Characterizing almost perfect rings by covers and envelopes
L Fuchs - Journal of the Korean Mathematical Society, 2020 - koreascience.kr
Characterizations of almost perfect domains by certain covers and envelopes, due to
Bazzoni-Salce [7] and Bazzoni [4], are generalized to almost perfect commutative rings (with …
Bazzoni-Salce [7] and Bazzoni [4], are generalized to almost perfect commutative rings (with …
[PDF][PDF] CHARACTERIZING ALMOST PERFECT RINGS BY COVERS AND ENVELOPES
L Fuchs - J. Korean Math. Soc, 2020 - academia.edu
Characterizations of almost perfect domains by certain covers and envelopes, due to
Bazzoni–Salce [7] and Bazzoni [4], are generalized to almost perfect commutative rings (with …
Bazzoni–Salce [7] and Bazzoni [4], are generalized to almost perfect commutative rings (with …
Characterizing almost perfect rings by covers and envelopes
L Fuchs - 대한수학회지, 2020 - dbpia.co.kr
Characterizations of almost perfect domains by certain covers and envelopes, due to
Bazzoni--Salce\cite {BS1} and Bazzoni\cite {B}, are generalized to almost perfect …
Bazzoni--Salce\cite {BS1} and Bazzoni\cite {B}, are generalized to almost perfect …
Characterizing almost perfect rings by covers and envelopes
L Fuchs - 대한수학회지, 2020 - kiss.kstudy.com
Characterizations of almost perfect domains by certain covers and envelopes, due to
Bazzoni--Salce\cite {BS1} and Bazzoni\cite {B}, are generalized to almost perfect …
Bazzoni--Salce\cite {BS1} and Bazzoni\cite {B}, are generalized to almost perfect …