Extended Special Linear group ESL2(F) and square roots in matrix groups SL2(F), SL2(Z), ESL2(F), GL2(Fp)

Abstract

First time, we introduce Extended special linear group ESL2(F), which is generalization of matrix group SL2(F) over arbitrary field F. Extended special linear group ESL2(k), where k is arbitrary perfect field, is storage of all square matrix roots from ESL2(k). The analytical formulas of roots of 2-nd, 3-rd, 4-th and n-th powers in SL2(Fp) are found by us. Also for roots in SL2(Z), ESL2(Z) and in SL2(k) as well as in ESL2(k), where k is arbitrary perfect field, is found by us. New linear group which is storage of square roots from SL2Fp is found and investigated by us. The criterion of roots existing for different classes of matrix -- simple and semisimple matrixes from SL2(Fp), SL2(Z) are established. The problems of square root from group element existing in SL2(Fp), SL2(Fp) and GL2(Fp) for arbitrary prime p are solved in this paper. The similar goal of root finding was reached in the GM algorithm adjoining an n-th root of a generator results in a discrete group for group SL(2,R), but we consider this question over finite field Fp. Over method gives answer about existing Mn without exponenting M to n-th power. We only use the trace of M or only eigenvalues of M. In Amit only the Anisotropic case of group SL1(Q), where Q is a quaternion division algebra over k was considered. Previously criterion to be square only for the case Fp is a field of characteristics not equal 2 was considered. We solve this problem even for fields F2 and F2n. The criterion to g ∈ SL2 (F2) be square in SL2(F2) was not found by them what was declared in a separate sentence in Amit. We consider more general case consisting in whole group G= SL2(Fq). The structure of extended symplectic group is found.