Bernstein inequality on conic domains and triangle
Abstract
We establish weighted Bernstein inequalities in Lp space for the doubling weight on the conic surface V0d+1 = \(x,t): \|x\| = t, x ∈ Rd, t∈ [0,1]\ as well as on the solid cone bounded by the conic surface and the hyperplane t =1, which becomes a triangle on the plane when d=1. While the inequalities for the derivatives in the t variable behave as expected, there are inequalities for the derivatives in the x variables that are stronger than what one may have expected. As an example, on the triangle \(x1,x2): x1 0, \, x2 0,\, x1+x2 1\, the usual Bernstein inequality for the derivative ∂1 states that \|φ1 ∂1 f\|p,w c n \|f\|p,w with φ1(x1,x2):= x1(1-x1-x2), whereas our new result gives \| (1-x2)-1/2 φ1 ∂1 f\|p,w c n \|f\|p,w. The new inequality is stronger and points out a phenomenon unobserved hitherto for polygonal domains.
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