Publication: Interpolation of nonlinear maps
Interpolation of nonlinear maps
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Kappeler, T., Savchuk, A. M., Shkalikov, A. A., & Topalov, P. (2014). Interpolation of nonlinear maps. Mathematical Notes, 96(5–6), 896–904. https://doi.org/10.1134/S0001434614110339
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Let (X0, X1) and (Y0, Y1) be complex Banach couples and assume that X1 ⊆ X0 with norms satisfying ‖x‖X0 ≤ c‖x‖X1 for some c > 0. For any 0 < θ < 1, denote by Xθ = [X0, X1]θ and Yθ = [Y0, Y1] the complex interpolation spaces and by B(r, Xθ), 0 ≤ θ ≤ 1, the open ball of radius r > 0 in Xθ centered at zero. Then, for any analytic map Φ: B(r, X0) → Y0 + Y1 such that Φ: B(r, X0) → Y0 and Φ: B(c−1r, X1) → Y1 are continuous and bounded by constants M0 and M1, respectively, the restriction of Φ to B(c−θr, Xχ), 0 < θ < 1, is shown to be a map
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- Kappeler, Thomas
- Savchuk, A M
- Shkalikov, A A
- Topalov, P
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Kappeler, T., Savchuk, A. M., Shkalikov, A. A., & Topalov, P. (2014). Interpolation of nonlinear maps. Mathematical Notes, 96(5–6), 896–904. https://doi.org/10.1134/S0001434614110339
