
arXiv: 2211.12564
We show that the Peetre $K$-functional between the space $L_p$ with $0
Mathematics - Functional Analysis, fractional derivatives, Fractional derivatives and integrals, Mathematics - Classical Analysis and ODEs, Trigonometric approximation, homogeneous multipliers, quadrature formula, 26A33, 46E35, 42A10, 42A45, 41A30, Sobolev spaces and other spaces of ``smooth'' functions, embedding theorems, trace theorems, Multipliers in one variable harmonic analysis, Approximation by other special function classes, \(K\)-functional, \(L_p\),\(0<p<1\)
Mathematics - Functional Analysis, fractional derivatives, Fractional derivatives and integrals, Mathematics - Classical Analysis and ODEs, Trigonometric approximation, homogeneous multipliers, quadrature formula, 26A33, 46E35, 42A10, 42A45, 41A30, Sobolev spaces and other spaces of ``smooth'' functions, embedding theorems, trace theorems, Multipliers in one variable harmonic analysis, Approximation by other special function classes, \(K\)-functional, \(L_p\),\(0<p<1\)
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