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Links to few questions that have already been published on MO:

a) Why is the quantum Lorentz group not connected?Why is the quantum Lorentz group not connected? Or: What does it mean for a a (compact) quantum group to be connected? (Ok, the (quantum) Lorentz group is not compact, but I find the question interesting).

b) Quantum Group Calculations in MathematicaQuantum Group Calculations in Mathematica Or more generally: What software is available for "quantum group calculations" (in Mathematica, Maple, Sage, GAP, etc.)?

c) Weyl Character Formula for Quantum Groups Weyl Character Formula for Quantum Groups

d) http://mathoverflow.net/questions/17861/bicovariant-calculi-on-the-quantum-unitary-groupshttps://mathoverflow.net/questions/17861/bicovariant-calculi-on-the-quantum-unitary-groups

e) Matrix model or cocycle twist construction for q-deformations of compact simple Lie groups in $q=-1$? Matrix model or cocycle twist construction for q-deformations of compact simple Lie groups in $q=-1$? Or: Find exemples of compact quantum groups for which are "close" to classical compact groups, e.g. can be constructed via cocycle twists or can be described as matrix-valued functions on classical groups.

Links to few questions that have already been published on MO:

a) Why is the quantum Lorentz group not connected? Or: What does it mean for a a (compact) quantum group to be connected? (Ok, the (quantum) Lorentz group is not compact, but I find the question interesting).

b) Quantum Group Calculations in Mathematica Or more generally: What software is available for "quantum group calculations" (in Mathematica, Maple, Sage, GAP, etc.)?

c) Weyl Character Formula for Quantum Groups

d) http://mathoverflow.net/questions/17861/bicovariant-calculi-on-the-quantum-unitary-groups

e) Matrix model or cocycle twist construction for q-deformations of compact simple Lie groups in $q=-1$? Or: Find exemples of compact quantum groups for which are "close" to classical compact groups, e.g. can be constructed via cocycle twists or can be described as matrix-valued functions on classical groups.

Links to few questions that have already been published on MO:

a) Why is the quantum Lorentz group not connected? Or: What does it mean for a a (compact) quantum group to be connected? (Ok, the (quantum) Lorentz group is not compact, but I find the question interesting).

b) Quantum Group Calculations in Mathematica Or more generally: What software is available for "quantum group calculations" (in Mathematica, Maple, Sage, GAP, etc.)?

c) Weyl Character Formula for Quantum Groups

d) https://mathoverflow.net/questions/17861/bicovariant-calculi-on-the-quantum-unitary-groups

e) Matrix model or cocycle twist construction for q-deformations of compact simple Lie groups in $q=-1$? Or: Find exemples of compact quantum groups for which are "close" to classical compact groups, e.g. can be constructed via cocycle twists or can be described as matrix-valued functions on classical groups.

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Uwe Franz
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Links to few questions that have already been published on MO:

a) Why is the quantum Lorentz group not connected? Or: What does it mean for a a (compact) quantum group to be connected? (Ok, the (quantum) Lorentz group is not compact, but I find the question interesting).

b) Quantum Group Calculations in Mathematica Or more generally: What software is available for "quantum group calculations" (in Mathematica, Maple, Sage, GAP, etc.)?

c) Weyl Character Formula for Quantum Groups

d) http://mathoverflow.net/questions/17861/bicovariant-calculi-on-the-quantum-unitary-groups

e) Matrix model or cocycle twist construction for q-deformations of compact simple Lie groups in $q=-1$? Or: ExemplesFind exemples of compact quantum groups for which are "close" to classical compact groups, e.g. can be constructed via cocycle twists or can be described as matrix-valued functions on classical groups.

Links to few questions that have already been published on MO:

a) Why is the quantum Lorentz group not connected? Or: What does it mean for a a (compact) quantum group to be connected? (Ok, the (quantum) Lorentz group is not compact, but I find the question interesting).

b) Quantum Group Calculations in Mathematica Or more generally: What software is available for "quantum group calculations" (in Mathematica, Maple, Sage, GAP, etc.)?

c) Weyl Character Formula for Quantum Groups

d) http://mathoverflow.net/questions/17861/bicovariant-calculi-on-the-quantum-unitary-groups

e) Matrix model or cocycle twist construction for q-deformations of compact simple Lie groups in $q=-1$? Or: Exemples of compact quantum groups for which are "close" to classical compact groups, e.g. can be constructed via cocycle twists or can be described as matrix-valued functions on classical groups.

Links to few questions that have already been published on MO:

a) Why is the quantum Lorentz group not connected? Or: What does it mean for a a (compact) quantum group to be connected? (Ok, the (quantum) Lorentz group is not compact, but I find the question interesting).

b) Quantum Group Calculations in Mathematica Or more generally: What software is available for "quantum group calculations" (in Mathematica, Maple, Sage, GAP, etc.)?

c) Weyl Character Formula for Quantum Groups

d) http://mathoverflow.net/questions/17861/bicovariant-calculi-on-the-quantum-unitary-groups

e) Matrix model or cocycle twist construction for q-deformations of compact simple Lie groups in $q=-1$? Or: Find exemples of compact quantum groups for which are "close" to classical compact groups, e.g. can be constructed via cocycle twists or can be described as matrix-valued functions on classical groups.

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Source Link
Uwe Franz
  • 2.2k
  • 21
  • 27

Links to few questions that have already been published on MO:

a) Why is the quantum Lorentz group not connected? Or: What does it mean for a a (compact) quantum group to be connected? (Ok, the (quantum) Lorentz group is not compact, but I find the question interesting).

b) Quantum Group Calculations in Mathematica Or more generally: What software is available for "quantum group calculations" (in Mathematica, Maple, Sage, GAP, etc.)?

c) Weyl Character Formula for Quantum Groups

d) http://mathoverflow.net/questions/17861/bicovariant-calculi-on-the-quantum-unitary-groups

e) Matrix model or cocycle twist construction for q-deformations of compact simple Lie groups in $q=-1$? Or: Exemples of compact quantum groups for which are "close" to classical compact groups, e.g. can be constructed via cocycle twists or can be described as matrix-valued functions on classical groups.