ÀÛ¿ë¼Ò ¼Ò½Ä No.330 (2009.12.29)
¿¬»ç: Marius Junge (Univ. of Illinois)
Á¦¸ñ: Operator algebras and Quantum information
ÀϽÃ: 2010³â 1¿ù 4ÀÏ ¿ù¿äÀÏ 16½Ã
Àå¼Ò: »ó»ê°ü 301È£
ÃÊ·Ï: Operator algebras and Quantum information theory have a lot in common, and this connection is growing in importance. I will try to sketch how free probability theory and operator space theory can be used to attack a problem in Quantum Information theory. This talks includes in introduction to the relevant terminology and, if time permits, and outlook on ongoing research in this direction.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.329 (2009.12.4)
¿¬»ç: N.C.Phillips ±³¼ö (University of Oregon)
Á¦¸ñ: An introduction to the structure of crossed product C*-algebras
1. What is a crossed product?
2. Explicit computations.
3. Crossed products by minimal homeomorphisms.
ÀϽÃ: 2009³â 12¿ù 12ÀÏ(Åä), 14(¿ù), 15ÀÏ(È), ¿ÀÀü 10½Ã-12½Ã.
Àå¼Ò: ¼¿ï´ëÇб³ »ó»ê¼ö¸®°úÇаü 301È£
ÃÊ·Ï: We present an introduction to the theory of crossed products of C*-algebras by actions of locally compact groups, with emphasis on the background needed for recent work on the classification of crossed products. We will begin with the definition and basic properties of the crossed product construction. We include motivation and a large collection of examples of group actions on C*-algebras. Then we will do some more or less explicit computations of crossed product C*-algebras. The final part of the course will discuss the classification of crossed products by minimal homeomorphisms of infinite compact metric spaces.
** °ÀÇ·ÏÀ» ¾Æ·¡¿¡¼ ¹Þ¾Æ º¼ ¼ö ÀÖ½À´Ï´Ù.
http://www.uoregon.edu/~ncp/Courses/LisbonCrossedProducts/LisbonCrossedProducts.html
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ÀÛ¿ë¼Ò ¼Ò½Ä No.328 (2009.11.28)
¿¬»ç: Á¤ÀϺÀ (°æºÏ´ë)
Á¦¸ñ: Rank-one perturbations of normal operators
ÀϽÃ: 2009³â 12¿ù 4ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: N.C.Phillips (Univ. of Oregon)
Á¦¸ñ: An introduction to the structure of crossed product C*-algebras
1. What is a crossed product?
2. Explicit computations.
3. Crossed products by minimal homeomorphisms.
ÀϽÃ: 2009³â 12¿ù 12ÀÏ~15ÀÏ
Àå¼Ò: TBA
ÃÊ·Ï: We present an introduction to the theory of crossed products of C*-algebras by actions of locally compact groups, with emphasis on the background needed for recent work on the classification of crossed products. We will begin with the definition and basic properties of the crossed product construction. We include motivation and a large collection of examples of group actions on C*-algebras. Then we will do some more or less explicit computations of crossed product C*-algebras. The final part of the course will discuss the classification of crossed products by minimal homeomorphisms of infinite compact metric spaces.
-12¿ù 4ÀÏ ¼¼¹Ì³ª ÈÄ(12½Ã)¿¡ µÎ·¹¹Ì´ã¿¡¼ ÀÛ¿ë¼Ò Á¾°È¸½ÄÀÌ ÀÖ½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.327 (2009.11.22)
¿¬»ç: Á¤ÀϺÀ (°æºÏ´ë)
Á¦¸ñ: Rank-one perturbations of normal operators
ÀϽÃ: 2009³â 12¿ù 4ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
-11¿ù27ÀÏÀº ¼¿ï´ëÇб³ ¼ö½Ã¸éÁ¢±â°£À¸·Î ÀÛ¿ë¼Ò ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.326 (2009.11.15)
¿¬»ç: Á¤ÀϺÀ (°æºÏ´ë)
Á¦¸ñ: Rank-one perturbations of normal operators
ÀϽÃ: 2009³â 12¿ù 4ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
-11¿ù20ÀÏ(±Ý)Àº ÀÛ¿ë¼ÒÆÀ °ü¾Ç»ê µî»êÀÌ ÀÖ½À´Ï´Ù.
¿ÀÀü 9½Ã¿¡ »ó»ê°ü 2Ãþ Á¤¿ø(27µ¿°ú ±¸¸§´Ù¸®·Î ¿¬°áµÈ °÷)¿¡¼ Ãâ¹ßÇÒ ¿¹Á¤ÀÔ´Ï´Ù.
-11¿ù27ÀÏÀº ¼¿ï´ëÇб³ ¼ö½Ã¸éÁ¢±â°£À¸·Î ÀÛ¿ë¼Ò ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.325 (2009.11.7)
¿¬»ç: ±ÇÇö°æ (ÀÌÈ¿©´ë)
Á¦¸ñ: Recent Developments in the Similarity Problem
ÀϽÃ: 2009³â 11¿ù 13ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Á¤ÀϺÀ (°æºÏ´ë)
Á¦¸ñ: Rank-one perturbations of normal operators
ÀϽÃ: 2009³â 12¿ù 4ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
-11¿ù20ÀÏÀº ÀÛ¿ë¼ÒÆÀ °ü¾Ç»ê µî»êÀÌ ÀÖ½À´Ï´Ù.
-11¿ù27ÀÏÀº ¼¿ï´ëÇб³ ¼ö½Ã¸éÁ¢±â°£À¸·Î ÀÛ¿ë¼Ò ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.324 (2009.11.1)
¿¬»ç: ÀÌÈÆÈñ (ÃæºÏ´ë)
Á¦¸ñ: Hypercontractivity on the $q$-Araki-Woods algebras: a restricted case
ÀϽÃ: 2009³â 11¿ù 6ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
ÃÊ·Ï: We consider the hypercontractivity of the $q$-Ornstein-Uhlenbeck semigroup on the $q$-Araki-Woods algebras for $-1\le q \le 1$. The general case is still open, but we prove the hypercontractivity of the q$-Ornstein-Uhlenbeck semigroup restricted on the von Neumann algebra generated by the modulus of the $q$-gaussians, which is a type $II_1$ algebra whilst the $q$-Araki-Woods algebras are type $III$ in general.
¿¬»ç: Á¤ÀϺÀ (°æºÏ´ë)
Á¦¸ñ: Rank-one perturbations of normal operators
ÀϽÃ: 2009³â 12¿ù 4ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
-11¿ù27ÀÏÀº ¼¿ï´ëÇб³ ¼ö½Ã¸éÁ¢±â°£À¸·Î ÀÛ¿ë¼Ò ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.323 (2009.10.24)
¿¬»ç: Mathilde Perrin (Univ. of Franche-Comte, France)
Á¦¸ñ: Atomic decomposition and interpolation for Hardy spaces of noncommutative martingales
ÀϽÃ: 2009³â 10¿ù 30ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÀÌÈÆÈñ (ÃæºÏ´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 11¿ù 6ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Á¤ÀϺÀ (°æºÏ´ë)
Á¦¸ñ: Rank-one perturbations of normal operators
ÀϽÃ: 2009³â 12¿ù 4ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
-11¿ù27ÀÏÀº ¼¿ï´ëÇб³ ¼ö½Ã¸éÁ¢±â°£À¸·Î ÀÛ¿ë¼Ò ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.322 (2009.10.16)
¿¬»ç: ±¸Çü¿î (°í·Á´ë)
Á¦¸ñ: Carleson measures via BMO
ÀϽÃ: 2009³â 10¿ù 23ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
ÃÊ·Ï: We obatian new characterizations of Carleson measures via uniform boundedness of BMO norms of certain mass functions associated with the given measure in a natural way.
¿¬»ç: Mathilde Perrin (Univ. of Franche-Comte, France)
Á¦¸ñ: Atomic decomposition and interpolation for Hardy spaces of noncommutative martingales
ÀϽÃ: 2009³â 10¿ù 30ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÀÌÈÆÈñ (ÃæºÏ´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 11¿ù 6ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Á¤ÀϺÀ (°æºÏ´ë)
Á¦¸ñ: Rank-one perturbations of normal operators
ÀϽÃ: 2009³â 12¿ù 4ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
-11¿ù27ÀÏÀº ¼¿ï´ëÇб³ ¼ö½Ã¸éÁ¢±â°£À¸·Î ÀÛ¿ë¼Ò ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.321. (2009.10.10)
¿¬»ç: ÀÌÇöÈ£ (¼¿ï´ë)
Á¦¸ñ: Some examples of non-stable K-theory of a C*-algebra (part2)
ÀϽÃ: 2009³â 10¿ù 16ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ±¸Çü¿î (°í·Á´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 10¿ù 23ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÀÌÈÆÈñ (ÃæºÏ´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 11¿ù 6ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Á¤ÀϺÀ (°æºÏ´ë)
Á¦¸ñ: Rank-one perturbations of normal operators
ÀϽÃ: 2009³â 12¿ù 4ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
-11¿ù27ÀÏÀº ¼¿ï´ëÇб³ ¼ö½Ã¸éÁ¢±â°£À¸·Î ÀÛ¿ë¼Ò ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.320. (2009.10.02)
¿¬»ç: ÇãÀ缺 (ÇѾç´ë)
Á¦¸ñ: Quantum Dynamical Systems and Quantum Instruments
ÀϽÃ: 2009³â 10¿ù 9ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÀÌÇöÈ£ (¼¿ï´ë)
Á¦¸ñ: Some examples of non-stable K-theory of a C*-algebra (part2)
ÀϽÃ: 2009³â 10¿ù 16ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ±¸Çü¿î (°í·Á´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 10¿ù 23ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÀÌÈÆÈñ (ÃæºÏ´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 11¿ù 6ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Á¤ÀϺÀ (°æºÏ´ë)
Á¦¸ñ: Rank-one perturbations of normal operators
ÀϽÃ: 2009³â 12¿ù 4ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
-11¿ù27ÀÏÀº ¼¿ï´ëÇб³ ¼ö½Ã¸éÁ¢±â°£À¸·Î ÀÛ¿ë¼Ò ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.319. (2009.09.27)
¿¬»ç: ÇãÀ缺 (ÇѾç´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 10¿ù 9ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÀÌÇöÈ£ (¼¿ï´ë)
Á¦¸ñ: Some examples of non-stable K-theory of a C*-algebra (part2)
ÀϽÃ: 2009³â 10¿ù 16ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ±¸Çü¿î (°í·Á´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 10¿ù 23ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
-10¿ù2ÀÏÀº Ãß¼® ¿¬ÈÞ·Î ÀÛ¿ë¼Ò ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.318. (2009.09.18)
¿¬»ç: ÇÑ¿µ¹Î (°æÈñ´ë)
Á¦¸ñ: On Property (b)
ÀϽÃ: 2009³â 9¿ù 25ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.317. (2009.09.11)
¿¬»ç: ÀÌÇöÈ£ (¼¿ï´ë)
Á¦¸ñ: Some examples of non-stable K-theory of a C*-algebra (part1)
ÀϽÃ: 2009³â 9¿ù 18ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÇÑ¿µ¹Î (°æÈñ´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 9¿ù 25ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.316. (2009.09.04)
¿¬»ç: À̿쿵 (¼¿ï´ë)
Á¦¸ñ: Hyponormal block Toeplitz operators
ÀϽÃ: 2009³â 9¿ù 11ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÀÌÇöÈ£ (¼¿ï´ë)
Á¦¸ñ: Some examples of non-stable K-theory of a C*-algebra (part1)
ÀϽÃ: 2009³â 9¿ù 18ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
-9¿ù 11ÀÏ ¼¼¹Ì³ª ÈÄ, Á¡½É½Ã°£¿¡ ±³³»¿¡¼ ÀÛ¿ë¼Ò °³°È¸½ÄÀÌ ÀÖ½À´Ï´Ù.
-À̹øÇб⠼¼¹Ì³ª Àå¼Ò´Â »ó»ê°ü301È£ ÀÔ´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.315. (2009.09.01)
¿¬»ç: À̿쿵 (¼¿ï´ë)
Á¦¸ñ: Hyponormal block Toeplitz operators
ÀϽÃ: 2009³â 9¿ù 11ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÀÌÇöÈ£ (¼¿ï´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 9¿ù 18ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
-9¿ù 11ÀÏ ¼¼¹Ì³ª ÈÄ, Á¡½É½Ã°£¿¡ ±³³»¿¡¼ ÀÛ¿ë¼Ò °³°È¸½ÄÀÌ ÀÖ½À´Ï´Ù.
-À̹øÇб⠼¼¹Ì³ª Àå¼Ò´Â »ó»ê°ü301È£ ÀÔ´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.314. (2009.06.26)
¿¬»ç: Á¶ÀÏ¿ì (Ambrose Univ.)
Á¦¸ñ: C^*-algebra generated by a single operator
ÀϽÃ: 2009³â 7¿ù 3ÀÏ ±Ý¿äÀÏ 15½Ã
Àå¼Ò: »ó»ê°ü 307È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.313. (2009.06.13)
¿¬»ç: M. Takesaki (UCLA)
Á¦¸ñ: Where are operator algebras ?
ÀϽÃ: 2009³â 6¿ù 16ÀÏ È¿äÀÏ 14½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.312. (2009.06.06)
¿¬»ç: M. Takesaki (UCLA)
Á¦¸ñ: Where are operator algebras?
ÀϽÃ: 2009³â 6¿ù 16ÀÏ È¿äÀÏ 14½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Hanfeng Li (The State University of New York)
Á¦¸ñ: Turbulence, representations, and trace-preserving actions
ÀϽÃ: 2009³â 6¿ù 16ÀÏ È¿äÀÏ 16½Ã
Àå¼Ò: »ó»ê°ü 301È£
Abstract: I will give criteria for tubulence in spaces of C*-algebra representations, and indicate how this helps to establish results of nonclassifability by countable structures, for group actions on a standard atomless probability space. Related results will also be given for group actions on the hyperfinite II_1 factor. This is a joint work with David Kerr and Mikael Pichot.
¿¬»ç: Hanfeng Li (The State University of New York)
Á¦¸ñ: Entropy and Fuglede-Kadison determinant
ÀϽÃ: 2009³â 6¿ù 17 ¼ö¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
Abstract: Ever since the beginning of ergodic theory, the study of
automorphisms of compact metrizable groups has been one of the main themes. I will discuss the relation between the entropy of certain discrete group action on compact groups and the Fuglede-Kadison determinant.
BTW, The first talk is based on a paper with the same title, which is
available on arXiv and the homepages of the authors. The content of
the second talk is not written up yet, but some related information
can be found in the following papers:
1. C. Deninger. Fuglede-Kadison determinants and entropy for actions
of discrete amenable groups. J. Amer. Math. Soc. 19 (2006), 737--758.
2. C. Deninger and K. Schmidt. Expansive algebraic actions of discrete
residually finite amenable groups and their entropy. Ergod. Th. Dynam.
Sys. 27 (2007), 769--786.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.311. (2009.05.30)
¿¬»ç: ±ÇÇö°æ (Brown Univeristy)
Á¦¸ñ: Curvature Condition for Noncontractions does not imply Similarity to the Backward Shift
ÀϽÃ: 2009³â 6¿ù 5ÀÏ ±Ý¿äÀÏ 16½Ã
Àå¼Ò: 27µ¿ 414È£
-6¿ù5ÀÏ ÀÛ¿ë¼Ò ¼¼¹Ì³ª´Â ¿ÀÈÄ4½Ã¿¡ ½ÃÀÛÇÕ´Ï´Ù.
¼¼¹Ì³ª ÈÄ, 6½ÃºÎÅÍ ÀÛ¿ë¼Ò Á¾°È¸½ÄÀÌ ÀÖ½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.310. (2009.05.23)
¿¬»ç: ÀÌ»óÈÆ (Ãæ³²´ë)
Á¦¸ñ: Truncated moment problem and 2-variable subnormal completion problem
ÀϽÃ: 2009³â 5¿ù 29ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
¿¬»ç: ±ÇÇö°æ (Brown Univeristy)
Á¦¸ñ: Curvature Condition for Noncontractions does not imply Similarity to the Backward Shift
ÀϽÃ: 2009³â 6¿ù 5ÀÏ ±Ý¿äÀÏ 16½Ã
Àå¼Ò: 27µ¿ 414È£
-6¿ù5ÀÏ ÀÛ¿ë¼Ò ¼¼¹Ì³ª´Â ¿ÀÈÄ4½Ã¿¡ ½ÃÀÛÇÕ´Ï´Ù.
¼¼¹Ì³ª ÈÄ, 6½ÃºÎÅÍ ÀÛ¿ë¼Ò Á¾°È¸½ÄÀÌ ÀÖ½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.309. (2009.05.15)
¿¬»ç: ÇÑ°æÈÆ (¼¿ï´ë)
Á¦¸ñ: Injective tensor product and projective tensor product of ordered vector spaces with Archimedean order unit
ÀϽÃ: 2009³â 5¿ù 22ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
¿¬»ç: ÀÌ»óÈÆ (Ãæ³²´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 5¿ù 29ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
¿¬»ç: ±ÇÇö°æ (Brown Univeristy)
Á¦¸ñ: Curvature Condition for Noncontractions does not imply Similarity to the Backward Shift
ÀϽÃ: 2009³â 6¿ù 5ÀÏ ±Ý¿äÀÏ 16½Ã
Àå¼Ò: 27µ¿ 414È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.308. (2009.05.09)
¿¬»ç: ÇÑ°æÈÆ (¼¿ï´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 5¿ù 22ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
¿¬»ç: ÀÌ»óÈÆ (Ãæ³²´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 5¿ù 29ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
-5¿ù15ÀÏÀº ¼¿ï´ëÇб³ ¼ö¸®°úÇкΠME Çà»ç·Î ÀÛ¿ë¼Ò ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.307. (2009.05.01)
¿¬»ç: ÇϱæÂù (¼¼Á¾´ë)
Á¦¸ñ: Characterization of extreme rays in entangled edge states with positive partial transposes
ÀϽÃ: 2009³â 5¿ù 8ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
¿¬»ç: ÇÑ°æÈÆ (¼¿ï´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 5¿ù 22ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
¿¬»ç: ÀÌ»óÈÆ (Ãæ³²´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 5¿ù 29ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
-5¿ù15ÀÏÀº ¼¿ï´ëÇб³ ¼ö¸®°úÇкΠME Çà»ç·Î ÀÛ¿ë¼Ò ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.306. (2009.04.24)
¿¬»ç: ±èÀÎÇö (ÀÎõ´ë)
Á¦¸ñ: On the quasisimilarity for quasi-class A operators
ÀϽÃ: 2009³â 5¿ù 1ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
¿¬»ç: ÇϱæÂù (¼¼Á¾´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 5¿ù 8ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.305. (2009.04.17)
¿¬»ç: ±èÀÎÇö (ÀÎõ´ë)
Á¦¸ñ: On the quasisimilarity for quasi-class A operators
ÀϽÃ: 2009³â 5¿ù 1ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
¿¬»ç: ÇϱæÂù (¼¼Á¾´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 5¿ù 8ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
-´ÙÀ½ÁÖ(4¿ù 24ÀÏ)´Â ´ëÇѼöÇÐȸ º½ ¹ßǥȸ °ü°è·Î ÀÛ¿ë¼Ò¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù
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ÀÛ¿ë¼Ò ¼Ò½Ä No.304. (2009.04.11)
¿¬»ç: ȲÀμº (¼º±Õ°ü´ë)
Á¦¸ñ: Interpolation problems
ÀϽÃ: 2009³â 4¿ù 17ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
¿¬»ç: ÇϱæÂù (¼¼Á¾´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 5¿ù 8ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.303. (2009.04.03)
¿¬»ç: ÇÑ¿µ¹Î (°æÈñ´ë)
Á¦¸ñ: Property [W] and SVEP
ÀϽÃ: 2009³â 4¿ù 10ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
¿¬»ç: ÇϱæÂù (¼¼Á¾´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 5¿ù 8ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.302. (2009.03.28)
¿¬»ç: ÀÌÈÆÈñ (ÃæºÏ´ë)
Á¦¸ñ: Beurling type Fourier algebra on a locally compact group
ÀϽÃ: 2009³â 4¿ù 3ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
ÃÊ·Ï: Let G be a locally compact group and w be a measurable function on G satisfying w(xy) <= w(x)w(y) for any elements x, y in G. Then, the weighted L^1 space L^1(G;w) is still a Banach algebra under the convolution product, and it is called a Beurling algebra of G. In this talk we will consider a non-commutative analog of L^1(G;w) and investigate various amenabilities of the algebra. We will begin the talk with a brief review of the basics concerning the group algebra L^1(G) and the Fourier algebra A(G) on a locally compact group G.
¿¬»ç: ÇÑ¿µ¹Î (°æÈñ´ë)
Á¦¸ñ: TBA
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¿¬»ç: ÇϱæÂù (¼¼Á¾´ë)
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¿¬»ç: ÇãÀ缺 (ÇѾç´ë)
Á¦¸ñ: TBA
ÀϽÃ: 2009³â 5¿ù 15ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.301. (2009.03.20)
¿¬»ç: ±è¿ìÂù (¼¿ï´ë)
Á¦¸ñ: The Schmidt decomposition of entangled states
ÀϽÃ: 2009³â 3¿ù 27ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
¿¬»ç: ÀÌÈÆÈñ (ÃæºÏ´ë)
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¿¬»ç: ÇϱæÂù (¼¼Á¾´ë)
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¿¬»ç: ÇãÀ缺 (ÇѾç´ë)
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ÀÛ¿ë¼Ò ¼Ò½Ä No.300. (2009.03.16)
¿¬»ç: ÇÑ°æÈÆ (¼¿ï´ë)
Á¦¸ñ: Noncommutative Lp space and operator system II : sketch of proof and question on best constant
ÀϽÃ: 2009³â 3¿ù 20ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.299. (2009.03.06)
¿¬»ç: À̿쿵 (¼¿ï´ë)
Á¦¸ñ: Subnormal block Toeplitz operators
ÀϽÃ: 2009³â 3¿ù 13ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: 27µ¿ 414È£
¿¬»ç: ÇÑ°æÈÆ (¼¿ï´ë)
Á¦¸ñ: Noncommutative Lp space and operator system II : sketch of proof and question on best constant
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ÀÛ¿ë¼Ò ¼Ò½Ä No.298. (2009.02.26)
¿¬»ç: À̿쿵 (¼¿ï´ë)
Á¦¸ñ: Subnormal block Toeplitz operators
ÀϽÃ: 2009³â 3¿ù 13ÀÏ ±Ý¿äÀÏ 10½Ã 30ºÐ
Àå¼Ò: ÃßÈÄ°øÁö
-À̹ø ÇбâºÎÅÍ ÀÛ¿ë¼Ò ¼¼¹Ì³ª°¡ ¸ÅÁÖ ±Ý¿äÀÏ ¿ÀÀü 10:30~12:00¿¡ ÁøÇàµË´Ï´Ù.
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