On many-to-one property of generalized cyclotomic mappings
Abstract
The generalized cyclotomic mappings over finite fields Fq are those mappings which induce monomial functions on all cosets of an index subgroup C0 of the multiplicative group Fq*. Previous research has focused on the one-to-one property, the functional graphs, and their applications in constructing linear codes and bent functions. In this paper, we devote to study the many-to-one property of these mappings. We completely characterize many-to-one generalized cyclotomic mappings for 1 3. Moreover, we completely classify 2-to-1 generalized cyclotomic mappings for any divisor of q-1. In addition, we construct several classes of many-to-one binomials and trinomials of the form xr h(xq-1) on Fq2, where h(x)q-1 induces monomial functions on the cosets of a subgroup of Uq+1.
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