On (unit-) regular morphisms
MT Koşan - Lobachevskii Journal of Mathematics, 2019 - Springer
We introduce a symmetry property for unit-regular rings as follows: a∈ R is unit-regular if
and only if aR⊕(a− u) R= R (equivalently, Ra⊕ R (a− u)= R) for some unit u of R if and only …
and only if aR⊕(a− u) R= R (equivalently, Ra⊕ R (a− u)= R) for some unit u of R if and only …
On (Unit-) Regular Morphisms
T Quynh, A Abyzov, M Kosan - LOBACHEVSKII JOURNAL OF …, 2019 - avesis.gazi.edu.tr
We introduce a symmetry property for unit-regular rings as follows: a is an element of R is
unit-regular if and only if aR circle plus (au) R= R (equivalently, Ra circle plus R (au)= R) for …
unit-regular if and only if aR circle plus (au) R= R (equivalently, Ra circle plus R (au)= R) for …
On (Unit-) Regular Morphisms
TC Quynh, A Abyzov, MT Koşan - Lobachevskii Journal of …, 2019 - journals.rcsi.science
We introduce a symmetry property for unit-regular rings as follows: a∈ R is unit-regular if
and only if aR⊕(a− u) R= R (equivalently, Ra⊕ R (a− u)= R) for some unit u of R if and only …
and only if aR⊕(a− u) R= R (equivalently, Ra⊕ R (a− u)= R) for some unit u of R if and only …
On (Unit-) Regular Morphisms
TC Quynh, A Abyzov, MT Koşan - Lobachevskii Journal of Mathematics, 2019 - elibrary.ru
We introduce a symmetry property for unit-regular rings as follows: $ a\in R $ is unit-regular if
and only if $ aR\oplus (au) R= R $(equivalently, $ Ra\oplus R (au)= R $) for some unit $ u …
and only if $ aR\oplus (au) R= R $(equivalently, $ Ra\oplus R (au)= R $) for some unit $ u …
On (Unit-) Regular Morphisms
T Quynh, A Abyzov, M KOŞAN - Lobachevskii Journal of …, 2019 - avesis.gazi.edu.tr
We introduce a symmetry property for unit-regular rings as follows: a is an element of R is
unit-regular if and only if aR circle plus (au) R= R (equivalently, Ra circle plus R (au)= R) for …
unit-regular if and only if aR circle plus (au) R= R (equivalently, Ra circle plus R (au)= R) for …