+ cone of order ``p`` in ``n`` dimensions. Each generating ray will
+ have the integer ring as its base ring.
+
+ If a ``lattice`` was specified, then the resulting cone will live in
+ that lattice unless its rank is incompatible with the dimension
+ ``n`` (in which case a ``ValueError`` is raised).
+
+ ALGORITHM:
+
+ The generators for the rearrangement cone are given by [Jeong]_
+ Theorem 5.2.3.
+
+ REFERENCES:
+
+ .. [GowdaJeong] Muddappa Seetharama Gowda and Juyoung Jeong.
+ Spectral cones in Euclidean Jordan algebras.
+ Linear Algebra and its Applications, 509, 286-305.
+ doi:10.1016/j.laa.2016.08.004
+
+ .. [HenrionSeeger] Rene Henrion and Alberto Seeger.
+ Inradius and Circumradius of Various Convex Cones Arising in
+ Applications. Set-Valued and Variational Analysis, 18(3-4),
+ 483-511, 2010. doi:10.1007/s11228-010-0150-z
+
+ .. [Jeong] Juyoung Jeong.
+ Spectral sets and functions on Euclidean Jordan algebras.
+ University of Maryland, Baltimore County, Ph.D. thesis, 2017.