Solutions of the system of operator equations $BXA=B=AXB$ via the *-order

Abstract: Abstract. In this paper, some necessary and sufficient conditions are established for the existence of solutions to the system of operator equations BXA = B = AXB in the setting of bounded linear operators on a Hilbert space, where the unknown operator X is called the inverse of A along B. After that, under some mild conditions, it is proved that an operator

“…Researchers have increased interest in studying matrix and operator equation and the system of it, can you see [8][9][10][11][12][13]. [28], [29] Τ𝒳 = 𝒰 and Τ 𝑖 𝒳 = 𝒰 𝑖 , 𝑖 = 1,2, 1 In [14], Zhang studied the Hermitian positive semidefinite solution of Τ𝒳𝒱 = 𝒰, 2 The Banach or Hilbert spaces was used for matrices and bounded linear operators (see, [13,[15][16][17][18][19][20][21][22]), and finding necessary conditions and sufficient conditions (N-SCs) for an existence of a combined solutions, and generalization of two equations Τ 𝑖 𝒳𝒱 𝑖 = 𝒰 𝑖 , 𝑖 = 1,2, 3 Also, the equation's solvability, as follows Τ 1 𝒳𝒱 1 + Τ 2 𝒳𝒱 2 = 𝒰, 4 Vosough and Moslehian [23] gave characterizations of the existence and representations of the solutions to the system and restricted the case of operator systems ℬ𝒳𝒜 = ℬ = 𝒜𝒳, 5…”

The Sum Two of Hermitian Operators Ai=Ti+Mi for Solving the Equations{Ai X=Ui },i=1,2

“…Researchers have increased interest in studying matrix and operator equation and the system of it, can you see [8][9][10][11][12][13]. [28], [29] Τ𝒳 = 𝒰 and Τ 𝑖 𝒳 = 𝒰 𝑖 , 𝑖 = 1,2, 1 In [14], Zhang studied the Hermitian positive semidefinite solution of Τ𝒳𝒱 = 𝒰, 2 The Banach or Hilbert spaces was used for matrices and bounded linear operators (see, [13,[15][16][17][18][19][20][21][22]), and finding necessary conditions and sufficient conditions (N-SCs) for an existence of a combined solutions, and generalization of two equations Τ 𝑖 𝒳𝒱 𝑖 = 𝒰 𝑖 , 𝑖 = 1,2, 3 Also, the equation's solvability, as follows Τ 1 𝒳𝒱 1 + Τ 2 𝒳𝒱 2 = 𝒰, 4 Vosough and Moslehian [23] gave characterizations of the existence and representations of the solutions to the system and restricted the case of operator systems ℬ𝒳𝒜 = ℬ = 𝒜𝒳, 5…”

The Sum Two of Hermitian Operators Ai=Ti+Mi for Solving the Equations{Ai X=Ui },i=1,2

“…For instance, the problem of finding all the solutions of the classical Yang-Baxter matrix equation AXA = XAX is a representative case [14,17,21]. On the other hand, some recent results finding algebraic solutions for operator equations such as AXB = B = BXA can be found in [22,26].…”

Parametrized solutions $X$ of the system $AXA = AY A$ and $A^k Y AX = XAY A^k$

Existence and Representations of Solutions to Some Constrained Systems of Matrix Equations