Where can I find a comprehensive survey of computations of equivariant stems?

To my knowledge, the status is:

Classical Work of Araki and Iriye, Osaka J. Math. 19 (1982). Computations trough 19th. stable stem for the group $\mathbb{Z}/2$.

Araki and Iriye, Equivariant stable homotopy groups of spheres with involutions. I. Osaka J. Math. 19 (1982), no. 1, 1–55. and

Iriye, Kouyemon Equivariant stable homotopy groups of spheres with involutions. II. Osaka J. Math. 19 (1982), no. 4, 733–743.

Computation via the Adams Spectral sequence for groups of prime order trough degree 2p-2 by Szymik
J. Homotopy Relat. Struct. 2 (2007),

Comparison to Motivic stems and use of the Motivic Adams Spectral sequence: by Dugger, and Isaksen.

ℤ/2-equivariant and ℝ-motivic stable stems. Proc. Amer. Math. Soc. 145 (2017), no. 8, 3617–3627.

Besides from the Tom Dieck-Segal Splitting and immediate consequences.

Am I missing something?

Where can I find a comprehensive survey of computations of equivariant stems?

To my knowledge, the status is:

Classical Work of Araki and Iriye, Osaka J. Math. 19 (1982). Computations trough 19th. stable stem for the group $\mathbb{Z}/2$.

Araki and Iriye, Equivariant stable homotopy groups of spheres with involutions. I. Osaka J. Math. 19 (1982), no. 1, 1–55. and

Iriye, Kouyemon Equivariant stable homotopy groups of spheres with involutions. II. Osaka J. Math. 19 (1982), no. 4, 733–743.

Computation via the Adams Spectral sequence for groups of prime order trough degree 2p-2 by Szymik :

Equivariant stable stems for prime order groups. J. Homotopy Relat. Struct. 2 (2007),

Comparison to Motivic stems and use of the Motivic Adams Spectral sequence: by Dugger, and Isaksen.

ℤ/2-equivariant and ℝ-motivic stable stems. Proc. Amer. Math. Soc. 145 (2017), no. 8, 3617–3627.

Besides from the Tom Dieck-Segal Splitting and immediate consequences.

Am I missing something?