Generalized “Boolean” theory of universal algebras
暂无分享,去创建一个
[1] G. Birkhoff. Subdirect unions in universal algebra , 1944 .
[2] N. McCoy. Subdirect sums of rings , 1947 .
[3] p-Rings and their Boolean-vector representation , 1951 .
[4] N. McCoy. Subdirectly irreducible commutative rings , 1945 .
[5] D. Montgomery,et al. A representation of generalized Boolean rings , 1937 .
[6] M. Stone. The theory of representations for Boolean algebras , 1936 .
[7] N. McCoy. Subrings of Direct Sums , 1938 .
[8] Neal H. McCoy,et al. Subrings of infinite direct sums , 1938 .
[9] Alfred L. Foster. On n-Ality Theories in Rings and their Logical Algebras, Including Tri-Ality Principle in Three Valued Logics , 1950 .
[10] L. Wade,et al. Post algebras and rings , 1945 .
[11] Alfred L. Foster. The idempotent elements of a commutative ring form a Boolean algebra; ring-duality and transformation theory , 1945 .
[12] Alfred L. Foster. The theory of Boolean-like rings , 1946 .