O que (quem) é logarithmic infinity - definição
MEASUREMENT SCALE BASED ON ORDERS OF MAGNITUDE
Log scale; Logarithmic units; Logarithmic graph paper; Logarithmic unit; Logarithmic plot; Logscale; Logarithmic-scale; Logarithmic quantity; Logarithmic graph
![log–log]]. Plotted graphs are: ''y'' = 10<sup> ''x''</sup> (<span style="color:red;">red</span>), ''y'' = ''x'' (<span style="color:green;">green</span>), ''y'' = log<sub>''e''</sub>(''x'') (<span style="color:blue;">blue</span>).](https://commons.wikimedia.org/wiki/Special:FilePath/Logarithmic Scales-mkII.svg?width=200 "log–log]]. Plotted graphs are: ''y'' = 10<sup> ''x''</sup> (<span style=\"color:red;\">red</span>), ''y'' = ''x'' (<span style=\"color:green;\">green</span>), ''y'' = log<sub>''e''</sub>(''x'') (<span style=\"color:blue;\">blue</span>).")
Sheaf of logarithmic differential forms
MEROMORPHIC DIFFERENTIAL FORM WITH POLES OF A CERTAIN KIND
Logarithmic Kähler differentials; Sheaf of logarithmic differential forms; Logarithmic differential form; Logarithmic Kähler differential
In algebraic geometry, the sheaf of logarithmic differential p-forms \Omega^p_X(\log D) on a smooth projective variety X along a smooth divisor D = \sum D_j is defined and fits into the exact sequence of locally free sheaves:
Logarithmic form
MEROMORPHIC DIFFERENTIAL FORM WITH POLES OF A CERTAIN KIND
Logarithmic Kähler differentials; Sheaf of logarithmic differential forms; Logarithmic differential form; Logarithmic Kähler differential
In contexts including complex manifolds and algebraic geometry, a logarithmic differential form is a meromorphic differential form with poles of a certain kind. The concept was introduced by Deligne.
Logarithmic integral function
 in the complex plane from -2-2i to 2+2i with colors created with Mathematica 13.1 function ComplexPlot3D.svg?width=200)
SPECIAL FUNCTION DEFINED AS THE ANTIDERIVATIVE OF 1∕㏑(𝑥)
Offset logarithmic integral; Logarithmic integral; Log integral; Li(x); Li function; Li integral; Logarithmic Integral
In mathematics, the logarithmic integral function or integral logarithm li(x) is a special function. It is relevant in problems of physics and has number theoretic significance.
Wikipédia
Logarithmic scale
A logarithmic scale (or log scale) is a way of displaying numerical data over a very wide range of values in a compact way. As opposed to a linear number line in which every unit of distance corresponds to adding by the same amount, on a logarithmic scale, every unit of length corresponds to multiplying the previous value by the same amount. Hence, such a scale is nonlinear: the numbers 1, 2, 3, 4, 5, and so on, are not equally spaced. Rather, the numbers 10, 100, 1000, 10000, and 100000 would be equally spaced. Likewise, the numbers 2, 4, 8, 16, 32, and so on, would be equally spaced. Often exponential growth curves are displayed on a log scale, otherwise they would increase too quickly to fit within a small graph.
