Self-similar Cosmological Solutions in Symmetric Teleparallel theory: Friedmann-Lema\itre-Robertson-Walker spacetimes
Abstract
The existence of self-similar solutions is discussed in symmetric teleparallel f(Q)-theory for a Friedmann-Lema\itre-Robertson-Walker background geometry with zero and non-zero spatial curvature. For the four distinct families of connections which describe the specific cosmology in symmetric teleparallel gravity, the functional form of f(Q) is reconstructed. Finally, to see if the analogy with General Relativity holds, we discuss the relation of the self-similar solutions with the asymptotic behaviour of more general f(Q) functions.
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