Sinead Lyle
Published 2011-01-17, updated 2011-09-09Version 3
We study the homomorphism spaces between Specht modules for the Hecke algebras $\h$ of type $A$. We prove a cellular analogue of the kernel intersection theorem and a $q$-analogue of a theorem of Fayers and Martin and apply these results to give an algorithm which computes the homomorphism spaces $\Hom_{\h}(S^\mu,S^\lambda)$ for certain pairs of partitions $\lambda$ and $\mu$. We give an explicit description of the homomorphism spaces $\Hom_\h(S^\mu,S^\lambda)$ where $\h$ is an algebra over the complex numbers, $\lambda=(\lambda_1,\lambda_2)$ and $\mu$ is an arbitrary partition with $\mu_1 \geq \lambda_2$.
Comments: 32 pages. This third version of the paper contains some comments on homomorphisms between the Specht modules defined by Dipper and James and has a more rigorous proof of the result following Proposition 4.1
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