In this paper, projection will be defined in a linear space. As Simmons G.F. “Introduction to topology and modern analysis.” Projection is a linear operator A on a linear space such that A2 = A, we defined eA and leads to hyperbolic functions defined on A such as sinhA, coshA, sechA, tanhA, and some interesting theorems
AbstractContinuous and compact Toeplitz operators for positive symbols are characterized on the spac...
Let : Ω ⊂ R → R be a quasiconformal mapping whose Jacobian is denoted by and let EXP(Ω) be the spa...
The exponential function, including its real-and complex-values forms, constitutes one of the most i...
Hilbert spaces and the projection theorem We now introduce the notion of a projection. Projections a...
We defined the exponential map rather abstractly, using the definition of vector fields as derivatio...
This classic work by the late Stefan Banach has been translated into English so as to reach a yet wi...
The properties of a dual space to a space of entire functionsof expo-nen-tial type of many complex...
This classic work by the late Stefan Banach has been translated into English so as to reach a yet wi...
International audienceWe present the projection filter, an approximate finite-dimensional filter bas...
A multivalued linear projection operator P defined on linear space X is a multivalued linear opera...
We establish Marstrand-type projection theorems for orthogonal projections along geodesics onto m-di...
The properties of a dual space to a space of entire functions of exponential type of manycomplex var...
We consider certain linear positive operators in exponential weighted spaces of functions of one var...
none3siWe investigate properties of differential and difference operators annihilating certain finit...
We consider scalar products on a given Hilbert space parametrized by bounded positive and invertible...
AbstractContinuous and compact Toeplitz operators for positive symbols are characterized on the spac...
Let : Ω ⊂ R → R be a quasiconformal mapping whose Jacobian is denoted by and let EXP(Ω) be the spa...
The exponential function, including its real-and complex-values forms, constitutes one of the most i...
Hilbert spaces and the projection theorem We now introduce the notion of a projection. Projections a...
We defined the exponential map rather abstractly, using the definition of vector fields as derivatio...
This classic work by the late Stefan Banach has been translated into English so as to reach a yet wi...
The properties of a dual space to a space of entire functionsof expo-nen-tial type of many complex...
This classic work by the late Stefan Banach has been translated into English so as to reach a yet wi...
International audienceWe present the projection filter, an approximate finite-dimensional filter bas...
A multivalued linear projection operator P defined on linear space X is a multivalued linear opera...
We establish Marstrand-type projection theorems for orthogonal projections along geodesics onto m-di...
The properties of a dual space to a space of entire functions of exponential type of manycomplex var...
We consider certain linear positive operators in exponential weighted spaces of functions of one var...
none3siWe investigate properties of differential and difference operators annihilating certain finit...
We consider scalar products on a given Hilbert space parametrized by bounded positive and invertible...
AbstractContinuous and compact Toeplitz operators for positive symbols are characterized on the spac...
Let : Ω ⊂ R → R be a quasiconformal mapping whose Jacobian is denoted by and let EXP(Ω) be the spa...
The exponential function, including its real-and complex-values forms, constitutes one of the most i...
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