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A diagram calculus for certain canonical bases.

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A diagram calculus for certain canonical bases. / Green, R. M.
In: Communications in Mathematical Physics, Vol. 183, No. 3, 02.1997, p. 521-532.

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Harvard

Green, RM 1997, 'A diagram calculus for certain canonical bases.', Communications in Mathematical Physics, vol. 183, no. 3, pp. 521-532. https://doi.org/10.1007/s002200050041

APA

Green, R. M. (1997). A diagram calculus for certain canonical bases. Communications in Mathematical Physics, 183(3), 521-532. https://doi.org/10.1007/s002200050041

Vancouver

Green RM. A diagram calculus for certain canonical bases. Communications in Mathematical Physics. 1997 Feb;183(3):521-532. doi: 10.1007/s002200050041

Author

Green, R. M. / A diagram calculus for certain canonical bases. In: Communications in Mathematical Physics. 1997 ; Vol. 183, No. 3. pp. 521-532.

Bibtex

@article{466a7ffcd196482d90d3e7a977bb91b2,
title = "A diagram calculus for certain canonical bases.",
abstract = "We introduce a certain cellular algebra which is a quotient of the q-Schur algebra . This is naturally equipped with a canonical basis which is compatible with Lusztig's canonical bases for certain modules for the quantized enveloping algebra . We describe a diagram calculus for which makes calculations involving the corresponding canonical bases easy to understand.",
author = "Green, {R. M.}",
year = "1997",
month = feb,
doi = "10.1007/s002200050041",
language = "English",
volume = "183",
pages = "521--532",
journal = "Communications in Mathematical Physics",
issn = "0010-3616",
publisher = "Springer New York",
number = "3",

}

RIS

TY - JOUR

T1 - A diagram calculus for certain canonical bases.

AU - Green, R. M.

PY - 1997/2

Y1 - 1997/2

N2 - We introduce a certain cellular algebra which is a quotient of the q-Schur algebra . This is naturally equipped with a canonical basis which is compatible with Lusztig's canonical bases for certain modules for the quantized enveloping algebra . We describe a diagram calculus for which makes calculations involving the corresponding canonical bases easy to understand.

AB - We introduce a certain cellular algebra which is a quotient of the q-Schur algebra . This is naturally equipped with a canonical basis which is compatible with Lusztig's canonical bases for certain modules for the quantized enveloping algebra . We describe a diagram calculus for which makes calculations involving the corresponding canonical bases easy to understand.

U2 - 10.1007/s002200050041

DO - 10.1007/s002200050041

M3 - Journal article

VL - 183

SP - 521

EP - 532

JO - Communications in Mathematical Physics

JF - Communications in Mathematical Physics

SN - 0010-3616

IS - 3

ER -