Cauchy was the first mathematician who developed definitions and rules for mathematics. He introduced the definitions of the integral and rules for series convergence. There are sixteen concepts and theorems named after him.
Convergence of telecommunications
Convergence is a noun.
H. E. Bethel has written: 'On the convergence and exactness of solutions of the laminar boundry-layer equations using the N- parameter integral formulation of Galerkin - Kantorovich - Dorodnitsyn'
The motto of Division of IT Convergence Engineering is 'The World's Best in IT Convergence Engineering!'.
In mathematics, a series (or sometimes also an integral) is said to converge absolutely if the sum (or integral) of the absolute value of the summand or integrand is finite. More precisely, a real or complex-valued series is said to converge absolutely if Absolute convergence is vitally important to the study of infinite series because on the one hand, it is strong enough that such series retain certain basic properties of finite sums - the most important ones being rearrangement of the terms and convergence of products of two infinite series - that are unfortunately not possessed by all convergent series. On the other hand absolute convergence is weak enough to occur very often in practice. Indeed, in some (though not all) branches of mathematics in which series are applied, the existence of convergent but not absolutely convergent series is little more than a curiosity. In mathematics, a series (or sometimes also an integral) is said to converge absolutely if the sum (or integral) of the absolute value of the summand or integrand is finite. More precisely, a real or complex-valued series is said to converge absolutely if Absolute convergence is vitally important to the study of infinite series because on the one hand, it is strong enough that such series retain certain basic properties of finite sums - the most important ones being rearrangement of the terms and convergence of products of two infinite series - that are unfortunately not possessed by all convergent series. On the other hand absolute convergence is weak enough to occur very often in practice. Indeed, in some (though not all) branches of mathematics in which series are applied, the existence of convergent but not absolutely convergent series is little more than a curiosity.
describe convergence in a CRT television receiver
Convergence - journal - was created in 1995.
Convergence - novel - was created in 1997.
The Convergence of the Twain was created in 1915.
School of convergence was created in 2001.
Technologicaly convergence