ÀÛ¿ë¼Ò ¼Ò½Ä No.377 (2011.11.26)
¿¬»ç: À̿쿵 (Woo Young Lee)
¼Ò¼Ó: ¼¿ï´ëÇб³ (Seoul National Univ.)
Á¦¸ñ: A bridge theory for block Toeplitz operators
ÀϽÃ: 2011³â 12¿ù 2ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
-12¿ù 2ÀÏ ¼¼¹Ì³ª°¡ ³¡³ ÈÄ Á¾° ȸ½ÄÀÌ ÀÖ½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.376 (2011.11.19)
¿¬»ç: ÀÌÀÎÇù (Yi, Inhyeop)
¼Ò¼Ó: ÀÌÈ¿©ÀÚ´ëÇб³ (Ewha Womans Univ.)
Á¦¸ñ: Groupoid algebras associated with covering maps
ÀϽÃ: 2011³â 11¿ù 25ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: À̿쿵 (Woo Young Lee)
¼Ò¼Ó: ¼¿ï´ëÇб³ (Seoul National Univ.)
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 12¿ù 2ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.375 (2011.11.09)
¿¬»ç: Hang Wang
¼Ò¼Ó: Mathematical Science Center, Tsinghua University
Á¦¸ñ: Index theorems of elliptic operators on manifolds with proper cocompact group actions
ÀϽÃ: 2011³â 11¿ù 11ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÀÌÀÎÇù (Yi, Inhyeop)
¼Ò¼Ó: ÀÌÈ¿©ÀÚ´ëÇб³ (Ewha Womans Univ.)
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 11¿ù 25ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: À̿쿵 (Woo Young Lee)
¼Ò¼Ó: ¼¿ï´ëÇб³ (Seoul National Univ.)
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 12¿ù 2ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
-11¿ù 18ÀÏÀº ¼ö½Ã¸éÁ¢ °ü°è·Î ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.374 (2011.10.31)
¿¬»ç: Joshua Isralowitz
¼Ò¼Ó: Gottingen University
Á¦¸ñ: Introduction to Fock spaces.
ÀϽÃ: 2011³â 11¿ù 4ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
ÃÊ·Ï: In this talk, we discuss the basic properties of the Fock space $F_{\alpha}^{p}$ for $0<p<\infty$, with a focus on the case $1\leq p<\infty$. In particular, we discuss the boundedness of point evaluations on the Fock space and its consequences, the reproducing and normalized reproducing kernels, the boundedness of the Fock projection, and the duality of Fock spaces and its consequences.
¿¬»ç: Hang Wang
¼Ò¼Ó: Mathematical Science Center, Tsinghua University
Á¦¸ñ: Index theorems of elliptic operators on manifolds with proper cocompact group actions
ÀϽÃ: 2011³â 11¿ù 11ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÀÌÀÎÇù (Yi, Inhyeop)
¼Ò¼Ó: ÀÌÈ¿©ÀÚ´ëÇб³ (Ewha Womans Univ.)
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 11¿ù 25ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: À̿쿵 (Woo Young Lee)
¼Ò¼Ó: ¼¿ï´ëÇб³ (Seoul National Univ.)
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 12¿ù 2ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
-11¿ù 18ÀÏÀº ¼ö½Ã¸éÁ¢ °ü°è·Î ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.373 (2011.10.20)
¿¬»ç: ȲÀμº (Hwang, In Sung)
¼Ò¼Ó: ¼º±Õ°ü´ëÇб³ (Sungkyunkwan Univ.)
Á¦¸ñ: The Beurling-Lax-Halmos Theorem
ÀϽÃ: 2011³â 10¿ù 28ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Joshua Isralowitz
¼Ò¼Ó: Gottingen University
Á¦¸ñ: Introduction to Fock spaces.
ÀϽÃ: 2011³â 11¿ù 4ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
ÃÊ·Ï: In this talk, we discuss the basic properties of the Fock space $F_{\alpha}^{p}$ for $0<p<\infty$, with a focus on the case $1\leq p<\infty$. In particular, we discuss the boundedness of point evaluations on the Fock space and its consequences, the reproducing and normalized reproducing kernels, the boundedness of the Fock projection, and the duality of Fock spaces and its consequences.
¿¬»ç: Hang Wang
¼Ò¼Ó: Mathematical Science Center, Tsinghua University
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 11¿ù 11ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÀÌÀÎÇù (Yi, Inhyeop)
¼Ò¼Ó: ÀÌÈ¿©ÀÚ´ëÇб³ (Ewha Womans Univ.)
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 11¿ù 25ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: À̿쿵 (Woo Young Lee)
¼Ò¼Ó: ¼¿ï´ëÇб³ (Seoul National Univ.)
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 12¿ù 2ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.372 (2011.10.10)
¿¬»ç: ±èµ¿¿î (Dong Woon Kim)
¼Ò¼Ó: ¼¿ï´ëÇб³ (Seoul National Univ.)
Á¦¸ñ: Coactions of compact quantum groups on graph C*-algebras
ÀϽÃ: 2011³â 10¿ù 14ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Joshua Isralowitz
¼Ò¼Ó: Gottingen University
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 11¿ù 4ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Hang Wang
¼Ò¼Ó: Mathematical Science Center, Tsinghua University
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 11¿ù 11ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÀÌÀÎÇù (Yi, Inhyeop)
¼Ò¼Ó: ÀÌÈ¿©ÀÚ´ëÇб³ (Ewha Womans Univ.)
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 11¿ù 25ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: À̿쿵 (Woo Young Lee)
¼Ò¼Ó: ¼¿ï´ëÇб³ (Seoul National Univ.)
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 12¿ù 2ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
- 10¿ù 21ÀÏ¿¡´Â ´ëÇѼöÇÐȸ °ü°è·Î ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.371 (2011.10.2)
¿¬»ç: ÀÌÈÆÈñ (Hun Hee Lee)
¼Ò¼Ó: ÃæºÏ´ëÇб³ (Chungbuk National Univ.)
Á¦¸ñ: More examples of operator algebras coming from weighted Fourier algebras
ÀϽÃ: 2011³â 10¿ù 7ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
ÃÊ·Ï: In this talk we will focus on some (non-self adjoint) operator algebras coming from weighted Fourier algebras on connected compact Lie groups. We will review basic materials concerning Fourier algebras on compact groups and its weighted versions. Our main examples of connected compact Lie groups will be n-dimensional torus and SU(n).
¿¬»ç: ±èµ¿¿î (Dong Woon Kim)
¼Ò¼Ó: ¼¿ï´ëÇб³ (Seoul National Univ.)
Á¦¸ñ: Coactions of compact quantum groups on graph C*-algebras
ÀϽÃ: 2011³â 10¿ù 14ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Joshua Isralowitz
¼Ò¼Ó: Gottingen University
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 11¿ù 4ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Hang Wang
¼Ò¼Ó: Mathematical Science Center, Tsinghua University
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 11¿ù 11ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÀÌÀÎÇù (Yi, Inhyeop)
¼Ò¼Ó: ÀÌÈ¿©ÀÚ´ëÇб³ (Ewha Womans Univ.)
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 11¿ù 25ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: À̿쿵 (Woo Young Lee)
¼Ò¼Ó: ¼¿ï´ëÇб³ (Seoul National Univ.)
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 12¿ù 2ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
- 10¿ù 21ÀÏ¿¡´Â ´ëÇѼöÇÐȸ °ü°è·Î ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.370 (2011.9.26)
¿¬»ç: ÇãÀ缺 (Heo, Jae Seong)
¼Ò¼Ó: ÇѾç´ëÇб³ (Hanyang University)
Á¦¸ñ: Self-adjoint cover and bounded homomorphism
ÀϽÃ: 2011³â 9¿ù 30ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÀÌÈÆÈñ (Hun Hee Lee)
¼Ò¼Ó: ÃæºÏ´ëÇб³ (Chungbuk National Univ.)
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 10¿ù 7ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Joshua Isralowitz
¼Ò¼Ó: Gottingen University
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 11¿ù 4ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.369 (2011.9.19)
¿¬»ç: ¼Û¼®ÁØ (Song, Seok-Zun)
¼Ò¼Ó: Á¦ÁÖ´ëÇб³ (Jeju National Univ.)
Á¦¸ñ: Linear operators that preserve term rank
ÀϽÃ: 2011³â 9¿ù 23ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÇãÀ缺 (Heo, Jae Seong)
¼Ò¼Ó: ÇѾç´ëÇб³ (Hanyang University)
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 9¿ù 30ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Joshua Isralowitz
¼Ò¼Ó: Gottingen University
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 11¿ù 4ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.368 (2011.9.13)
¿¬»ç: °è½ÂÇõ (Kye, Seung-Hyeok)
¼Ò¼Ó: ¼¿ï´ëÇб³ (Seoul National Univ.)
Á¦¸ñ: Product vectors and their partial conjugate
ÀϽÃ: 2011³â 9¿ù 16ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ¼Û¼®ÁØ (Song, Seok-Zun)
¼Ò¼Ó: Á¦ÁÖ´ëÇб³ (Jeju National Univ.)
Á¦¸ñ: Linear operators that preserve term rank
ÀϽÃ: 2011³â 9¿ù 23ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Joshua Isralowitz
¼Ò¼Ó: Gottingen University
Á¦¸ñ: TBA
ÀϽÃ: 2011³â 11¿ù 4ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
- À̹ø Çб⠼¼¹Ì³ª´Â 9¿ù 16ÀÏ(±Ý)ºÎÅÍ ½ÃÀÛÇÏ¸ç ½Ã°£Àº ¿ÀÈÄ 3½Ã 30ºÐ, Àå¼Ò´Â »ó»ê°ü 301È£ ÀÔ´Ï´Ù.
- 9¿ù 16ÀÏ Ã¹ ¼¼¹Ì³ª ÀÌÈÄ¿¡´Â °³° ȸ½ÄÀÌ ÀÖ½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.367 (2011.8.31)
¿¬»ç: °è½ÂÇõ (Kye, Seung-Hyeok)
¼Ò¼Ó: ¼¿ï´ëÇб³ (Seoul National Univ.)
Á¦¸ñ: Product vectors and their partial conjugate
ÀϽÃ: 2011³â 9¿ù 16ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
- À̹ø Çб⠼¼¹Ì³ª´Â 9¿ù 16ÀÏ(±Ý)ºÎÅÍ ½ÃÀÛÇÏ¸ç ½Ã°£Àº ¿ÀÈÄ 3½Ã 30ºÐ, Àå¼Ò´Â »ó»ê°ü 301È£ ÀÔ´Ï´Ù.
- 9¿ù 16ÀÏ Ã¹ ¼¼¹Ì³ª ÀÌÈÄ¿¡´Â °³° ȸ½ÄÀÌ ÀÖ½À´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.366 (2011.5.30)
¿¬»ç: À± ÀÚ »ó
Á¦¸ñ: A bridge between single and multivariable weighted shifts
ÀϽÃ: 2011³â 6¿ù 3ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 406È£
% ¼¼¹Ì³ª°¡ ³¡³ª°í 5½Ã 30ºÐÂë¿¡ ¼¿ï´ë ÀÔ±¸¿ªÀÇ ·¹½ºÅä¶û¿¡¼ Á¾°È¸½ÄÀÌ ÀÖ½À´Ï´Ù.
6¿ù Áß¼ø¿¡ ¿¹Á¤µÈ ÀÛ¿ë¼Ò ¼¼¹Ì³ªµéÀ» °øÁöÇÕ´Ï´Ù.
6¿ù 17ÀÏ¿¡´Â ÇϷ絿¾È PARC Workshop 2011 ±¹Á¦ ÇÐȸ°¡ ¿¸³´Ï´Ù.
6¿ù 13ÀÏ(¿ù) ÀÛ¿ë¼Ò ÁýÁß ¼¼¹Ì³ª (14:00-17:00)
14:00 - 14:40 : Muneo Cho (Kanagawa Univ, Japan)
On m-isometric operators
15:00 - 15:40 : Ilwoo Cho (Ambrose Univ, USA)
The Index Semigroup on Finite Trees
16:00-16:40 : Ja Sang Yoon (The Univ of Texas - PanAmerican, USA)
Note on the hyponormality of arbitrary powers of weighted shifts
6¿ù 17ÀÏ (±Ý) 9½Ã30ºÐ - ¿ÀÈÄ 6½Ã
PARC Workshop 2011 Operator Theory and Its Applications
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ÀÛ¿ë¼Ò ¼Ò½Ä No.365 (2011.5.16)
¿¬»ç: ÃÖ Çö ¼®
Á¦¸ñ: Exposed faces for decomposable positive linear maps arising from completely positive maps
ÀϽÃ: 2011³â 5¿ù 20ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 406È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.364 (2011.5.11)
¿¬»ç: ³² °è ¼÷
Á¦¸ñ: Mean value property and a Berezin-type transform
ÀϽÃ: 2011³â 5¿ù 13ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 406È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.363 (2011.4.18)
¿¬»ç: Çã Àç ¼º
Á¦¸ñ: Construction of representations associated with two maps
ÀϽÃ: 2011³â 4¿ù 22ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 406È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.362 (2011.4.11)
¿¬»ç: ±Ç Çö °æ
Á¦¸ñ: Model theory for biisometries
ÀϽÃ: 2011³â 4¿ù 15ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 406È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.361 (2011.4.4)
¿¬»ç: ÀÌ ÈÆ Èñ
Á¦¸ñ: Weighted fourier algebra and complexification of compact Lie groups
ÀϽÃ: 2011³â 4¿ù 8ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 406È£
ÃÊ·Ï: In this talk we will introduce a class of commutative Banach algebra called Beurling-Fourier algebra, which is a weighted version of Fourier algebra of a compact group.
Then, we will explain its connection to the complexification of compact Lie groups. Our primary examples of compact groups will be the torus and SU(2).
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ÀÛ¿ë¼Ò ¼Ò½Ä No.360 (2011.3.28)
¿¬»ç: Ȳ ÀÎ ¼º
Á¦¸ñ: The triangular form of the truncated shift
ÀϽÃ: 2011³â 4¿ù 1ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 406È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.359 (2011.3.21)
¿¬»ç: ÇÑ °æ ÈÆ
Á¦¸ñ: An approximation theorem for nuclear operator systems
ÀϽÃ: 2011³â 3¿ù 25ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 406È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.358 (2011.3.14)
¿¬»ç: °µ¿¿À
Á¦¸ñ: Interpolation problems and hyponormal Toeplitz operators
ÀϽÃ: 2011³â 3¿ù 18ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 406È£
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ÀÛ¿ë¼Ò ¼Ò½Ä No.357 (2011.3.7)
¿¬»ç: Á¤ ÀÚ¾Æ
Á¦¸ñ: The ideal structure of labelled graph C*-algebras
ÀϽÃ: 2011³â 3¿ù 11ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 406È£
À̹ø Çб⿡´Â ±Ý¿äÀÏ ¿ÀÈÄ 3½Ã 30ºÐ¿¡ ÀÛ¿ë¼Ò ¼¼¹Ì³ª¸¦ ÇÏ°Ô µÇ¾ú°í,
Àå¼Ò°¡ 406È£·Î ¹Ù²î¾ú½À´Ï´Ù.
3¿ù 11ÀÏ¿¡´Â ¼¼¹Ì³ª°¡ ³¡³ª°í °³° ȸ½ÄÀÌ ÀÖÀ¸´Ï, ¸¹ÀÌ Âü¼®ÇØ Áֽñ⠹ٶø´Ï´Ù.
(Ãß½Å) ¿ÃÇØ KOTAC ±¹Á¦ÇмúȸÀÇ´Â Àå¼Ò ¹®Á¦(¼¿ï´ë ¼ö¸®°úÇкΠ°Ç¹° ¸®¸ðµ¨¸µ µî)·Î ¿¸®Áö ¾Ê½À´Ï´Ù.
KOTACÀº ³»³â¿¡ ´Ù½Ã ¿¸± ¿¹Á¤ÀÔ´Ï´Ù. Âü°íÇϽñ⠹ٶø´Ï´Ù.
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ÀÛ¿ë¼Ò ¼Ò½Ä No.356 (2011.2.28)
¿¬»ç: Á¤ ÀÚ¾Æ
Á¦¸ñ: The ideal structure of labelled graph C*-algebras
ÀϽÃ: 2011³â 3¿ù 11ÀÏ ±Ý¿äÀÏ 3½Ã 30ºÐ
Àå¼Ò: »ó»ê°ü 301È£
À̹ø Çб⿡´Â ±Ý¿äÀÏ ¿ÀÈÄ 3½Ã 30ºÐ¿¡ ÀÛ¿ë¼Ò ¼¼¹Ì³ª¸¦ ÇÏ°Ô µÇ¾ú½À´Ï´Ù.
3¿ù 4ÀÏ¿¡´Â ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
3¿ù 11ÀÏ ¼¼¹Ì³ª°¡ ³¡³ª°í °³° ȸ½ÄÀÌ ÀÖ½À´Ï´Ù.