Diophantine approximations in the field of real and complex numbers and Hausdorff dimensionDiophantine approximations in the field of
real and
complex numbers and Hausdorff dimension
Fields of Algebraic Numbers Computable in Polynomial Time. I of
complex algebraic
numbers has an isomorphic presentation computable in polynomial time. A similar fact
Polynomial-time presentations of algebraic number fields field ℝalgof algebraic
reals and of the field ℂalgof algebraic
complex numbers are polynomial
Structure of hypercomplex units and exotic numbers as sections of Bi-quaternions as special cases
real,
complex, quaternion
numbers and as well exotic sets split-
complex and dual
numbers Polynomial Computability of Fields of Algebraic Numbers© 2018, Pleiades Publishing, Ltd. We prove that the field of
complex algebraic
numbers Development trends of residential buildings in Moscow city. The attractiveness of prices and the location of the
complexes attract a huge
number of buyers. Two terms: apartments
Approaches to the implementation of generalized complex numbers in the Julia language-Klein models in theoretical calculations, the generalized
complex numbers are essential. In the case
Real number approximation by a rational number in the approximating k-ary algorithm complexity of these algorithms were shown; these methods were compared with respect to running time
Physical and mathematical analytics ad reality of the fractal space, is discussed from the viewpoint of the matrix and hypercomplex
number algebra analysis. It is shown