7 research outputs found
Bioinformatics studies on sequence, structure and functional relationships of proteins involved in the complement system
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Inconsistency of GPK + AFA
No full textM. Forti and F. Honsell showed in [4] that the hyperuniverses denned in [2] satisfy the anti-foundation axiom X1 introduced in [3]. So it is interesting to study the axiom AFA, which is equivalent to X1 in ZF, introduced by P. Aczel in [1]. We show in this paper that AFA is inconsistent with the theory GPK. This theory, which is first order, is denned by E. Weydert in [6] and later by M. Forti and R. Hinnion in [2]. It includes all general hyperuniverses as defined in [5]. In order to achieve our aim, we need to define ordinals in GPK and to study some of their properties.SCOPUS: ar.jFLWINinfo:eu-repo/semantics/publishe
Inconsistency of GPK +AFA
No full textM. Forti and F. Honsell showed in [4] that the hyperuniverses denned in [2] satisfy the anti-foundation axiom X1 introduced in [3]. So it is interesting to study the axiom AFA, which is equivalent to X1 in ZF, introduced by P. Aczel in [1]. We show in this paper that AFA is inconsistent with the theory GPK. This theory, which is first order, is denned by E. Weydert in [6] and later by M. Forti and R. Hinnion in [2]. It includes all general hyperuniverses as defined in [5]. In order to achieve our aim, we need to define ordinals in GPK and to study some of their properties.SCOPUS: ar.jFLWINinfo:eu-repo/semantics/publishe
