ÀÛ¿ë¼Ò ¼Ò½Ä
No.243.
(
¿¬»ç:
Á¦¸ñ: q-deformed Gaussians and operator
space
ÀϽÃ: 2006³â 12 ¿ù 15 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÃÊ·Ï:
In this talk we consider q-deformed Gaussians (-1<q<1), the
associated von Neumann algebra M_q
and the operator
space structure of their homogeneous polymonials
with fixed degree n in L_p(M_q).
Note that n=1 case is
nothing but the span of q-deformed Gaussians.
We will start with
reviewing the free case (q=0) and move to the q-deformed setting
later.
12¿ù
15ÀÏ
ÀÛ¿ë¼Ò ¼Ò½Ä
No.242.
(
¿¬»ç: Muneo Cho (Kanagawa Univ, Japan)
Á¦¸ñ: Numerical ranges of some Hilbert space
operators
ÀϽÃ: 2006³â 11
¿ù 22 ÀÏ ¼ö¿äÀÏ
Àå¼Ò: »ó»ê°ü 406È£
¿¬»ç: ÁÖÇ⿬
(KIAS)
Á¦¸ñ: Characterizations on 2-isometry and some
remarks for topological dynamics
ÀϽÃ: 2006³â 11 ¿ù 24 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÃÊ·Ï: In this talk, we consider the concept of
2-isometry which is suitable to represent the notion of area
preserving mappings in linear 2-normed spaces and then we obtain
some results for the several problems in linear 2-normed
spaces. Also we survey the notions of Lyapunov functions, attractors, recurrences and
strong centers of attractions for topological dynamics on noncompact metric spaces and we also discuss some properties
of these concepts.
¿¬»ç:
Á¦¸ñ: TBA
ÀϽÃ: 2006³â 12 ¿ù 15 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
12¿ù
1ÀÏ°ú 12¿ù 8ÀÏÀº °¢°¢ ¼¿ï´ë ¼ö½Ã ¸ðÁý°ú
°æºÏ´ë ÀÛ¿ë¼Ò ¼¼¹Ì³ª °ü°è·Î ÈÞ°ÀÔ´Ï´Ù.
12¿ù
15ÀÏ
ÀÛ¿ë¼Ò ¼Ò½Ä
No.241.
(2006.11.12)
¿¬»ç:
Á¦¸ñ: Unifrom embeddability, exactness and a-T-menability of discrete
groups
ÀϽÃ: 2006³â 11 ¿ù 17 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Muneo Cho (Kanagawa Univ, Japan)
Á¦¸ñ: Numerical ranges of some Hilbert space
operators
ÀϽÃ: 2006³â 11
¿ù 22 ÀÏ ¼ö¿äÀÏ
Àå¼Ò: »ó»ê°ü 406È£
¿¬»ç: ÁÖÇ⿬
(°íµî°úÇпø)
Á¦¸ñ: Characterizations on 2-isometry and some
remarks for topological dynamics
ÀϽÃ: 2006³â 11 ¿ù 24 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÃÊ·Ï: In this talk, we consider the concept of
2-isometry which is suitable to represent the notion of area
preserving mappings in linear 2-normed spaces and then we obtain
some results for the several problems in linear 2-normed
spaces. Also we survey the notions of Lyapunov functions, attractors, recurrences and
strong centers of attractions for topological dynamics on noncompact metric spaces and we also discuss some properties
of these concepts.
ÀÛ¿ë¼Ò ¼Ò½Ä
No.240. (
¿¬»ç: F. Hiai (
Á¦¸ñ: Inequalities related to free entropy
ÀϽÃ: 2006³â 11 ¿ù 9
ÀÏ ¸ñ¿äÀÏ
Àå¼Ò: ÇѾç´ëÇб³ ¼öÇаú 36-706È£
ÃÊ·Ï: I will give a lecture about free probabilistic analogs of
several inequalities
such as transportation cost inequallity, logarithmic Sobolev
inequality,
Prekopa-Leindler inequality (or
functional Brunn-Minkowski inequality),
entropy
power inequality and so on. I will explain those free analogs
by contrast
with those in classical theory and in connection with
random
matrix approximation.
¿¬»ç:
Á¦¸ñ: Developments of Bishop-Phelps
Theorem
ÀϽÃ: 2006³â 11 ¿ù 10 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÃÊ·Ï: In
1961, Bishop and Phelps showed that the set
of norm-attaining linear fuctionals is dense in the
dual space X^*. After that quite a few prominent mathematicians
including Lindenstrauss, Bourgain, etc, studied the density of norm-attaining
operators between Banach spaces.
From the middle of
1990's, this problem was extended to nonlinear mappings such as multilinear mappings, polynomials and holomorphic mappings. We review briefly important classical
results and survey most recent ones.
¿¬»ç: Muneo Cho (Kanagawa Univ, Japan)
Á¦¸ñ: Numerical ranges of some Hilbert space
operators
ÀϽÃ: 2006³â 11
¿ù 22 ÀÏ ¼ö¿äÀÏ
Àå¼Ò: »ó»ê°ü 406È£
ÀÛ¿ë¼Ò ¼Ò½Ä
No.239. (
¿¬»ç:
Á¦¸ñ: Isomorphisms and Derivations in
C*-algebras
ÀϽÃ: 2006³â
11 ¿ù 3 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: F. Hiai (
Á¦¸ñ: Inequalities related to free entropy
ÀϽÃ: 2006³â 11 ¿ù 9
ÀÏ ¸ñ¿äÀÏ
Àå¼Ò: ÇѾç´ëÇб³ ¼öÇаú 36-706È£
ÃÊ·Ï: I will give a lecture about free probabilistic analogs of
several inequalities such as transportation cost inequallity, logarithmic Sobolev
inequality, Prekopa-Leindler inequality (or functional
Brunn-Minkowski inequality), entropy power inequality
and so on. I will explain those free analogs by contrast with those in classical theory and in connection with random
matrix approximation.
¿¬»ç:
Á¦¸ñ: Developments of Bishop-Phelps
Theorem
ÀϽÃ: 2006³â 11 ¿ù 10 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÃÊ·Ï: In
1961, Bishop and Phelps showed that the set
of norm-attaining linear fuctionals is dense in the
dual space X^*. After that quite a few prominent mathematicians
including Lindenstrauss, Bourgain, etc, studied the density of norm-attaining
operators between Banach spaces.
From the middle of
1990's, this problem was extended to nonlinear mappings such as multilinear mappings, polynomials and holomorphic mappings. We review briefly important classical
results and survey most recent ones.
¿¬»ç: Muneo Cho (Kanagawa Univ, Japan)
Á¦¸ñ: Numerical ranges of some Hilbert space
operators
ÀϽÃ: 2006³â 11
¿ù 22 ÀÏ ¼ö¿äÀÏ
Àå¼Ò: »ó»ê°ü 406È£
ÀÛ¿ë¼Ò ¼Ò½Ä
No.238. (
À̹øÁÖ´Â ´ëÇѼöÇÐȸ °ü°è·Î ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
¿¬»ç:
Á¦¸ñ: Isomorphisms and Derivations in
C*-algebras
ÀϽÃ: 2006³â
11 ¿ù 3 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: F. Hiai (
Á¦¸ñ: Inequalities related to free entropy
ÀϽÃ: 2006³â 11 ¿ù 9
ÀÏ ¸ñ¿äÀÏ
Àå¼Ò: ÇѾç´ëÇб³ ¼öÇаú 36-706È£
ÃÊ·Ï: I will give a lecture about free probabilistic analogs of
several inequalities such as transportation cost inequallity, logarithmic Sobolev
inequality, Prekopa-Leindler inequality (or functional
Brunn-Minkowski inequality), entropy power inequality
and so on. I will explain those free analogs by contrast with those in classical theory and in connection with random
matrix approximation.
¿¬»ç:
Á¦¸ñ: TBA
ÀϽÃ: 2006³â 11 ¿ù 10 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÀÛ¿ë¼Ò ¼Ò½Ä
No.237. (
¿¬»ç:
Á¦¸ñ: The hyperinvariant subspace problem for quasinilpotent operators II.
ÀϽÃ: 2006³â 10 ¿ù 20 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: F. Hiai (
Á¦¸ñ: Inequalities related to free entropy
ÀϽÃ:
Àå¼Ò: ÇѾç´ëÇб³ ¼öÇаú 36-706È£
ÃÊ·Ï: I will give a lecture about free probabilistic analogs of
several inequalities such as transportation cost inequallity, logarithmic Sobolev
inequality, Prekopa-Leindler inequality (or functional
Brunn-Minkowski inequality), entropy power inequality
and so on. I will explain those free analogs by contrast with those in classical theory and in connection with random
matrix approximation.
ÀÛ¿ë¼Ò ¼Ò½Ä No.236. (
¿¬»ç:
Á¦¸ñ: The hyperinvariant subspace problem for quasinilpotent operators.
ÀϽÃ: 2006³â 10 ¿ù 13 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÀÛ¿ë¼Ò ¼Ò½Ä No.235. (
¿¬»ç:
Á¦¸ñ: Hyponormality and subnormality of multivariable weighted shifts
II
ÀϽÃ: 2006³â 9 ¿ù 22 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç:
Á¦¸ñ: The projection from a full $C^*$-algebra associated to a free
group onto the span of generators.
ÀϽÃ: 2006³â 9 ¿ù 29 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÀÛ¿ë¼Ò ¼Ò½Ä No.234. (
¿¬»ç:
Á¦¸ñ: Hyponormality and subnormality of multivariable weighted shifts I
ÀϽÃ: 2006³â 9 ¿ù 15 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç:
Á¦¸ñ: Hyponormality and subnormality of multivariable weighted shifts II
ÀϽÃ: 2006³â 9 ¿ù 22 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÀÛ¿ë¼Ò ¼Ò½Ä No.233. (
* 2Çбâ ÀÛ¿ë¼Ò ¼¼¹Ì³ª´Â 9¿ù 8ÀϺÎÅÍÀÔ´Ï´Ù.
¼¼¹Ì³ª°¡ ³¡³ ÈÄ¿¡ °³° ȸ½ÄÀÌ ÀÖ½À´Ï´Ù.
¿¬»ç:
Á¦¸ñ: A look at the BDF
theorem
ÀϽÃ: 2006³â 9 ¿ù 8 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç:
Á¦¸ñ: Hyponormality and subnormality of multivariable weighted shifts
ÀϽÃ: 2006³â 9 ¿ù 15 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÀÛ¿ë¼Ò ¼Ò½Ä No.232. (
*IWOTA2006ÀÌ ½ÃÀÛÇϱâ Àü, ¾Æ·¡¿Í °°Àº °¿¬ÀÌ ÀÖÀ½À» ¾Ë·Á µå¸³´Ï´Ù.
¿¬»ç: Wieslaw Zelazko (Institute of
Math., Polish Academy of Sciences)
Á¦¸ñ: (Ưº°°¿¬)Short History of Polish
Mathematics
ÀϽÃ: 2006³â 7 ¿ù 20 ÀÏ ¸ñ¿äÀÏ
Àå¼Ò: »ó»ê°ü 406È£
¿¬»ç: Prof. David Blecher (Univ. of Houston)
Á¦¸ñ: (ÁýÁß°¿¬ 1)Operator spaces and their
duality
ÀϽÃ: 2006³â 7 ¿ù 26 ÀÏ ¼ö¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
Abstract: We give
an introduction to some of the main ideas in the theory of operator spaces, and
in particular of their duality.
¿¬»ç: Prof. Hiroyuki Osaka (Ritsumeikan Univ)
Á¦¸ñ: Stable ranks of crossed
products algebras
ÀϽÃ: 2006³â 7 ¿ù 26 ÀÏ ¼ö¿äÀÏ
Àå¼Ò: »ó»ê°ü 406È£
¿¬»ç: Prof. David Blecher (Univ. of Houston)
Á¦¸ñ: (ÁýÁß°¿¬ 2)Operator spaces, C*-modules, and
injectivity
ÀϽÃ: 2006³â 7 ¿ù 27 ÀÏ ¸ñ¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
Abstract: We
review many of the profound connections between operator spaces and Hilbert
C*-modules, and TROs (ternary rings of operators). We
also review Hamana's theory of injective envelopes,
and give some applications to operator spaces and operator algebras, and their
duality.
¿¬»ç: Prof. Wieslaw Zelazko (Polish Academy of
Sciences )
Á¦¸ñ: Topological algebras: some recent
reults and open problems
ÀϽÃ: 2006³â 7 ¿ù 27 ÀÏ ¸ñ¿äÀÏ
Àå¼Ò: »ó»ê°ü 406È£
¿¬»ç: Prof. David Blecher (Univ. of Houston)
Á¦¸ñ: (ÁýÁß°¿¬ 3)Structure in operator spaces and noncommutative function theory
ÀϽÃ: 2006³â 7 ¿ù 28 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 406È£
Abstract: We
examine algebraic structure in operator spaces using ideas from C*-module
theory. We also discuss some basic ideas in noncommutative function theory, from an operator space
viewpoint, and using the duality of operator spaces.
¿¬»ç: Prof. Hiroyuki Osaka (Ritsumeikan Univ)
Á¦¸ñ: Tracial
Roklin property of automorphisms on simple C*-algebras
ÀϽÃ: 2006³â 7 ¿ù 28 ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 406È£
ÀÛ¿ë¼Ò ¼Ò½Ä No.231. (
¿¬»ç: ÀÌÀÎÇù (George Washington Univ.)
Á¦¸ñ: C*-algebras from one-dimensional solenoids
ll.
ÀϽÃ: 2006³â 6 ¿ù 8ÀÏ ¸ñ¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÀÛ¿ë¼Ò ¼Ò½Ä No.230. (
¿¬»ç: ÀÌÀÎÇù (George Washington Univ.)
Á¦¸ñ: C*-algebras from one-dimensional
solenoids.
ÀϽÃ: 2006³â 6 ¿ù 2ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 406È£
¿¬»ç:
Á¦¸ñ: The connection between wavelet image compression and
operator theory
ÀϽÃ: 2006³â 6 ¿ù 2ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
6¿ù
2ÀÏ ¿ÀÀü ¼¼¹Ì³ª´Â 406È£¿¡¼
ÇÕ´Ï´Ù.
À̹ø Çбâ Á¾°Àº 6¿ù 2ÀÏÀÔ´Ï´Ù.
6¿ù
2ÀÏ Àú³á¿¡´Â Á¾° ȸ½ÄÀÌ ÀÖ½À´Ï´Ù.
ÀÛ¿ë¼Ò ¼Ò½Ä No.229. (
¿¬»ç:
Á¦¸ñ: Hyponormality of Toeplitz operators with polynomial
symbols
ÀϽÃ: 2006³â 5 ¿ù 26ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÀÌÀÎÇù
(George Washington Univ.)
Á¦¸ñ: C*-algebras from one-dimensional
solenoids.
ÀϽÃ: 2006³â 6 ¿ù 2ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç:
Á¦¸ñ: The connection between wavelet image compression and
operator theory
ÀϽÃ: 2006³â 6 ¿ù 2ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
6¿ù
2ÀÏ ¿ÀÀü(
À̹ø Çбâ Á¾°Àº 6¿ù 2ÀÏÀÔ´Ï´Ù.
6¿ù
2ÀÏ Àú³á¿¡´Â Á¾° ȸ½ÄÀÌ ÀÖ½À´Ï´Ù.
ÀÛ¿ë¼Ò ¼Ò½Ä No.228. (
¿¬»ç:
Á¦¸ñ: Additive functions on sets of hermitian matrices
ÀϽÃ: 2006³â 5 ¿ù 19ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç:
Á¦¸ñ: Hyponormality of Toeplitz operators with polynomial
symbols
ÀϽÃ: 2006³â 5 ¿ù 26ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç:
Á¦¸ñ: The connection between wavelet image compression and
operator theory
ÀϽÃ: 2006³â 6 ¿ù 2ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
À̹ø Çбâ Á¾°Àº 6¿ù 2ÀÏÀÔ´Ï´Ù.
ÀÛ¿ë¼Ò ¼Ò½Ä No.227. (
¿¬»ç:
Á¦¸ñ: Gibbsianness of determinantal
point processes
ÀϽÃ: 2006³â 5 ¿ù 12ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç:
Á¦¸ñ: Additive
functions on sets of hermitian
matrices
ÀϽÃ:
2006³â 5 ¿ù 19ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÀÛ¿ë¼Ò ¼Ò½Ä No.226. (
¿¬»ç:
Á¦¸ñ: On
n-contractive weighted shift
ÀϽÃ:
2006³â 4 ¿ù 28ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç:
Á¦¸ñ: TBA
ÀϽÃ:
2006³â 5 ¿ù 12ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç:
Á¦¸ñ: Additive
functions on sets of hermitian
matrices
ÀϽÃ:
2006³â 5 ¿ù 19ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
À̹ø Çб⿡´Â »êÇàÀ» °¡Áö ¾Ê±â·Î ÇÏ¿´½À´Ï´Ù.
ÀÛ¿ë¼Ò ¼Ò½Ä No.225. (
¿¬»ç:
Á¦¸ñ: On
n-contractive weighted shift
ÀϽÃ:
2006³â 4 ¿ù 28ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç:
Á¦¸ñ: Additive
functions on sets of hermitian
matrices
ÀϽÃ:
2006³â 5 ¿ù 19ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
(¾Ë¸®´Â ¸»¾¸)
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4¿ù 22ÀÏ ¿¸®´Â ´ëÇѼöÇÐȸ(µ¿¾Æ´ë)¿¡ Âü¼®ÇϽô ºÐµé Áß ½Ã°£ÀÌ µÇ´Â ºÐµéÀº 4¿ù 21ÀÏ ºÎ»ê¿¡¼
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¾Æ·¡ ¹øÈ£·Î ÀüÈÇÏ½Ã¸é ¾Ë·Áµå¸®°Ú½À´Ï´Ù. ´ë·«ÀÇ ÀÏÁ¤Àº ´ÙÀ½°ú °°½À´Ï´Ù.
ºÎ»ê µµÂø ¿¹Á¤ ½Ã°£ : ¿ÀÈÄ 5½Ã°æ
Àú³á ½Ä»ç ½Ã°£ :
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016-223-8829(
ÀÛ¿ë¼Ò ¼Ò½Ä No.224. (
4¿ù 21ÀÏÀº ´ÙÀ½³¯ 4¿ù 22ÀÏ ¿¸®´Â ´ëÇѼöÇÐȸ °ü°è·Î ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
¿¬»ç: Viacheslav Belavkin (Univ.
Á¦¸ñ: Quantum
stochastic dynamics on operator algebras
ÀϽÃ:
2006³â 4 ¿ù 14ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç:
Á¦¸ñ: Additive
functions on sets of hermitian
matrices
ÀϽÃ:
2006³â 5 ¿ù 19ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÀÛ¿ë¼Ò ¼Ò½Ä No.223. (
*4¿ù 21ÀÏÀº ´ÙÀ½³¯ 4¿ù 22ÀÏ ¿¸®´Â ´ëÇѼöÇÐȸ °ü°è·Î ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
¿¬»ç: ÀÌÀüÀÍ (»ó¸í´ëÇб³)
Á¦¸ñ: On the
projective property of some operators
ÀϽÃ:
2006³â 4 ¿ù 7ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç:
Á¦¸ñ: Additive
functions on sets of hermitian
matrices
ÀϽÃ:
2006³â 5 ¿ù 19ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÀÛ¿ë¼Ò ¼Ò½Ä No.222. (
*4¿ù
21ÀÏÀº ´ÙÀ½³¯ 4¿ù 22ÀÏ ¿¸®´Â ´ëÇѼöÇÐȸ °ü°è·Î ¼¼¹Ì³ª°¡ ¾ø½À´Ï´Ù.
¿¬»ç: Á¤ÀϺÀ (°æºÏ´ëÇб³)
Á¦¸ñ: Some hyperinvariant subspaces
of operators
ÀϽÃ: 2006³â 3 ¿ù
31ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: ÀÌÀüÀÍ (»ó¸í´ëÇб³)
Á¦¸ñ: TBA
ÀϽÃ: 2006³â 4 ¿ù 7ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç:
Á¦¸ñ: Additive functions on sets of hermitian matrices
ÀϽÃ: 2006³â 5 ¿ù 19ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÀÛ¿ë¼Ò ¼Ò½Ä No.221. (
¿¬»ç:
Á¦¸ñ: Isometries and Quotient Maps in Operator
Spaces
ÀϽÃ:
2006³â 3 ¿ù 24ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Á¤ÀϺÀ (°æºÏ´ëÇб³)
Á¦¸ñ: Some Hyperinvariant Subspaces of
Operators
ÀϽÃ: 2006³â 3 ¿ù 31ÀÏ
±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÀÛ¿ë¼Ò ¼Ò½Ä No.220. (
*2006³âµµ 1Çбâ ÀÛ¿ë¼Ò ÁÖ°£ ¼¼¹Ì³ª´Â ¸ÅÁÖ ±Ý¿äÀÏ
¿¬»ç:
Á¦¸ñ: Condition C for
operator spaces
ÀϽÃ:
2006³â 3 ¿ù 17ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
¿¬»ç: Á¤ÀϺÀ (°æºÏ´ëÇб³)
Á¦¸ñ:
TBA
ÀϽÃ:
2006³â 3 ¿ù 31ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü 301È£
ÀÛ¿ë¼Ò ¼Ò½Ä No.219. (
*2006³âµµ 1Çбâ ÀÛ¿ë¼Ò ÁÖ°£ ¼¼¹Ì³ª´Â ¸ÅÁÖ ±Ý¿äÀÏ
* 3¿ù
10ÀÏ ¼¼¹Ì³ª°¡ ³¡³ ÈÄ °³°È¸½ÄÀ» °¡Áú ¿¹Á¤ÀÔ´Ï´Ù.
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¿¬»ç: Á¤ÀÚ¾Æ (¼¿ï´ëÇб³)
Á¦¸ñ: Ideals of
C*-crossed products
ÀϽÃ:
2006³â 3 ¿ù 10ÀÏ ±Ý¿äÀÏ
Àå¼Ò: »ó»ê°ü
301È£
¿¬»ç:
Á¦¸ñ: Condition C for operator
spaces
ÀϽÃ: 2006³â 3
¿ù 17ÀÏ ±Ý¿äÀÏ
Àå¼Ò:
»ó»ê°ü 301È£