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Zariski topologies on stratified spectra of quantum algebras

A framework is developed to describe the Zariski topologies on the prime and primitive spectra of a quantum algebra $A$ in terms of the (known) topologies on strata of these spaces and maps between the collections of closed sets of different strata. A conjecture is formulated, under which the desired maps would arise from homomorphisms between certain central subalgebras of localized factor algebras of $A$. When the conjecture holds, spec $A$ and prim $A$ are then determined, as topological spaces, by a finite collection of (classical) affine algebraic varieties and morphisms between them. The conjecture is verified for ${\cal O}_q(GL_2(k))$, ${\cal O}_q(SL_3(k))$, and ${\cal O}_q(M_2(k))$ when $q$ is a non-root of unity and the base field $k$ is algebraically closed.