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This paper presents the parastatistics of braided Majorana fermions obtained
in the framework of a graded Hopf algebra endowed with a braided tensor
product. The braiding property is encoded in a $t$-dependent $4\times 4$
braiding matrix $B_t$ related to the Alexander-Conway polynomial. The
nonvanishing complex parameter t defines the braided parastatistics. At $t = 1$
ordinary fermions are recovered. The values of $t$ at roots of unity are
organized into levels which specify the maximal number of braided Majorana
fermions in a multiparticle sector. Generic values of $t$ and the $t =-1$ root
of unity mimick the behaviour of ordinary bosons.
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