Omniscience Principles and Functions of Bounded Variation

## Abstract It is known that, if __u__ is a real valued function on ℝ^__N__^ of bounded variation, then its total variation decreases under polarization. In this paper we identify the difference between the total variation of __u__ and that one of its polar __u__~Π~ (© 2009 WILEY‐VCH Verlag GmbH &

E. Helly's selection principle states that an infinite bounded family of real functions on the closed inter¨al, which is bounded in ¨ariation, contains a pointwise con¨ergent sequence whose limit is a function of bounded ¨ariation. We extend this theorem to metric space valued mappings of bounded va

~t ~s i ## I l -i s n R arbitrary The function 11./1 is a norm on the set V , of all functions f wit,h f ( 0 ) = 0. supplied with this norm I ; , is a BAXACH space. For p=-1 set ct,(f) = Iim sup ( lf(ti) -/(ti -,) i p)i 'p

Complementary spaces for Fourier series were introduced by G. Goes and generalized by M. Tynnov. In this paper we investigate a notion of complementary space for double Fourier series of functions of bounded variation. Various applications are given.

## Abstract Let __I__, __J__ ⊂ ℝ be intervals. The main result says that if a superposition operator __H__ generated by a function of two variables __h__: __I__ × __J__ → ℝ, __H__ (__φ__)(__x__) ≔ __h__ (__x__, __φ__ (__x__)), maps the set __BV__ (__I__, __J__) of all bounded variation functions,