000			02113nam a22003975a 4500
001			196-151029
003			CH-001817-3
005			20170613140832.0
006			a fot ||| 0|
007			cr nn mmmmamaa
008			151029e20150930sz fot ||| 0|eng d
020			_a9783037196557
024	7	0	_a10.4171/155 _2doi
040			_ach0018173
072		7	_aPBKG _2bicssc
084			_a46-xx _a42-xx _2msc
100	1		_aTriebel, Hans, _eauthor.
245	1	0	_aTempered Homogeneous Function Spaces _h[electronic resource] / _cHans Triebel
260	3		_aZuerich, Switzerland : _bEuropean Mathematical Society Publishing House, _c2015
264		1	_aZuerich, Switzerland : _bEuropean Mathematical Society Publishing House, _c2015
300			_a1 online resource (143 pages)
336			_atext _btxt _2rdacontent
337			_acomputer _bc _2rdamedia
338			_aonline resource _bcr _2rdacarrier
347			_atext file _bPDF _2rda
490	0		_aEMS Series of Lectures in Mathematics (ELM)
506	1		_aRestricted to subscribers: _uhttp://www.ems-ph.org/ebooks.php
520			_aIf one tries to transfer assertions for the inhomogeneous spaces $A^s_{p,q} (\mathbb R^n)$, $A \in \{B,F \}$, appropriately to their homogeneous counterparts ${\overset {\, \ast}{A}}{}^s_{p,q} (\mathbb R^n)$ within the framework of the dual pairing $\big( S(\mathbb R^n), S'(\mathbb R^n) \big)$ then it is hard to make a mistake as long as the parameters $p,q,s$ are restricted by $0 < p,q \le \infty$ and, in particular, $n(\frac {1}{p} – 1) < s < \frac {n}{p}$. It is the main aim of these notes to say what this means. This book is addressed to graduate students and mathematicians having a working knowledge of basic elements of the theory of function spaces, especially of type $B^s_{p,q}$ and $F^s_{p,q}$.
650	0	7	_aFunctional analysis _2bicssc
650	0	7	_aFunctional analysis _2msc
650	0	7	_aFourier analysis _2msc
700	1		_aTriebel, Hans, _eauthor.
856	4	0	_uhttps://doi.org/10.4171/155
856	4	2	_3cover image _uhttp://www.ems-ph.org/img/books/triebel_tempered_mini.jpg
942			_2EBK13864 _cEBK
999			_c50488 _d50488