13,275 research outputs found
Banach Spaces as Data Types
We introduce the operators "modified limit" and "accumulation" on a Banach
space, and we use this to define what we mean by being internally computable
over the space. We prove that any externally computable function from a
computable metric space to a computable Banach space is internally computable.
We motivate the need for internal concepts of computability by observing that
the complexity of the set of finite sets of closed balls with a nonempty
intersection is not uniformly hyperarithmetical, and thus that approximating an
externally computable function is highly complex.Comment: 20 page
Proof mining in metric fixed point theory and ergodic theory
In this survey we present some recent applications of proof mining to the
fixed point theory of (asymptotically) nonexpansive mappings and to the
metastability (in the sense of Terence Tao) of ergodic averages in uniformly
convex Banach spaces.Comment: appeared as OWP 2009-05, Oberwolfach Preprints; 71 page
Discretization of variational regularization in Banach spaces
Consider a nonlinear ill-posed operator equation where is
defined on a Banach space . In general, for solving this equation
numerically, a finite dimensional approximation of and an approximation of
are required. Moreover, in general the given data \yd of are noisy.
In this paper we analyze finite dimensional variational regularization, which
takes into account operator approximations and noisy data: We show
(semi-)convergence of the regularized solution of the finite dimensional
problems and establish convergence rates in terms of Bregman distances under
appropriate sourcewise representation of a solution of the equation. The more
involved case of regularization in nonseparable Banach spaces is discussed in
detail. In particular we consider the space of finite total variation
functions, the space of functions of finite bounded deformation, and the
--space
Reified valuations and adic spectra
We revisit Huber's theory of continuous valuations, which give rise to the
adic spectra used in his theory of adic spaces. We instead consider valuations
which have been reified, i.e., whose value groups have been forced to contain
the real numbers. This yields reified adic spectra which provide a framework
for an analogue of Huber's theory compatible with Berkovich's construction of
nonarchimedean analytic spaces. As an example, we extend the theory of
perfectoid spaces to this setting.Comment: v5: refereed versio
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