BibTex Citation Data :
@article{JM12270, author = {Ahmad Faisol}, title = {ENDOMORFISMA RIGID DAN COMPATIBLE PADA RING DERET PANGKAT TERGENERALISASI MIRING}, journal = {MATEMATIKA}, volume = {17}, number = {2}, year = {2016}, keywords = {}, abstract = { Given a ring R , a strictly ordered monoid and monoid homomorphism . Constructed the set of all function from S to R whose support is artinian and narrow, with pointwise addition and the skew convolution multiplication, it becomes a ring called the skew generalized power series rings (SGPSR) and denoted by . A ring R is called reduced if it contains no nonzero nilpotent elements, reversible if for all , implies . Let be a ring endomorphism, if for , implies , then is called rigid . If for all , if and only if , then is called compatible. In this paper we will discuss about the constructing of SGPSR homomorphism. Beside that, we also discuss about rigid and compatible endomorphism on SGPSR . }, url = {https://ejournal.undip.ac.id/index.php/matematika/article/view/12270} }
Refworks Citation Data :
Given a ring R, a strictly ordered monoid and monoid homomorphism . Constructed the set of all function from S to R whose support is artinian and narrow, with pointwise addition and the skew convolution multiplication, it becomes a ring called the skew generalized power series rings (SGPSR) and denoted by . A ring R is called reduced if it contains no nonzero nilpotent elements, reversible if for all , implies . Let be a ring endomorphism, if for , implies , then is called rigid. If for all , if and only if , then is called compatible. In this paper we will discuss about the constructing of SGPSR homomorphism. Beside that, we also discuss about rigid and compatible endomorphism on SGPSR .
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Last update: 2024-11-07 14:14:48