ÀÛ¿ë¼Ò ¼Ò½Ä No.402 (2012.12.12)
À̸§: ±ÇÇö°æ
¼Ò¼Ó: The University of Alabama
Á¦¸ñ: Similarity of Operators and the Dirichlet Space
ÀϽÃ: 2012³â 12¿ù 18ÀÏ È¿äÀÏ ¿ÀÈÄ 3½Ã
Àå¼Ò: »ó»ê°ü 301È£
ÃÊ·Ï: In this talk, I will discuss how a recent result on Dirichlet contractions can be used to characterize similarity in the Dirichlet space setting.
À̸§: Stefaan Vaes
¼Ò¼Ó: Department of Mathematics, KU Leuven (Belgium)
Á¦¸ñ: On the classification of von Neumann algebras arising from free groups acting on probability spaces
ÀϽÃ: 2012³â 12¿ù 18ÀÏ È¿äÀÏ ¿ÀÈÄ 4½Ã
Àå¼Ò: »ó»ê°ü 301È£
¡Ø ¼¿ï´ë ÀÛ¿ë¼Ò ¼¼¹Ì³ª ȨÆäÀÌÁö http://www.math.snu.ac.kr/~kye/seminar/
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ÀÛ¿ë¼Ò ¼Ò½Ä No.401 (2012.11.28)
À̸§: À̿쿵
¼Ò¼Ó: ¼¿ï´ëÇб³
Á¦¸ñ: Halmos Problem 5
ÀϽÃ: 2012³â 11¿ù 30ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 4½Ã
Àå¼Ò: »ó»ê°ü 406È£
À̸§: ÇãÀ缺
¼Ò¼Ó: ÇѾç´ëÇб³
Á¦¸ñ: Kadison's problems on von Neumann algebras and other problems
ÀϽÃ: 2012³â 11¿ù 30ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 4½Ã 50ºÐ
Àå¼Ò: »ó»ê°ü 406È£
À̸§: ÇÑ°æÈÆ
¼Ò¼Ó: ¼ö¿ø´ëÇб³
Á¦¸ñ: The predual of the space of decomposable maps from a $C^*$-algebra into a von Neumann algebra
ÀϽÃ: 2012³â 11¿ù 30ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 5½Ã 20ºÐ
Àå¼Ò: »ó»ê°ü 406È£
¡Ø 11¿ù 30ÀÏ 6½ÃºÎÅÍ »ó»ê°ü 4Ãþ¿¡¼ ÀÛ¿ë¼Ò ¼¼¹Ì³ª 30ÁÖ³âÀ» ±â³äÇÏ´Â Á¶ÃÍÇÑ ÀÜÄ¡°¡ ÀÖÀ¸´Ï ¸¹Àº Âü¼®¹Ù¶ø´Ï´Ù.
À̸§: ±ÇÇö°æ
¼Ò¼Ó: The University of Alabama
Á¦¸ñ: TBA
ÀϽÃ: 2012³â 12¿ù 18ÀÏ È¿äÀÏ ¿ÀÈÄ 3½Ã
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Stefaan Vaes
¼Ò¼Ó: Department of Mathematics, KU Leuven (Belgium)
Á¦¸ñ: On the classification of von Neumann algebras arising from free groups acting on probability spaces
ÀϽÃ: 2012³â 12¿ù 18ÀÏ È¿äÀÏ ¿ÀÈÄ 4½Ã
Àå¼Ò: »ó»ê°ü 301È£
¡Ø ¼¿ï´ë ÀÛ¿ë¼Ò ¼¼¹Ì³ª ȨÆäÀÌÁö http://www.math.snu.ac.kr/~kye/seminar/
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ÀÛ¿ë¼Ò ¼Ò½Ä No.400 (2012.11.23)
À̸§: À̿쿵
¼Ò¼Ó: ¼¿ï´ëÇб³
Á¦¸ñ: Halmos Problem 5
ÀϽÃ: 2012³â 11¿ù 30ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 4½Ã
Àå¼Ò: »ó»ê°ü 406È£
À̸§: ÇãÀ缺
¼Ò¼Ó: ÇѾç´ëÇб³
Á¦¸ñ: Kadison's problems on von Neumann algebras and other problems
ÀϽÃ: 2012³â 11¿ù 30ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 4½Ã 50ºÐ
Àå¼Ò: »ó»ê°ü 406È£
À̸§: ÇÑ°æÈÆ
¼Ò¼Ó: ¼ö¿ø´ëÇб³
Á¦¸ñ: The predual of the space of decomposable maps from a $C^*$-algebra into a von Neumann algebra
ÀϽÃ: 2012³â 11¿ù 30ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 5½Ã 20ºÐ
Àå¼Ò: »ó»ê°ü 406È£
¡Ø 11¿ù 30ÀÏ 6½ÃºÎÅÍ »ó»ê°ü 4Ãþ¿¡¼ ÀÛ¿ë¼Ò ¼¼¹Ì³ª 30ÁÖ³âÀ» ±â³äÇÏ´Â Á¶ÃÍÇÑ ÀÜÄ¡°¡ ÀÖÀ¸´Ï ¸¹Àº Âü¼®¹Ù¶ø´Ï´Ù.
À̸§: ±ÇÇö°æ
¼Ò¼Ó: The University of Alabama
Á¦¸ñ: TBA
ÀϽÃ: 2012³â 12¿ù 18ÀÏ È¿äÀÏ ¿ÀÈÄ 3½Ã
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Stefaan Vaes
¼Ò¼Ó: Department of Mathematics, KU Leuven (Belgium)
Á¦¸ñ: On the classification of von Neumann algebras arising from free groups acting on probability spaces
ÀϽÃ: 2012³â 12¿ù 18ÀÏ È¿äÀÏ ¿ÀÈÄ 4½Ã
Àå¼Ò: »ó»ê°ü 301È£
¡Ø ¼¿ï´ë ÀÛ¿ë¼Ò ¼¼¹Ì³ª ȨÆäÀÌÁö http://www.math.snu.ac.kr/~kye/seminar/
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ÀÛ¿ë¼Ò ¼Ò½Ä No.399 (2012.11.14)
¡Ø 11¿ù 16ÀÏ¿¡´Â ¿ÀÀü ¼¼¹Ì³ª°¡ ¾ø°í, ÀÌÇöÈ£(¿ï»ê´ë), ÀÌÈÆÈñ(ÃæºÏ´ë)±³¼ö°¡ ÁÖ°üÇÏ´Â Á¦ 3ȸ Korea operator algebra seminar°¡ ¼¿ï´ë ¼öÇаú¿¡¼ ´ÙÀ½°ú °°ÀÌ ¿¸®´Ï ¸¹Àº Âü¼® ¹Ù¶ø´Ï´Ù.
À̸§: ±è¼±È£
¼Ò¼Ó: ¼¿ï´ëÇб³
Á¦¸ñ: Some remarks on labeled graph $C^*$-algebras
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 1½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Martijn Caspers
¼Ò¼Ó: Univ. of Franche at Comte. France
Á¦¸ñ: Quantum groups, Lp-spaces and Fourier theory
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 3½Ã
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Emmanuel Germain
¼Ò¼Ó: Univ. of Caen, France
Á¦¸ñ: Injective envelope and amenable actions
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 4½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¡Ø 11¿ù 23ÀÏ ¼ö½ÃÀÔÇÐ ¸éÁ¢ °ü°è·Î ºÎµæÀÌ ¼¼¹Ì³ª¸¦ ½±´Ï´Ù. À̳¯ °¿¬ÇϽñâ·Î Çß´ø ÀÌÁøÇü(ÇѾç´ë ¹°¸®Çаú) ±³¼öÀÇ °¿¬Àº ³»³âÀ¸·Î ¹Ì·ç°Ô µÇ¾ú½À´Ï´Ù.
À̸§: À̿쿵
¼Ò¼Ó: ¼¿ï´ëÇб³
Á¦¸ñ: Halmos Problem 5
ÀϽÃ: 2012³â 11¿ù 30ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 4½Ã
Àå¼Ò: »ó»ê°ü 406È£
À̸§: ÇÑ°æÈÆ
¼Ò¼Ó: ¼ö¿ø´ëÇб³
Á¦¸ñ: The predual of the space of decomposable maps from a $C^*$-algebra into a von Neumann algebra
ÀϽÃ: 2012³â 11¿ù 30ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 5½Ã
Àå¼Ò: »ó»ê°ü 406È£
¡Ø 11¿ù 30ÀÏ 6½ÃºÎÅÍ »ó»ê°ü 4Ãþ¿¡¼ ÀÛ¿ë¼Ò ¼¼¹Ì³ª 30ÁÖ³âÀ» ±â³äÇÏ´Â Á¶ÃÍÇÑ ÀÜÄ¡°¡ ÀÖÀ¸´Ï ¸¹Àº Âü¼®¹Ù¶ø´Ï´Ù.
À̸§: ±ÇÇö°æ
¼Ò¼Ó: The University of Alabama
Á¦¸ñ: TBA
ÀϽÃ: 2012³â 12¿ù 18ÀÏ È¿äÀÏ ¿ÀÈÄ 3½Ã
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Stefaan Vaes
¼Ò¼Ó: Department of Mathematics, KU Leuven (Belgium)
Á¦¸ñ: On the classification of von Neumann algebras arising from free groups acting on probability spaces
ÀϽÃ: 2012³â 12¿ù 18ÀÏ È¿äÀÏ ¿ÀÈÄ 4½Ã
Àå¼Ò: »ó»ê°ü 301È£
¡Ø ¼¿ï´ë ÀÛ¿ë¼Ò ¼¼¹Ì³ª ȨÆäÀÌÁö http://www.math.snu.ac.kr/~kye/seminar/
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ÀÛ¿ë¼Ò ¼Ò½Ä No.398 (2012.11.7)
À̸§: Á¤ÀϺÀ
¼Ò¼Ó: °æºÏ´ëÇб³
Á¦¸ñ: A non-hyponormal operator generating Stieltjes moment sequences
ÀϽÃ: 2012³â 11¿ù 9ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: »ó»ê°ü 301È£
¡Ø 11¿ù 16ÀÏ¿¡´Â ¿ÀÀü ¼¼¹Ì³ª°¡ ¾ø°í, ÀÌÇöÈ£(¿ï»ê´ë), ÀÌÈÆÈñ(ÃæºÏ´ë)±³¼ö°¡ ÁÖ°üÇÏ´Â Á¦ 3ȸ Korea operator algebra seminar°¡ ¼¿ï´ë ¼öÇаú¿¡¼ ´ÙÀ½°ú °°ÀÌ ¿¸®´Ï ¸¹Àº Âü¼® ¹Ù¶ø´Ï´Ù.
À̸§: ±è¼±È£
¼Ò¼Ó: ¼¿ï´ëÇб³
Á¦¸ñ: Some remarks on labeled graph $C^*$-algebras
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 1½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Martijn Caspers
¼Ò¼Ó: Univ. of Franche at Comte. France
Á¦¸ñ: Quantum groups, Lp-spaces and Fourier theory
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 3½Ã
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Emmanuel Germain
¼Ò¼Ó: Univ. of Caen, France
Á¦¸ñ: Injective envelope and amenable actions
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 4½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
À̸§: ÀÌÁøÇü
¼Ò¼Ó: ÇѾç´ë ¹°¸®Çаú
Á¦¸ñ: TBA
ÀϽÃ: 2012³â 11¿ù 23ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: »ó»ê°ü 301È£
À̸§: À̿쿵
¼Ò¼Ó: ¼¿ï´ëÇб³
Á¦¸ñ: Halmos Problem 5
ÀϽÃ: 2012³â 11¿ù 30ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 4½Ã
Àå¼Ò: »ó»ê°ü 406È£
À̸§: ÇÑ°æÈÆ
¼Ò¼Ó: ¼ö¿ø´ëÇб³
Á¦¸ñ: The predual of the space of decomposable maps from a $C^*$-algebra into a von Neumann algebra
ÀϽÃ: 2012³â 11¿ù 30ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 5½Ã
Àå¼Ò: »ó»ê°ü 406È£
À̸§: ±ÇÇö°æ
¼Ò¼Ó: University of Alabama
Á¦¸ñ: TBA
ÀϽÃ: 2012³â 12¿ù 18ÀÏ È¿äÀÏ ¿ÀÈÄ 3½Ã
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Stefaan Vaes
¼Ò¼Ó: Department of Mathematics, KU Leuven (Belgium)
Á¦¸ñ: On the classification of von Neumann algebras arising from free groups acting on probability spaces
ÀϽÃ: 2012³â 12¿ù 18ÀÏ È¿äÀÏ ¿ÀÈÄ 4½Ã
Àå¼Ò: »ó»ê°ü 301È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.397 (2012.10.31)
À̸§: °è½ÂÇõ
¼Ò¼Ó: ¼¿ï´ëÇб³
Á¦¸ñ: Separable states with unique decompositions
ÀϽÃ: 2012³â 11¿ù 2ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: 27-325
À̸§: Á¤ÀϺÀ
¼Ò¼Ó: °æºÏ´ëÇб³
Á¦¸ñ: A non-hyponormal operator generating Stieltjes moment sequences
ÀϽÃ: 2012³â 11¿ù 9ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: »ó»ê°ü 301È£
¡Ø 11¿ù 16ÀÏ¿¡´Â ¿ÀÀü ¼¼¹Ì³ª°¡ ¾ø°í, ÀÌÇöÈ£(¿ï»ê´ë), ÀÌÈÆÈñ(ÃæºÏ´ë) ±³¼ö°¡ ÁÖ°üÇÏ´Â Á¦ 3ȸ Korea operator algebra seminar°¡ ¼¿ï´ë ¼öÇаú¿¡¼ ´ÙÀ½°ú °°ÀÌ ¿¸®´Ï ¸¹Àº Âü¼® ¹Ù¶ø´Ï´Ù.
À̸§: ±è¼±È£
¼Ò¼Ó: ¼¿ï´ëÇб³
Á¦¸ñ: Some remarks on labeled graph $C^*$-algebras
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 1½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Martijn Caspers
¼Ò¼Ó: Univ. of Franche at Comte. France
Á¦¸ñ: Quantum groups, Lp-spaces and Fourier theory
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 3½Ã
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Emmanuel Germain
¼Ò¼Ó: Univ. of Caen, France
Á¦¸ñ: Injective envelope and amenable actions
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 4½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
À̸§: ÀÌÁøÇü
¼Ò¼Ó: ÇѾç´ë ¹°¸®Çаú
Á¦¸ñ: TBA
ÀϽÃ: 2012³â 11¿ù 23ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Stefaan Vaes
¼Ò¼Ó: Department of Mathematics, KU Leuven (Belgium)
Á¦¸ñ: On the classification of von Neumann algebras arising from free groups acting on probability spaces
ÀϽÃ: 2012³â 12¿ù 18ÀÏ È¿äÀÏ ¿ÀÈÄ 4½Ã
Àå¼Ò: »ó»ê°ü 301È£
¡Ø 11¿ù 2ÀÏÀº ´ëÇпø ÀԽà °ü°è·Î ¼¼¹Ì³ª½Ç Àå¼Ò¸¦ 27µ¿ 325È£·Î º¯°æÇÕ´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.396 (2012.10.24)
À̸§: Áöµ¿Ç¥
¼Ò¼Ó: ¼¿ï´ëÇб³
Á¦¸ñ: Quantum helps Classical
ÀϽÃ: 2012³â 10¿ù 26ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: »ó»ê°ü 301È£
À̸§: °è½ÂÇõ
¼Ò¼Ó: ¼¿ï´ëÇб³
Á¦¸ñ: Separable states with unique decompositions
ÀϽÃ: 2012³â 11¿ù 2ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: 27-325
À̸§: Á¤ÀϺÀ
¼Ò¼Ó: °æºÏ´ëÇб³
Á¦¸ñ: A non-hyponormal operator generating Stieltjes moment sequences
ÀϽÃ: 2012³â 11¿ù 9ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: »ó»ê°ü 301È£
¡Ø 11¿ù 16ÀÏ¿¡´Â ¿ÀÀü ¼¼¹Ì³ª°¡ ¾ø°í, ÀÌÇöÈ£(¿ï»ê´ë), ÀÌÈÆÈñ(ÃæºÏ´ë) ±³¼ö°¡ ÁÖ°üÇÏ´Â Á¦ 3ȸ Korea operator algebra seminar°¡ ¼¿ï´ë ¼öÇаú¿¡¼ ´ÙÀ½°ú °°ÀÌ ¿¸®´Ï ¸¹Àº Âü¼® ¹Ù¶ø´Ï´Ù.
À̸§: ±è¼±È£
¼Ò¼Ó: ¼¿ï´ëÇб³
Á¦¸ñ: Some remarks on labeled graph $C^*$-algebras
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 1½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Martijn Caspers
¼Ò¼Ó: Univ. of Franche at Comte. France
Á¦¸ñ: Quantum groups, Lp-spaces and Fourier theory
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 3½Ã
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Emmanuel Germain
¼Ò¼Ó: Univ. of Caen, France
Á¦¸ñ: Injective envelope and amenable actions
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 4½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
À̸§: ÀÌÁøÇü
¼Ò¼Ó: ÇѾç´ë ¹°¸®Çаú
Á¦¸ñ: TBA
ÀϽÃ: 2012³â 11¿ù 23ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Stefaan Vaes
¼Ò¼Ó: Department of Mathematics, KU Leuven (Belgium)
Á¦¸ñ: On the classification of von Neumann algebras arising from free groups acting on probability spaces
ÀϽÃ: 2012³â 12¿ù 18ÀÏ È¿äÀÏ ¿ÀÈÄ 4½Ã
Àå¼Ò: »ó»ê°ü 301È£
¡Ø 11¿ù 2ÀÏÀº ´ëÇпø ÀԽà °ü°è·Î ¼¼¹Ì³ª½Ç Àå¼Ò¸¦ 27µ¿ 325È£·Î º¯°æÇÕ´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.395 (2012.10.17)
À̸§: ±Çµµ¿ë
¼Ò¼Ó: Àü³²´ëÇб³
Á¦¸ñ: Devil's staircases arising from numeration
ÀϽÃ: 2012³â 10¿ù 19ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Áöµ¿Ç¥
¼Ò¼Ó: ¼¿ï´ëÇб³
Á¦¸ñ: Quantum helps Classical
ÀϽÃ: 2012³â 10¿ù 26ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Á¤ÀϺÀ
¼Ò¼Ó: °æºÏ´ëÇб³
Á¦¸ñ: A non-hyponormal operator generating Stieltjes moment sequences
ÀϽÃ: 2012³â 11¿ù 9ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: »ó»ê°ü 301È£
% 11¿ù 16ÀÏ¿¡´Â ¿ÀÀü ¼¼¹Ì³ª°¡ ¾ø°í, ÀÌÇöÈ£(¿ï»ê´ë), ÀÌÈÆÈñ(ÃæºÏ´ë) ±³¼ö°¡ ÁÖ°üÇÏ´Â Á¦ 3ȸ Korea operator algebra seminar°¡ ¼¿ï´ë ¼öÇаú¿¡¼ ´ÙÀ½°ú °°ÀÌ ¿¸®´Ï ¸¹Àº Âü¼® ¹Ù¶ø´Ï´Ù.
À̸§: ±è¼±È£
¼Ò¼Ó: ¼¿ï´ëÇб³
Á¦¸ñ: Some remarks on labeled graph $C^*$-algebras
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 1½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Martijn Caspers
¼Ò¼Ó: Univ. of Franche at Comte. France
Á¦¸ñ: Quantum groups, Lp-spaces and Fourier theory
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 3½Ã
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Emmanuel Germain
¼Ò¼Ó: Univ. of Caen, France
Á¦¸ñ: Injective envelope and amenable actions
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 4½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
À̸§: ÀÌÁøÇü
¼Ò¼Ó: ÇѾç´ë ¹°¸®Çаú
Á¦¸ñ: TBA
ÀϽÃ: 2012³â 11¿ù 23ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: »ó»ê°ü 301È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.394 (2012.10.10)
À̸§: ±Çµµ¿ë
¼Ò¼Ó: Àü³²´ëÇб³
Á¦¸ñ: Devil's staircases arising from numeration
ÀϽÃ: 2012³â 10¿ù 19ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Áöµ¿Ç¥
¼Ò¼Ó: ¼¿ï´ëÇб³
Á¦¸ñ: Quantum helps Classical
ÀϽÃ: 2012³â 10¿ù 26ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Á¤ÀϺÀ
¼Ò¼Ó: °æºÏ´ëÇб³
Á¦¸ñ: A non-hyponormal operator generating Stieltjes moment sequences
ÀϽÃ: 2012³â 11¿ù 9ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: »ó»ê°ü 301È£
% 11¿ù 16ÀÏ¿¡´Â ¿ÀÀü ¼¼¹Ì³ª°¡ ¾ø°í, ÀÌÇöÈ£(¿ï»ê´ë), ÀÌÈÆÈñ(ÃæºÏ´ë) ±³¼ö°¡ ÁÖ°üÇÏ´Â Á¦ 3ȸ Korea operator algebra seminar°¡ ¼¿ï´ë ¼öÇаú¿¡¼ ´ÙÀ½°ú °°ÀÌ ¿¸®´Ï ¸¹Àº Âü¼® ¹Ù¶ø´Ï´Ù.
À̸§: ±è¼±È£
¼Ò¼Ó: ¼¿ï´ëÇб³
Á¦¸ñ: Some remarks on labeled graph $C^*$-algebras
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 1½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Martijn Caspers
¼Ò¼Ó: Univ. of Franche at Comte. France
Á¦¸ñ: Quantum groups, Lp-spaces and Fourier theory
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 3½Ã
Àå¼Ò: »ó»ê°ü 301È£
À̸§: Emmanuel Germain
¼Ò¼Ó: Univ. of Caen, France
Á¦¸ñ: Injective envelope and amenable actions
ÀϽÃ: 2012³â 11¿ù 16ÀÏ ±Ý¿äÀÏ ¿ÀÈÄ 4½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
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¼Ò¼Ó: ÇѾç´ë ¹°¸®Çаú
Á¦¸ñ: TBA
ÀϽÃ: 2012³â 11¿ù 23ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10:30
Àå¼Ò: »ó»ê°ü 301È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.393 (2012.9.26)
¿¬»ç: ÀÌÀçÇù
¼Ò¼Ó: ¼¿ï´ëÇб³
Á¦¸ñ: Descriptive set theory and nonclassification of $C^*$-algebras
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ÀÛ¿ë¼Ò ¼Ò½Ä No.392 (2012.9.19)
¿¬»ç: ÇãÀ缺
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Á¦¸ñ: Notion of asymptotic derivation on operator algebras
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Á¦¸ñ: Descriptive set theory and nonclassification of $C^*$-algebras
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ÀÛ¿ë¼Ò ¼Ò½Ä No.391 (2012.9.12)
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Á¦¸ñ: Optimal indecomposable witnesses without extremality as well as spanning property
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Á¦¸ñ: Notion of asymptotic derivation on operator algebras
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ÀÛ¿ë¼Ò ¼Ò½Ä No.390 (2012.9.5)
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Á¦¸ñ: Normality of Toeplitz operators and kernels of Toeplitz operators
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Á¦¸ñ: Optimal indecomposable witnesses without extremality as well as spanning property
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ÀÛ¿ë¼Ò ¼Ò½Ä No.389 (2012.8.31)
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Á¦¸ñ: Normality of Toeplitz operators
ÀϽÃ: 2012³â 9¿ù 7ÀÏ ±Ý¿äÀÏ ¿ÀÀü 10½Ã 30ºÐ
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Á¦¸ñ: Optimal indecomposable witnesses without extremality as well as spanning property
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ÀÛ¿ë¼Ò ¼Ò½Ä No.388 (2012.5.30)
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¼Ò¼Ó: Southern Illinois University Edwardsville
Á¦¸ñ: Matrix Factorization and Lifting
ÀϽÃ: 2012³â 6¿ù 1ÀÏ ±Ý¿äÀÏ 3½Ã
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Á¦¸ñ: Qudit Cluster State Entanglement and Teleportation
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¡Ø 6¿ù 1ÀÏÀº µÎ °³ÀÇ °¿¬ÀÌ ÀÖ½À´Ï´Ù. ¼¼¹Ì³ª´Â ÀÌÀü°ú ´Þ¸® 3½ÃºÎÅÍ ½ÃÀÛÇÕ´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.387 (2012.5.23)
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Á¦¸ñ: Some properties of operators in the class $\theta$
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Á¦¸ñ: Qudit Cluster State Entanglement and Teleportation
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¡Ø 6¿ù 1ÀÏ ¼¼¹Ì³ª¸¦ ¸¶Ä¡°í Á¾°È¸½ÄÀÌ ÀÖ½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.386 (2012.5.9)
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Á¦¸ñ: Randomizing quantum states in Shatten p-norms
ÀϽÃ: 2012³â 5¿ù 11ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
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Á¦¸ñ: Some properties of operators in the class $\theta$
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Á¦¸ñ: Qudit Cluster State Entanglement and Teleportation
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5¿ù 18ÀÏ(¼öÇаú Çà»ç)¿¡´Â ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.385 (2012.4.25)
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Á¦¸ñ: An embedding theorem in Elliott's classification program
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Á¦¸ñ: Some properties of operators in the class $\theta$
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ÀÛ¿ë¼Ò ¼Ò½Ä No.384 (2012.4.18)
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Á¦¸ñ: Quantum Automorphism Groups on Finite Graphs
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Á¦¸ñ: Randomizing quantum states in Shatten p-norms
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ÀÛ¿ë¼Ò ¼Ò½Ä No.383 (2012.4.10)
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¼Ò¼Ó: Center for Quantum Technologies Singapore and ICFO-Institute of Photonic Sciences Barcelona Spain
Á¦¸ñ: Structural Approximations to Positive Maps and Its Applications
ÀϽÃ: 2012³â 4¿ù 13ÀÏ ±Ý¿äÀÏ 2½Ã
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Á¦¸ñ: Dynamical systems and groupoid algebras on higher rank graphs
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Á¦¸ñ: Quantum Automorphism Groups on Finite Graphs
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Á¦¸ñ: An embedding theorem in Elliott's classification program
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Á¦¸ñ: Some properties of operators in the class $\theta$
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ÀÛ¿ë¼Ò ¼Ò½Ä No.382 (2012.4.4)
¿¬»ç: Yasuyuki Kawahigashi
¼Ò¼Ó: University of Tokyo
Á¦¸ñ: Conformal field theory and noncommutative geometry
ÀϽÃ: 2012³â 4¿ù 5ÀÏ ¸ñ¿äÀÏ 4½Ã(¼öÇаú °¿¬È¸)
Àå¼Ò: »ó»ê°ü 101È£
¿¬»ç: Yasuyuki Kawahigashi
¼Ò¼Ó: University of Tokyo
Á¦¸ñ: Conformal field theory and subfactors
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Á¦¸ñ: Dynamical systems and groupoid algebras on higher rank graphs
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ÀÛ¿ë¼Ò ¼Ò½Ä No.381 (2012.3.28)
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¼Ò¼Ó: ÃæºÏ´ëÇб³
Á¦¸ñ: $\alpha$-completely positive maps and related topics
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¿¬»ç: Yasuyuki Kawahigashi
¼Ò¼Ó: University of Tokyo
Á¦¸ñ: Conformal field theory and noncommutative geometry
ÀϽÃ: 2012³â 4¿ù 5ÀÏ ¸ñ¿äÀÏ 4½Ã(¼öÇаú °¿¬È¸)
Àå¼Ò: »ó»ê°ü 101È£
¿¬»ç: Yasuyuki Kawahigashi
¼Ò¼Ó: University of Tokyo
Á¦¸ñ: Conformal field theory and subfactors
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ÀÛ¿ë¼Ò ¼Ò½Ä No.380 (2012.3.21)
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Á¦¸ñ: Classification of bi-qutrit PPT entangled edge states by their ranks
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Á¦¸ñ: $\alpha$-completely positive maps and related topics
ÀϽÃ: 2012³â 3¿ù 30ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
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¿¬»ç: Yasuyuki Kawahigashi
¼Ò¼Ó: University of Tokyo
Á¦¸ñ: Conformal field theory and noncommutative geometry
ÀϽÃ: 2012³â 4¿ù 5ÀÏ ¸ñ¿äÀÏ 4½Ã(¼öÇаú °¿¬È¸)
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¿¬»ç: Yasuyuki Kawahigashi
¼Ò¼Ó: University of Tokyo
Á¦¸ñ: Conformal field theory and subfactors
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ÀÛ¿ë¼Ò ¼Ò½Ä No.379 (2012.3.12)
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Á¦¸ñ: Degree and coprimeness of matrix-valued rational functions
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¿¬»ç: Yasuyuki Kawahigashi
¼Ò¼Ó: University of Tokyo
Á¦¸ñ: Conformal field theory and noncommutative geometry
ÀϽÃ: 2012³â 4¿ù 5ÀÏ ¸ñ¿äÀÏ 4½Ã(¼öÇаú °¿¬È¸)
Àå¼Ò: »ó»ê°ü 101È£
¿¬»ç: Yasuyuki Kawahigashi
¼Ò¼Ó: University of Tokyo
Á¦¸ñ: Conformal field theory and subfactors
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ÀÛ¿ë¼Ò ¼Ò½Ä No.378 (2012.2.29)
¿¬»ç: Hiroyuki Osaka
¼Ò¼Ó: Ritsumeikan University
Á¦¸ñ: Inclusions of unital C*-algebras and the Rokhlin property
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¿¬»ç: Yasuyuki Kawahigashi
¼Ò¼Ó: University of Totyo
Á¦¸ñ: Conformal field theory and noncommutative geometry
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Á¦¸ñ: Conformal field theory and subfactors
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