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"Beta-convergence" on the other hand, occurs when poor economies grow faster than rich ones. Economists say that there is "conditional beta-convergence" when economies experience "beta-convergence" but conditional on other variables (namely the investment rate and the population growth rate) being held constant.
Technological convergence is the tendency for technologies that were originally unrelated to become more closely integrated and even unified as they develop and advance. For example, watches, telephones, television, computers, and social media platforms began as separate and mostly unrelated technologies, but have converged in many ways into an interrelated telecommunication, media, and ...
Convergence of investment in irrigation at the field level; Expand cultivable area under irrigation (हर खेत को पानी) Improve On-farm water use efficiency to reduce wastage of water; Enhance the adoption of being precise in irrigation and other water saving technologies (more crop per drop)
Language convergence is a type of linguistic change in which languages come to resemble one another structurally as a result of prolonged language contact and mutual interference, regardless of whether those languages belong to the same language family, i.e. stem from a common genealogical proto-language. [1]
Convergence is about services and about new ways of doing business and interacting with society. The basic type of network convergence is the combination and connection across platforms and networks, which allows several types of networks to connect within certain common standards and protocols.
Convergence implies "Cauchy convergence", and Cauchy convergence, together with the existence of a convergent subsequence implies convergence. The concept of completeness of metric spaces, and its generalizations is defined in terms of Cauchy sequences.
Convergence research aims to solve complex problems employing transdisciplinarity. [1] While academic disciplines are useful for identifying and conveying coherent bodies of knowledge , some problems require collaboration among disciplines, including both enhanced understanding of scientific phenomena as well as resolving social issues .
The convergence is uniform on closed and bounded (that is, compact) subsets of the interior of the disc of convergence: to wit, it is uniformly convergent on compact sets. Historically, mathematicians such as Leonhard Euler operated liberally with infinite series, even if they were not convergent.