Non-finitely based varieties of right alternative metabelian algebras

Since 1976, it is known from the paper by V. P. Belkin that the variety $\mathrm{RA_2}$ of right alternative metabelian (solvable of index 2) algebras over an arbitrary field is not Spechtian (contains non-finitely based subvarieties). In 2005, S. V. Pchelintsev proved that the variety generated by the Grassmann $\mathrm{RA_2}$-algebra of finite rank $r$ over a field $\mathcal{F}$, for $\mathrm{char}(\mathcal{F})\neq2$, is Spechtian iff $r=1$. We construct a non-finitely based variety $\mathfrak{M}$ generated by the Grassmann $\mathcal{V}$-algebra of rank $2$ of certain finitely based subvariety $\mathcal V\subset\mathrm{RA}_2$ over a field $\mathcal{F}$, for $\mathrm{char(\mathcal{F})}\neq2,3$, such that $\mathfrak{M}$ can also be generated by the Grassmann envelope of a five-dimensional superalgebra with one-dimensional even part.