We construct an aggregation process of chordal SLE(κ) excursions in the unit disk, starting from the boundary, growing towards all inner points simultaneously, invariant under all conformal self-maps of the disk. We prove that this conformal growth process of excursions, abbreviated as CGE(κ), exists iff κ\in [0,4), and that it does not create additional fractalness: the Hausdorff dimension of the closure of all the SLE(κ) arcs attached is 1+κ/8 almost surely. We determine the dimension of points that are approached by CGE(κ) at an atypical rate, and construct conformally invariant random fields on the disk based on CGE(κ).