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# Interpolative realization of Boolean algebra

@article{Radojevi2006InterpolativeRO, title={Interpolative realization of Boolean algebra}, author={Dragan Radojevi{\'c}}, journal={2006 8th Seminar on Neural Network Applications in Electrical Engineering}, year={2006}, pages={201-206} }

- Published 2006 in 2006 8th Seminar on Neural Network Applications…

Classical (Aristotelian) two-valued realization of Boolean algebra is based on two-elements Boolean algebra as its homomorphism. So, calculus and/or arithmetic for two valued case is Boolean algebra of two-elements. Interpolative Boolean algebra is MV realization of finite Boolean algebra and/or it is consistent generalization of classical two-valued realization. New approach is devoted to treating gradation in logic, theory of sets, and generally relations