differential structure

English

Alternative forms

• differentiable structure

Noun

differential structure (plural differential structures)

1. (topology) A structure defined for a (topological) manifold so that it supports differentiation of functions defined on it.
   • 2002, R.W. Carroll, Calculus Revisited, Springer, pages 12–37:

     First let ${\displaystyle (M,\tau )}$  be a topological space. The sheaf ${\displaystyle {\mathfrak {G}}}$  of real continuous functions on ${\displaystyle (M,\tau )}$  is said to be a differential structure on ${\displaystyle M}$  if for any open set ${\displaystyle U\in \tau }$ , any functions ${\displaystyle f_{i}\in {\mathfrak {G}}(U)}$ , and any ${\displaystyle w\in C^{\infty }(\mathbb {R} ^{n})}$ , the superposition ${\displaystyle w\circ (f_{1},\dots f_{n})\in {\mathfrak {G}}(U)}$ .

   • 2002, Donal J. Hurley, Michael A. Vandyck, Topics in Differential Geometry: A New Approach Using D-Differentiation‎^[1], Springer (with Praxis Publishing), page 29:

     It is important to emphasise that, among the various choices for ${\displaystyle \lambda _{jk}^{i}}$  and ${\displaystyle A_{\ j\ b}^{i\ a}}$ , some are intrinsic to the differential structure of the manifold ${\displaystyle {\mathcal {M}}}$ . In other words, among all the operators of ${\displaystyle D}$ -differentiation, some arise from the differential structure of ${\displaystyle {\mathcal {M}}}$ . […] On the other hand, there exist operators of ${\displaystyle D}$ -differentiation that do not follow from the differential structure of ${\displaystyle {\mathcal {M}}}$ .

   • 2010, Vladimir Igorevich Bogachev, Differentiable Measures and the Malliavin Calculus, American Mathematical Society, page 369:

     This chapter is concerned with differentiable measures on general measurable spaces and on measurable spaces equipped with certain differential structures enabling us to consider differentiations along vector fields.

   • 2015, Stephen Bruce Sontz, Principal Bundles: The Classical Case, Springer, page 12:

     Given a Hausdorff topological space ${\displaystyle M}$  with differential structures ${\displaystyle {\mathcal {A}}_{1}}$  and ${\displaystyle {\mathcal {A}}_{2}}$  (these being maximal smooth atlases), we say that ${\displaystyle {\mathcal {A}}_{1}}$  and ${\displaystyle {\mathcal {A}}_{1}}$  are equivalent if there is a diffeomorphism ${\displaystyle \phi :(M,{\mathcal {A}}_{1})\rightarrow (M,{\mathcal {A}}_{2})}$  from ${\displaystyle M}$  with the first differential structure to ${\displaystyle M}$  with the second differential structure. Note that ${\displaystyle \phi }$  need not be the identity function.

Usage notes

For a given natural number n and some k, which may be a non-negative integer or infinity, we speak of an n-dimensional C^k differential structure.

See also

• differentiable manifold
• differential manifold
• smooth manifold