English

Interpolation of nonlinear maps

Functional Analysis 2014-05-19 v1

Abstract

Let (X0,X1)(X_0, X_1) and (Y0,Y1)(Y_0, Y_1) be complex Banach couples and assume that X1X0X_1\subseteq X_0 with norms satisfying xX0cxX1\|x\|_{X_0} \le c\|x\|_{X_1} for some c>0c > 0. For any 0<θ<10<\theta <1, denote by Xθ=[X0,X1]θX_\theta = [X_0, X_1]_\theta and Yθ=[Y0,Y1]θY_\theta = [Y_0, Y_1]_\theta the complex interpolation spaces and by B(r,Xθ)B(r, X_\theta), 0θ1,0 \le \theta \le 1, the open ball of radius r>0r>0 in XθX_\theta, centered at zero. Then for any analytic map Φ:B(r,X0)Y0+Y1\Phi: B(r, X_0) \to Y_0+ Y_1 such that Φ:B(r,X0)Y0\Phi: B(r, X_0)\to Y_0 and Φ:B(c1r,X1)Y1\Phi: B(c^{-1}r, X_1)\to Y_1 are continuous and bounded by constants M0M_0 and M1M_1, respectively, the restriction of Φ\Phi to B(cθr,Xθ)B(c^{-\theta}r, X_\theta), 0<θ<1,0 < \theta < 1, is shown to be a map with values in YθY_\theta which is analytic and bounded by M01θM1θM_0^{1-\theta} M_1^\theta.

Keywords

Cite

@article{arxiv.1405.4253,
  title  = {Interpolation of nonlinear maps},
  author = {T. Kappeler and A. Savchuk and A. Shkalikov and P. Topalov},
  journal= {arXiv preprint arXiv:1405.4253},
  year   = {2014}
}
R2 v1 2026-06-22T04:16:19.952Z