TY  - JOUR
ID  - zu214092
UR  - http://eprints.zu.edu.ua/14092/
IS  - 1
A1  - Sevost?yanov, ?. ?.
Y1  - 2012///
N2  - For a given domain D ? Rn, some families F of mappings f : D ! Rn,
n ? 2 are studied; such families are more general than the mappings with bounded
distortion. It is proved that a family is equicontinuous if
R1
?0
d?
?[??1(?)]
1
n?1
= 1,
where the integral depends on each mapping f 2 F, ? is a special function, and
?0 > 0 is fixed. Under similar restrictions, removability results are obtained for
isolated singularities of f. Also, analogs of the well-known Sokhotsky?Weierstrass
and Liouville theorems are proved.
JF  - Algebra i analiz
VL  - 24
TI  - On spatial mappings with integral restrictions on the characteristic
SP  - 1
AV  - public
EP  - 17
ER  -