Scalar extensions of quiver representations over F1
Abstract
Let V and W be quiver representations over F1 and let K be a field. The scalar extensions VK and WK are quiver representations over K with a distinguished, very well-behaved basis. We construct a basis of HomKQ(VK,WK) generalising the well-known basis of the morphism spaces between string and tree modules. We use this basis to give a combinatorial characterisation of absolutely indecomposable representations. Furthermore, we show that indecomposable representations with finite nice length are absolutely indecomposable. This answers a question of Jun and Sistko.
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