@article {Armitage:October 1999:0021-9045:266,
	author = "Armitage D.H.",
	author = "Golitschek S.M.J.",
	title = "Best Harmonic and Superharmonic L1-Approximants in Strips",
	journal = "Journal of Approximation Theory",
	volume = "100",
	year = "October 1999",
	abstract = "<P>Let <B><IMG SRC="/iso-ents/isogrk32/omega-c.gif" ALT="Omega"></B> denote the open strip (-1,&#160;1)&#215;<IMG SRC="/iso-ents/isomopf/ropf-c.gif" ALT="Ropf"><SUP><B>n</B>-1</SUP>, where <B>n</B><IMG SRC="/iso-ents/isoamsr/ges.gif" ALT="ges">2. We completely solve the problem of characterizing a best harmonic <B>L</B><SUP>1</SUP>-approximant to a subharmonic function <B>s</B> on <B><IMG SRC="/iso-ents/isogrk32/omega-c.gif" ALT="Omega"></B> (all functions are assumed to be continuous and integrable on <B>&#175;<IMG SRC="/iso-ents/isogrk32/omega-c.gif" ALT="Omega"></B>). This characterization was previously known only under highly restrictive hypotheses on <B>s</B>. The approach of this paper is based, in part, on ideas used recently to solve the corresponding problem for the unit ball. However, the unboundedness of <B><IMG SRC="/iso-ents/isogrk32/omega-c.gif" ALT="Omega"></B> presents difficulties which require the use of new techniques and recent results from other branches of harmonic approximation theory. Superharmonic <B>L</B><SUP>1</SUP>-approximation of subharmonic functions is also treated.<B> Copyright 1999 Academic Press.</B></P>",
	pages = "266-283(18)",
	url = "http://www.ingentaconnect.com/content/ap/at/1999/00000100/00000002/art03331"
}