MEDIALS AND SEMIGROUPS SATISFYING LEFT AND RIGHT DOUBLE DISPLACEMENT LAW, 2021
In this paper we have solved open problem in [1] and developed the idea that on what
conditions... more In this paper we have solved open problem in [1] and developed the idea that on what
conditions a non-commutative medial, semigroup and paramedial becomes left double
displacement semigroup (LDD-Semigroup) and right double displacement semigroup
(RDD-Semigroup). We also elaborated that on what conditions medial, paramedial,
semigroup, LDD-Semigroup and RDD-Semigroup become commutative. We proved that
the relation of left almost semigroup (LA-Semigroup) with LDD-Semigroup, right almost
semigroup (RA-Semigroup) with RDD-Semigroup and semigroup with paramedial is
only commutative property and example discussed in [12] by Nares and Chaiwat is
wrong example constructed on the relation of semigroup with paramedial.
MEDIALS AND SEMIGROUPS SATISFYING LEFT AND RIGHT DOUBLE DISPLACEMENT LAW, 2021
In this paper we have solved open problem in [1] and developed the idea that on what
conditions... more In this paper we have solved open problem in [1] and developed the idea that on what
conditions a non-commutative medial, semigroup and paramedial becomes left double
displacement semigroup (LDD-Semigroup) and right double displacement semigroup
(RDD-Semigroup). We also elaborated that on what conditions medial, paramedial,
semigroup, LDD-Semigroup and RDD-Semigroup become commutative. We proved that
the relation of left almost semigroup (LA-Semigroup) with LDD-Semigroup, right almost
semigroup (RA-Semigroup) with RDD-Semigroup and semigroup with paramedial is
only commutative property and example discussed in [12] by Nares and Chaiwat is
wrong example constructed on the relation of semigroup with paramedial.
Uploads
Papers by Shahid Shehzad
conditions a non-commutative medial, semigroup and paramedial becomes left double
displacement semigroup (LDD-Semigroup) and right double displacement semigroup
(RDD-Semigroup). We also elaborated that on what conditions medial, paramedial,
semigroup, LDD-Semigroup and RDD-Semigroup become commutative. We proved that
the relation of left almost semigroup (LA-Semigroup) with LDD-Semigroup, right almost
semigroup (RA-Semigroup) with RDD-Semigroup and semigroup with paramedial is
only commutative property and example discussed in [12] by Nares and Chaiwat is
wrong example constructed on the relation of semigroup with paramedial.
conditions a non-commutative medial, semigroup and paramedial becomes left double
displacement semigroup (LDD-Semigroup) and right double displacement semigroup
(RDD-Semigroup). We also elaborated that on what conditions medial, paramedial,
semigroup, LDD-Semigroup and RDD-Semigroup become commutative. We proved that
the relation of left almost semigroup (LA-Semigroup) with LDD-Semigroup, right almost
semigroup (RA-Semigroup) with RDD-Semigroup and semigroup with paramedial is
only commutative property and example discussed in [12] by Nares and Chaiwat is
wrong example constructed on the relation of semigroup with paramedial.