### Abstract:

Deformation is one of key questions of the structural theory of algebras over a field. Especially, it plays
a important role in the classification of such algebras. In odd characteristics of algebraically closed fields,
local deformations of classical Lie algebras are completely described. Local deformations are also known for
classical Lie algebras with a homogeneous root system over an algebraically closed field of characteristic 2;
except for the three-dimensional Lie algebra sl(2): In the characteristic 2; deformations of Lie algebras
with an non-homogeneous root system are calculated only for Lie algebras of small ranks. In this paper
we investigate deformations of the three-dimensional classical Lie algebra sl(2) over an algebraically closed
field k of characteristic p = 2: We also describe three-dimensional two-sided Alia algebras associated with
Lie algebra sl(2) in the characteristics 2 and 3: It is proved that, in characteristic 2, the space of local
deformations of the Lie algebra sl(2) is five-dimensional. The structural specialty of the second cohomology
space of the adjoint representation of the Lie algebra sl(2) are analyzed. In particular, the subspace of
cosets of restricted cocycles is described. It is proved that the subspace of classes of restricted cocycles
is two-dimensional and the corresponding local deformations are restricted Lie algebras in the sense of
Jacobson. It was found that a family of simple three-dimensional unrestricted Lie algebras correspond
to unrestricted non-trivial cocycles. In characteristics 2 and 3, three-dimensional two-sided Alia algebras
that are non-isomorphic to the Lie algebra sl(2) are constructed. In the process of the study, a complete
description of the space of all derivations of the Lie algebra sl(2) is obtained.