We examine the Toeplitz and Cuntz--Pimsner C*-algebras attached to a subproduct system and analyze their structure and K-theory. Motivated by quadratic algebras, we introduce quadratic subproduct systems and investigate three natural operations on quadratic algebras. The main results include explicit computations of the K-theory groups of the associated Toeplitz algebras. The proofs use tools from functional analysis, operator algebras, and K-theory, together with combinatorial properties of the underlying subproduct systems. The work shows how the algebraic information of a subproduct system determines invariants of the associated C*-algebras and provides new examples with interesting K-theory.

• arveson-douglas conjecture
• cuntz-pimsner algebras
• functional analysis
• k-theory
• operator algebras
• quadratic algebras
• toeplitz algebras

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