Your English writing platform
Discover LudwigSuggestions(2)
Exact(1)
Let (p C rightarrow C/G=: C') be the quotient map and pick an isomorphism ( pi _1(congcong pi _{g'}).
Similar(59)
Moreover, if π is the quotient map from B(H) to the Calkin algebra B(H /K(H), then π(A)≠π(B) and {π(A)}″=π(B).
Let X be the quotient space (W^{1,p}(Omega)/X_{0}).
Let R be the ramification divisor of the quotient map ( p : X rightarrow Y = X/G), and let (X^0 : = X {setminus } Sing(R)), which is G-invariant.
Locally, the quotient (G/H) can be embedded into (G) with the help of the map begin{aligned} gH mapsto P g) = gsigma (g)^{-1}, end{aligned}which is a local section of the quotient map (Grightarrow G/H).
The quotient map is branched on the three points ( x = 1, -1, infty ), so that Fix (H) consists of just a point (the above curve C).
Let ( Y = X/G) be a quotient algebraic variety, (p : X rightarrow Y) the quotient map.
For each, we define the quotient map (51).
commutes, where q is the quotient morphism.
The ultrapower of X, denoted by, is the quotient space equipped with the quotient norm.
The ultrapower of, denoted by, is the quotient space equipped with the quotient norm.
Write better and faster with AI suggestions while staying true to your unique style.
Since I tried Ludwig back in 2017, I have been constantly using it in both editing and translation. Ever since, I suggest it to my translators at ProSciEditing.

Justyna Jupowicz-Kozak
CEO of Professional Science Editing for Scientists @ prosciediting.com