The multiplicity of weights in nonprimitive pairs of weights
For each type of classical Lie algebra, we list the dominant highest weights $\zeta$ for which $(\zeta;\mu_i)$ is not a primitive pair and the weight space $V_{\mu_i}$ has dimension one where $\mu_i$ are the highest long and short roots in each case. These dimension one weight spaces lead to example...
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| creator | DeCoste, Rachelle C |
| description | For each type of classical Lie algebra, we list the dominant highest weights
$\zeta$ for which $(\zeta;\mu_i)$ is not a primitive pair and the weight space
$V_{\mu_i}$ has dimension one where $\mu_i$ are the highest long and short
roots in each case. These dimension one weight spaces lead to examples of
nilmanifolds for which we cannot prove or disprove the density of closed
geodesics. |
| doi_str_mv | 10.48550/arxiv.0708.1757 |
| format | Article |
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$\zeta$ for which $(\zeta;\mu_i)$ is not a primitive pair and the weight space
$V_{\mu_i}$ has dimension one where $\mu_i$ are the highest long and short
roots in each case. These dimension one weight spaces lead to examples of
nilmanifolds for which we cannot prove or disprove the density of closed
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$\zeta$ for which $(\zeta;\mu_i)$ is not a primitive pair and the weight space
$V_{\mu_i}$ has dimension one where $\mu_i$ are the highest long and short
roots in each case. These dimension one weight spaces lead to examples of
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$\zeta$ for which $(\zeta;\mu_i)$ is not a primitive pair and the weight space
$V_{\mu_i}$ has dimension one where $\mu_i$ are the highest long and short
roots in each case. These dimension one weight spaces lead to examples of
nilmanifolds for which we cannot prove or disprove the density of closed
geodesics.</abstract><doi>10.48550/arxiv.0708.1757</doi><oa>free_for_read</oa></addata></record> |
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| subjects | Mathematics - Representation Theory |
| title | The multiplicity of weights in nonprimitive pairs of weights |
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