Infinite Analysis Seminar Tokyo
Seminar information archive ~12/07|Next seminar|Future seminars 12/08~
Date, time & place | Saturday 13:30 - 16:00 117Room #117 (Graduate School of Math. Sci. Bldg.) |
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2010/09/11
13:00-17:00 Room #117 (Graduate School of Math. Sci. Bldg.)
Masahiko Ito (School of Science and Technology for Future Life, Tokyo Denki University) 13:00-14:00
Three-term recurrence relations for a $BC_n$-type basic hypergeometric function and their application (JAPANESE)
TBA (JAPANESE)
Masato Taki (YITP Kyoto Univ.) 16:00-17:00
AGT conjecture and geometric engineering (JAPANESE)
Masahiko Ito (School of Science and Technology for Future Life, Tokyo Denki University) 13:00-14:00
Three-term recurrence relations for a $BC_n$-type basic hypergeometric function and their application (JAPANESE)
[ Abstract ]
$BC_n$-type basic hypergeometric series are a certain $q$-analogue
of an integral representation for the Gauss hypergeometric function.
They are defined as multiple $q$-series satisfying Weyl group symmetry of type $C_n$,
and they are a multi-sum generalization of the basic hypergeometric series
in a class of what is called (very-)well-poised. In my talk I will explain
an explicit expression for the $q$-difference system of rank $n+1$
satisfied by a $BC_n$-type basic hypergeometric series with 6+1 parameters
as first order simultaneous $q$-difference equations with a concrete basis.
For this purpose I introduce two types of symmetric Laurent polynomials
which I call the $BC$-type interpolation polynomials. The polynomials satisfy
three-term relations like a contiguous relation for the Gauss hypergeometric
function. As an application, I will show another proof for the product formula
of the $q$-integral introduced by Gustafson.
Masatoshi Noumi (Kobe Univ.) 14:30-15:30$BC_n$-type basic hypergeometric series are a certain $q$-analogue
of an integral representation for the Gauss hypergeometric function.
They are defined as multiple $q$-series satisfying Weyl group symmetry of type $C_n$,
and they are a multi-sum generalization of the basic hypergeometric series
in a class of what is called (very-)well-poised. In my talk I will explain
an explicit expression for the $q$-difference system of rank $n+1$
satisfied by a $BC_n$-type basic hypergeometric series with 6+1 parameters
as first order simultaneous $q$-difference equations with a concrete basis.
For this purpose I introduce two types of symmetric Laurent polynomials
which I call the $BC$-type interpolation polynomials. The polynomials satisfy
three-term relations like a contiguous relation for the Gauss hypergeometric
function. As an application, I will show another proof for the product formula
of the $q$-integral introduced by Gustafson.
TBA (JAPANESE)
Masato Taki (YITP Kyoto Univ.) 16:00-17:00
AGT conjecture and geometric engineering (JAPANESE)