On Triangular Secure Domination Number

Abstract: Let T_m=(V(T_m), E(T_m)) be a triangular grid graph of m ϵ N level. The order of graph T_m is called a triangular number. A subset T of V(T_m) is a dominating set of T_m  if for all u_V(T_m)\T, there exists vϵT such that uv ϵ E(T_m), that is, N[T]=V(T_m).  A dominating set T of V(T_m) is a secure dominating set of T_m if for each u ϵ V(T_m)\T, there exists v ϵ T such that uv ϵ E(T_m) and the set (T\{u})ꓴ{v} is a dominating set of T_m. The minimum cardinality of a secure dominating set of T_m, denoted by γ_s(T_… Show more

“…2 = 3 − 2 produces a positive integer solution when ≡ 0( 2); and ii. 2 = 3 − 2 produces rational solutions when ≡ 1( 2) with a denominator greater or equal to 2.Proof. From the definition of Pythagorean triple and congruent number, we have 2…”

Some Results on a Generalized Version of Congruent Numbers

“…2 = 3 − 2 produces a positive integer solution when ≡ 0( 2); and ii. 2 = 3 − 2 produces rational solutions when ≡ 1( 2) with a denominator greater or equal to 2.Proof. From the definition of Pythagorean triple and congruent number, we have 2…”

Some Results on a Generalized Version of Congruent Numbers