q-Differential Operators for q-Spinor Variables

Abstract

We introduce a q-differential operator adapted to q-spinor variables, establishing a corresponding q-spinor chain rule and defining both standard and Dirac-type q-differential operators. Integral formulas in q-spinor variables are derived, and applications to q-deformed spinor differential equations are explored through explicit examples. The framework extends existing q-calculus to spinorial structures, offering potential insights into quantum deformations of relativistic field equations. We conclude with suggestions for future developments, including a q-analogue of the Dirac--Maxwell algebra.

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