uniformly spaced geophones - definitie. Wat is uniformly spaced geophones
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Wat (wie) is uniformly spaced geophones - definitie

SEQUENCE FUNCTION
Uniformly cauchy; Uniformly Cauchy

Uniformly convex space         
REFLEXIVE BANACH SPACE SUCH THAT THE CENTER OF A LINE SEGMENT INSIDE THE UNIT BALL MUST LIE DEEP INSIDE THE UNIT BALL UNLESS THE SEGMENT IS SHORT
Uniformly convex Banach space; Uniformly convex banach space; Uniform Convexity; Uniform convexity; Uniformly convex
In mathematics, uniformly convex spaces (or uniformly rotund spaces) are common examples of reflexive Banach spaces. The concept of uniform convexity was first introduced by James A.
Spaced         
BRITISH TELEVISION SITCOM
Ada IV; Ada (dog actor); Twist Morgan; List of Spaced episodes; Tim Bisely; Tim Bisley; Tim bisley; Spaced (TV Series); Spaced episodes; Spaced (sitcom); Beginnings (Spaced)
·Impf & ·p.p. of Space.
Uniformly Cauchy sequence         
In mathematics, a sequence of functions \{f_{n}\} from a set S to a metric space M is said to be uniformly Cauchy if:

Wikipedia

Uniformly Cauchy sequence

In mathematics, a sequence of functions { f n } {\displaystyle \{f_{n}\}} from a set S to a metric space M is said to be uniformly Cauchy if:

  • For all ε > 0 {\displaystyle \varepsilon >0} , there exists N > 0 {\displaystyle N>0} such that for all x S {\displaystyle x\in S} : d ( f n ( x ) , f m ( x ) ) < ε {\displaystyle d(f_{n}(x),f_{m}(x))<\varepsilon } whenever m , n > N {\displaystyle m,n>N} .

Another way of saying this is that d u ( f n , f m ) 0 {\displaystyle d_{u}(f_{n},f_{m})\to 0} as m , n {\displaystyle m,n\to \infty } , where the uniform distance d u {\displaystyle d_{u}} between two functions is defined by

d u ( f , g ) := sup x S d ( f ( x ) , g ( x ) ) . {\displaystyle d_{u}(f,g):=\sup _{x\in S}d(f(x),g(x)).}