multisphere gas holder - definição. O que é multisphere gas holder. Significado, conceito
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O que (quem) é multisphere gas holder - definição

TYPE OF CONTINUITY OF A COMPLEX-VALUED FUNCTION
Holder continuous; Holder condition; Holder space; Hölder space; Hölder continuity; Hölder continuous function; Holder continuous function; Hölder class; Hölder continuous; Holder class; Holder continuity; Hoelder condition; Hoelder norm; Hölder norm; Holder norm; Hoelder space; Hoelder continuous function; Hoelder continuous; Hoelder class; Hoelder continuity; Hölder-continuous function; Holder function; Hölder seminorm; Hölder exponent; Holder exponent; Hölder assumption; Hölder spaces; Local Hölder continuity; Local Holder continuity; Locally Hölder continuous; Locally Holder continuous; Locally Hölder continuous function; Locally Holder continuous function

Holder, Florida         
HUMAN SETTLEMENT IN FLORIDA, UNITED STATES OF AMERICA
Holder, FL
Holder is an unincorporated community in Citrus County, Florida, United States. Holder is located around the intersection of U.
Southport gas holder         
  • 26 December 2009
Southport gas tower; Southport Gas Holder
Southport Gas Holder was once the tallest structure in the northern town of Southport, England for 40 years.
Alcindo Holder         
WEST INDIAN CRICKETER
Alcino Holder
Alcindo Rennae Holder (born 24 September 1982) in Bridgetown. He is a West Indies cricketer who played in the 2002 U-19 Cricket World Cup in New Zealand.

Wikipédia

Hölder condition

In mathematics, a real or complex-valued function f on d-dimensional Euclidean space satisfies a Hölder condition, or is Hölder continuous, when there are real constants C ≥ 0, α > 0, such that

| f ( x ) f ( y ) | C x y α {\displaystyle |f(x)-f(y)|\leq C\|x-y\|^{\alpha }}

for all x and y in the domain of f. More generally, the condition can be formulated for functions between any two metric spaces. The number α is called the exponent of the Hölder condition. A function on an interval satisfying the condition with α > 1 is constant. If α = 1, then the function satisfies a Lipschitz condition. For any α > 0, the condition implies the function is uniformly continuous. The condition is named after Otto Hölder.

We have the following chain of strict inclusions for functions over a closed and bounded non-trivial interval of the real line:

Continuously differentiableLipschitz continuousα-Hölder continuousuniformly continuouscontinuous,

where 0 < α ≤ 1.