**Volume 10 (2022-2023)**

**Volume 9 (2021-2022)**

**Volume 8 (2020-2021)**

**Volume 7 (2019-2020)**

**Volume 6 (2018-2019)**

**Volume 5 (2017-2018)**

**Volume 4 (2016-2017)**

**Volume 3 (2015-2016)**

**Volume 2 (2014-2015)**

**Volume 1 (2013-2014)**

##### 1. MAXIMAL PRYM VARIETY AND MAXIMAL MORPHISM

*Volume 6, Issue 1 , Summer and Autumn 2018, Pages 1-12*

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**Abstract **

We investigated maximal Prym varieties on finite fields by attaining their upper bounds on the number of rational points. This concept gave us a motivation for defining a generalized definition of maximal curves i.e. maximal morphisms. By MAGMA, we give some non-trivial examples of maximal morphisms ...
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##### 2. SIGNED GENERALIZED PETERSEN GRAPH AND ITS CHARACTERISTIC POLYNOMIAL

*Volume 6, Issue 1 , Summer and Autumn 2018, Pages 13-28*

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**Abstract **

Let G^s be a signed graph, where G = (V;E) is the underlying simple graph and s : E(G) to {+, -} is the sign function on E(G). In this paper, we obtain k-th signed spectral moment and k-th signed Laplacian spectral moment of Gs together with coefﬁcients of their signed characteristic polynomial and ...
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##### 3. IDEALS WITH (d1, . . . , dm)-LINEAR QUOTIENTS

*Volume 6, Issue 1 , Summer and Autumn 2018, Pages 29-42*

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**Abstract **

In this paper, we introduce the class of ideals with $(d_1,\ldots,d_m)$-linear quotients generalizing the class of ideals with linear quotients. Under suitable conditions we control the numerical invariants of a minimal free resolution of ideals with $(d_1,\ldots,d_m)$-linear quotients. In particular ...
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4. ON MAXIMAL IDEALS OF R_{∞}L

_{∞}L

*Volume 6, Issue 1 , Summer and Autumn 2018, Pages 43-57*

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**Abstract **

Let $L$ be a completely regular frame and $\mathcal{R}L$ be the ring of real-valued continuous functions on $L$. We consider the set $$\mathcal{R}_{\infty}L = \{\varphi \in \mathcal{R} L : \uparrow \varphi( \dfrac{-1}{n}, \dfrac{1}{n}) \mbox{ is a compact frame for any $n \in \mathbb{N}$}\}.$$ Suppose ...
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##### 5. THE LATTICE OF CONGRUENCES ON A TERNARY SEMIGROUP

*Volume 6, Issue 1 , Summer and Autumn 2018, Pages 59-70*

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**Abstract **

In this paper we investigate some properties of congruences on ternary semigroups. We also deﬁne the notion of congruence on a ternary semigroup generated by a relation and we determine the method of obtaining a congruence on a ternary semigroup T from a relation R on T. Furthermore we study the lattice ...
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##### 6. ON THE CHARACTERISTIC DEGREE OF FINITE GROUPS

*Volume 6, Issue 1 , Summer and Autumn 2018, Pages 71-80*