000			02230pam a2200409 a 4500
001			4417368
003			RPAM
005			20160624102318.0
006			m b 000 0
007			cr/|||||||||||
008			140928s1994 riu ob 000 0 eng
020			_a9781470400934 (online)
040			_aDLC _cDLC _dDLC _dRPAM
050	0	0	_aQA3 _b.A57 no. 516 _aQA351
082	0	0	_a510 s _a515/.52 _220
100	1		_aKadell, Kevin W. J., _d1950-
245	1	2	_aA proof of the q-Macdonald-Morris conjecture for BCn / _h[electronic resource] _cKevin W.J. Kadell.
260			_aProvidence, R.I. : _bAmerican Mathematical Society, _cc1994.
300			_a1 online resource (vi, 80 p.)
490	0		_aMemoirs of the American Mathematical Society, _x0065-9266 (print); _x1947-6221 (online); _vv. 516
500			_aOn t.p. "n" is subscript.
500			_a"Volume 108, number 516 (first of 5 numbers)."
504			_aIncludes bibliographical references (p. 79-80).
505	0	0	_t1. Introduction _t2. Outline of the proof and summary _t3. The simple roots and reflections of $B_n$ and $C_n$ _t4. The $q$-engine of our $q$-machine _t5. Removing the denominators _t6. The $q$-transportation theory for $BC_n$ _t7. Evaluation of the constant terms $A$, $E$, $K$, $F$ and $Z$ _t8. $q$-analogues of some functional equations _t9. $q$-transportation theory revisited _t10. A proof of Theorem 4 _t11. The parameter $r$ _t12. The $q$-Macdonald-Morris conjecture for $B_n$, $B^\vee _n$, $C_n$, $C^\vee _n$ and $D_n$ _t13. Conclusion
506	1		_aAccess is restricted to licensed institutions
533			_aElectronic reproduction. _bProvidence, Rhode Island : _cAmerican Mathematical Society. _d2012
538			_aMode of access : World Wide Web
588			_aDescription based on print version record.
650		0	_aBeta functions.
650		0	_aDefinite integrals.
650		0	_aSelberg trace formula.
776	0		_iPrint version: _aKadell, Kevin W. J., 1950- _tproof of the q-Macdonald-Morris conjecture for BCn / _w(DLC) 93048293 _x0065-9266 _z9780821825525
786			_dAmerican mathematical Society
856	4		_3Contents _uhttp://www.ams.org/memo/0516
856	4		_3Contents _uhttp://dx.doi.org/10.1090/memo/0516
942			_2EBK12969 _cEBK
999			_c42263 _d42263