Current Betti Table Entry:
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(1,0,0) |
(8,1,0) |
(15,1,1) |
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1 |
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(20,5,0) |
(27,5,1) |
(33,6,2) |
(39,6,4) |
(44,9,4) |
(49,11,5) |
(54,12,7) |
(59,12,10) |
(63,16,10) |
(67,19,11) |
(71,21,13) |
(75,22,16) |
(79,22,20) |
(82,27,20) |
(85,31,21) |
(88,34,23) |
(91,36,26) |
(94,37,30) |
(97,37,35) |
(99,43,35) |
(101,48,36) |
(103,52,38) |
(105,55,41) |
(107,57,45) |
(109,58,50) |
(111,58,56) |
(112,65,56) |
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(118,109,86) |
(119,109,93) |
(119,113,97) |
(119,116,102) |
(119,118,108) |
(119,119,115) |
\(\lambda=(119,115,111)\)
- Multiplicity: 1
- Dimension: 125
- Dominant: No
\(\lambda=(119,118,108)\)
- Multiplicity: 1
- Dimension: 143
- Dominant: Yes
\(\lambda=(119,117,109)\)
- Multiplicity: 1
- Dimension: 162
- Dominant: No
\(\lambda=(119,116,110)\)
- Multiplicity: 1
- Dimension: 154
- Dominant: No
\(\textbf{a}=(108,118,119)\)
- Multiplicity: 1
- Dimension: 1
- Error: 0
\(\textbf{a}=(115,112,118)\)
- Multiplicity: 8
- Dimension: 1
- Error: 0
\(\textbf{a}=(113,116,116)\)
- Multiplicity: 12
- Dimension: 1
- Error: 0
\(\textbf{a}=(118,114,113)\)
- Multiplicity: 8
- Dimension: 1
- Error: 0
\(\textbf{a}=(116,118,111)\)
- Multiplicity: 7
- Dimension: 1
- Error: 0
\(\textbf{a}=(115,111,119)\)
- Multiplicity: 4
- Dimension: 1
- Error: 0
\(\textbf{a}=(113,115,117)\)
- Multiplicity: 11
- Dimension: 1
- Error: 0
\(\textbf{a}=(116,117,112)\)
- Multiplicity: 10
- Dimension: 1
- Error: 0
\(\textbf{a}=(118,113,114)\)
- Multiplicity: 8
- Dimension: 1
- Error: 0
\(\textbf{a}=(111,119,115)\)
- Multiplicity: 4
- Dimension: 1
- Error: 0
\(\textbf{a}=(113,114,118)\)
- Multiplicity: 8
- Dimension: 1
- Error: 0
\(\textbf{a}=(111,118,116)\)
- Multiplicity: 7
- Dimension: 1
- Error: 0
\(\textbf{a}=(116,116,113)\)
- Multiplicity: 12
- Dimension: 1
- Error: 0
\(\textbf{a}=(119,118,108)\)
- Multiplicity: 1
- Dimension: 1
- Error: 0
\(\textbf{a}=(118,112,115)\)
- Multiplicity: 8
- Dimension: 1
- Error: 0
\(\textbf{a}=(113,113,119)\)
- Multiplicity: 4
- Dimension: 1
- Error: 0
\(\textbf{a}=(111,117,117)\)
- Multiplicity: 8
- Dimension: 1
- Error: 0
\(\textbf{a}=(114,119,112)\)
- Multiplicity: 4
- Dimension: 1
- Error: 0
\(\textbf{a}=(119,117,109)\)
- Multiplicity: 2
- Dimension: 1
- Error: 0
\(\textbf{a}=(116,115,114)\)
- Multiplicity: 13
- Dimension: 1
- Error: 0
\(\textbf{a}=(118,111,116)\)
- Multiplicity: 7
- Dimension: 1
- Error: 0
\(\textbf{a}=(111,116,118)\)
- Multiplicity: 7
- Dimension: 1
- Error: 0
\(\textbf{a}=(118,110,117)\)
- Multiplicity: 5
- Dimension: 1
- Error: 0
\(\textbf{a}=(119,116,110)\)
- Multiplicity: 3
- Dimension: 1
- Error: 0
\(\textbf{a}=(114,118,113)\)
- Multiplicity: 8
- Dimension: 1
- Error: 0
\(\textbf{a}=(116,114,115)\)
- Multiplicity: 13
- Dimension: 1
- Error: 0
\(\textbf{a}=(111,115,119)\)
- Multiplicity: 4
- Dimension: 1
- Error: 0
\(\textbf{a}=(118,109,118)\)
- Multiplicity: 3
- Dimension: 1
- Error: 0
\(\textbf{a}=(109,119,117)\)
- Multiplicity: 2
- Dimension: 1
- Error: 0
\(\textbf{a}=(117,119,109)\)
- Multiplicity: 2
- Dimension: 1
- Error: 0
\(\textbf{a}=(119,115,111)\)
- Multiplicity: 4
- Dimension: 1
- Error: 0
\(\textbf{a}=(114,117,114)\)
- Multiplicity: 11
- Dimension: 1
- Error: 0
\(\textbf{a}=(116,113,116)\)
- Multiplicity: 12
- Dimension: 1
- Error: 0
\(\textbf{a}=(118,108,119)\)
- Multiplicity: 1
- Dimension: 1
- Error: 0
\(\textbf{a}=(109,118,118)\)
- Multiplicity: 3
- Dimension: 1
- Error: 0
\(\textbf{a}=(116,112,117)\)
- Multiplicity: 10
- Dimension: 1
- Error: 0
\(\textbf{a}=(119,114,112)\)
- Multiplicity: 4
- Dimension: 1
- Error: 0
\(\textbf{a}=(117,118,110)\)
- Multiplicity: 5
- Dimension: 1
- Error: 0
\(\textbf{a}=(114,116,115)\)
- Multiplicity: 13
- Dimension: 1
- Error: 0
\(\textbf{a}=(109,117,119)\)
- Multiplicity: 2
- Dimension: 1
- Error: 0
\(\textbf{a}=(116,111,118)\)
- Multiplicity: 7
- Dimension: 1
- Error: 0
\(\textbf{a}=(114,115,116)\)
- Multiplicity: 13
- Dimension: 1
- Error: 0
\(\textbf{a}=(119,113,113)\)
- Multiplicity: 4
- Dimension: 1
- Error: 0
\(\textbf{a}=(117,117,111)\)
- Multiplicity: 8
- Dimension: 1
- Error: 0
\(\textbf{a}=(112,119,114)\)
- Multiplicity: 4
- Dimension: 1
- Error: 0
\(\textbf{a}=(116,110,119)\)
- Multiplicity: 3
- Dimension: 1
- Error: 0
\(\textbf{a}=(114,114,117)\)
- Multiplicity: 11
- Dimension: 1
- Error: 0
\(\textbf{a}=(117,116,112)\)
- Multiplicity: 10
- Dimension: 1
- Error: 0
\(\textbf{a}=(119,112,114)\)
- Multiplicity: 4
- Dimension: 1
- Error: 0
\(\textbf{a}=(112,118,115)\)
- Multiplicity: 8
- Dimension: 1
- Error: 0
\(\textbf{a}=(114,113,118)\)
- Multiplicity: 8
- Dimension: 1
- Error: 0
\(\textbf{a}=(112,117,116)\)
- Multiplicity: 10
- Dimension: 1
- Error: 0
\(\textbf{a}=(117,115,113)\)
- Multiplicity: 11
- Dimension: 1
- Error: 0
\(\textbf{a}=(115,119,111)\)
- Multiplicity: 4
- Dimension: 1
- Error: 0
\(\textbf{a}=(119,111,115)\)
- Multiplicity: 4
- Dimension: 1
- Error: 0
\(\textbf{a}=(114,112,119)\)
- Multiplicity: 4
- Dimension: 1
- Error: 0
\(\textbf{a}=(112,116,117)\)
- Multiplicity: 10
- Dimension: 1
- Error: 0
\(\textbf{a}=(115,118,112)\)
- Multiplicity: 8
- Dimension: 1
- Error: 0
\(\textbf{a}=(117,114,114)\)
- Multiplicity: 11
- Dimension: 1
- Error: 0
\(\textbf{a}=(119,110,116)\)
- Multiplicity: 3
- Dimension: 1
- Error: 0
\(\textbf{a}=(112,115,118)\)
- Multiplicity: 8
- Dimension: 1
- Error: 0
\(\textbf{a}=(119,109,117)\)
- Multiplicity: 2
- Dimension: 1
- Error: 0
\(\textbf{a}=(110,119,116)\)
- Multiplicity: 3
- Dimension: 1
- Error: 0
\(\textbf{a}=(118,119,108)\)
- Multiplicity: 1
- Dimension: 1
- Error: 0
\(\textbf{a}=(115,117,113)\)
- Multiplicity: 11
- Dimension: 1
- Error: 0
\(\textbf{a}=(117,113,115)\)
- Multiplicity: 11
- Dimension: 1
- Error: 0
\(\textbf{a}=(112,114,119)\)
- Multiplicity: 4
- Dimension: 1
- Error: 0
\(\textbf{a}=(119,108,118)\)
- Multiplicity: 1
- Dimension: 1
- Error: 0
\(\textbf{a}=(110,118,117)\)
- Multiplicity: 5
- Dimension: 1
- Error: 0
\(\textbf{a}=(118,118,109)\)
- Multiplicity: 3
- Dimension: 1
- Error: 0
\(\textbf{a}=(115,116,114)\)
- Multiplicity: 13
- Dimension: 1
- Error: 0
\(\textbf{a}=(117,112,116)\)
- Multiplicity: 10
- Dimension: 1
- Error: 0
\(\textbf{a}=(110,117,118)\)
- Multiplicity: 5
- Dimension: 1
- Error: 0
\(\textbf{a}=(117,111,117)\)
- Multiplicity: 8
- Dimension: 1
- Error: 0
\(\textbf{a}=(118,117,110)\)
- Multiplicity: 5
- Dimension: 1
- Error: 0
\(\textbf{a}=(113,119,113)\)
- Multiplicity: 4
- Dimension: 1
- Error: 0
\(\textbf{a}=(115,115,115)\)
- Multiplicity: 14
- Dimension: 1
- Error: 0
\(\textbf{a}=(110,116,119)\)
- Multiplicity: 3
- Dimension: 1
- Error: 0
\(\textbf{a}=(117,110,118)\)
- Multiplicity: 5
- Dimension: 1
- Error: 0
\(\textbf{a}=(115,114,116)\)
- Multiplicity: 13
- Dimension: 1
- Error: 0
\(\textbf{a}=(118,116,111)\)
- Multiplicity: 7
- Dimension: 1
- Error: 0
\(\textbf{a}=(113,118,114)\)
- Multiplicity: 8
- Dimension: 1
- Error: 0
\(\textbf{a}=(117,109,119)\)
- Multiplicity: 2
- Dimension: 1
- Error: 0
\(\textbf{a}=(108,119,118)\)
- Multiplicity: 1
- Dimension: 1
- Error: 0
\(\textbf{a}=(115,113,117)\)
- Multiplicity: 11
- Dimension: 1
- Error: 0
\(\textbf{a}=(118,115,112)\)
- Multiplicity: 8
- Dimension: 1
- Error: 0
\(\textbf{a}=(116,119,110)\)
- Multiplicity: 3
- Dimension: 1
- Error: 0
\(\textbf{a}=(113,117,115)\)
- Multiplicity: 11
- Dimension: 1
- Error: 0
Below is a plot displaying the Schur decomposition. In the \(\lambda=(\lambda_0,\lambda_1)\) spot we place \(\beta_{41,\lambda}(2,1;8)\), the multiplicity of \(\textbf{S}_{\lambda}\) occuring in the decomposition of \(K_{41,2}(2,1;8)\). Here \(\lambda\) is the weight \((\lambda_0,\lambda_1,\lambda_2)\) where \(\lambda_2\) is determined by the fact that \(|\lambda|\) equals \(d(p+q)+b\). The dominant weights are displayed in green. Click on an entry for more info!
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118 |
119 |
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114 |
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115 |
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1
| · |
116 |
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1
| · |
117 |
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1
| · |
118 |
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1
| · |
119 |
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Below is a plot displaying the multigraded Betti numbers. In the \((a_0,a_1)\) spot we place \(\beta_{41,\textbf{a}}(2,1;8)\). Here \(\textbf{a}\) is the weight \((a_0,a_1,a_2)\) where \(a_2\) is determined by the fact that \(|\textbf{a}|\) equals \(d(p+q)+b\). Entries with error corrected via our Schur decomposition algorithm are in orange. Click on an entry for more info!