S is a smooth compact surface in R3 with strictly positive second fundamental form, and ES is the corresponding extension operator, then we prove that for all p > 3, \|ES f\|Lp(R3) ≤ C(p, S)\|f\|L∞(S). The proof of restriction conjecture in R3 implies that Kakeya set conjecture is true when n=3.
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