Meeting “Quantum Physics and Bethe Ansatz”
![](data:image/png;base64,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)
![qm](https://www.dias.ie/wp-content/uploads/2012/06/qm.png)
Monday, 8 October; Tuesday, 09 October; Wednesday, 10 October 2012
At the Dublin Institute for Advanced Studies – School of Theoretical Physics
- Dr. Stefan Adams (Mathematics Institute, Warwick, England)
- Prof. Daniel An (SUNY Maritime, USA)
- Dr. Mathieu Beau (STP-DIAS, Dublin, Ireland)
- Prof. Jean-Bernard Bru (Dept. Math Leioa, Spain)
- Prof. Neil O’Connell (Mathematics Institute, Warwick, England)
- Prof. Horia Cornean (Dept. Math. Aalborg, Denmark)
- Prof. Tony Dorlas (STP-DIAS, Dublin, Ireland)
- Erik Eriksson (PhD student, Department of Physics University of Gothenburg)
- Prof. Holger Frahm (University Hannover, Germany)
- Dr. Natalia Iyudu (Dept. Math, Univ. Queen Mary, Belfast)
- Prof. Vladimir Korepin (C. N. Yang Institute for Theoretical Physics, Stony Brook, USA)
- Dr. Aleksei Kostenko (Vienna, Austria)
- Dr. Ivar Lyberg (STP-DIAS, Dublin, Ireland)
- Dr. Sonia Mazzucchi (CIRM, Trento, Italy)
- Dr. Ciara Morgan (CQT, Singapore)
- Valentin Murg (Faculty of Physics, Wien, Austria)
- Eoin Quinn (School of Mathematics, TCD, Ireland)
- Dr. Baptiste Savoie (Inst. Math. Bucarest, Romania)
- Prof. Alexander Stolin (Chalmers University Gothenburg, Sweden)
- Prof. Simon Ruijsenaars (Department of Applied Mathematics, School of Mathematics, University of Leeds, England)
- Prof. Valentin Zagrebnov (CPT Marseille, France)
- How to go from the airport to the City Center ?
- Aircoach service :
– Buses from DUBLIN AIRPORT to Pembroke Road . Warning : Take the bus direction BALLSBRIDGE / DONNYBROOK :
http://www.aircoach.ie/table.routes.ballsbridge.php.
– The Pembroke Townhouse Hotel [address: 90 Pembroke Road], is close (2 min) to the bus stop ‘Pembroke Road’ :
http://www.pembroketownhouse.ie/default.aspx?treeid=160
10 Burlington Road, Dublin 4.
To get the direction from the hotel to the Institute, click here
To find some informations about the institute, click on the link below
Directions
– Mathieu Beau
email adress : mbeau@stp.dias.ie
Phone : +353 1 6140147
– Tony Dorlas
email adress : dorlas@stp.dias.ie
Phone : +353 1 6140146
|
Sunday |
Monday |
Tuesday |
Wednesday |
Thursday |
9:00 – 9:50 |
|
Registration + Intro |
|
|
Departure |
9:50 – 10:40 |
|
Zagrebnov |
O’Connell |
Adams |
Departure |
10:40 – 11:00 |
|
Coffee Break |
Coffee Break |
Coffee Break |
Departure |
11:00 – 11:50 |
|
Ruijsenaars |
Bru |
Frahm |
Departure |
11:50 – 12:40 |
|
Mazzucchi |
Kostenko |
Morgan |
Departure |
12:40 – 14:10 |
|
Lunch |
Lunch |
Lunch |
|
14:10 – 14:40 |
Arrival |
Eriksson |
Murg |
Lyberg |
|
14:40 – 15:30 |
Arrival |
Cornean |
Korepin |
Quinn |
|
15:30 – 15:50 |
Arrival |
Coffee Break |
Coffee Break |
Coffee Break |
|
15:50 – 16:40 |
Arrival |
Savoie |
Iyudu |
Stolin |
|
16:40 – 17:30 |
Arrival |
An |
Beau |
Conclusion
|
|
17:30 – |
Arrival |
Cheese & Wine reception
|
Conference Dinner(19H)
|
Free |
|
To read the Titles and Abstracts, click here
- Monday, 8 October, 17:30 : Cheese and wine reception
- Tuesday, 9 October, 19:00 : Social Dinner
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Last Updated: 22nd March 2016 by Administrator
2012-10-08 Quantum Physics and Bethe Ansatz
Meeting “Quantum Physics and Bethe Ansatz”
Monday, 8 October; Tuesday, 09 October; Wednesday, 10 October 2012
At the Dublin Institute for Advanced Studies – School of Theoretical Physics
– Buses from DUBLIN AIRPORT to Pembroke Road . Warning : Take the bus direction BALLSBRIDGE / DONNYBROOK :
http://www.aircoach.ie/table.routes.ballsbridge.php.
– The Pembroke Townhouse Hotel [address: 90 Pembroke Road], is close (2 min) to the bus stop ‘Pembroke Road’ :
http://www.pembroketownhouse.ie/default.aspx?treeid=160
10 Burlington Road, Dublin 4.
To get the direction from the hotel to the Institute, click here
To find some informations about the institute, click on the link below
Directions
– Mathieu Beau
email adress : mbeau@stp.dias.ie
Phone : +353 1 6140147
– Tony Dorlas
email adress : dorlas@stp.dias.ie
Phone : +353 1 6140146
Conclusion
Cheese & Wine reception
Conference Dinner(19H)
To read the Titles and Abstracts, click here
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