Differential (infinitesimal)

For other uses of "differential" in mathematics, see Differential (mathematics). For more general uses, see Differential.

Part of a series of articles about

Calculus

Fundamental theorem

Differential

Definitions
Derivative (generalizations) Differential infinitesimal of a function total
Concepts
Differentiation notation Second derivative Third derivative Change of variables Implicit differentiation Related rates Taylor's theorem
Rules and identities
Sum Product Chain Power Quotient General Leibniz Faà di Bruno's formula

Integral

Definitions
Lists of integrals
Antiderivative Integral (improper) Riemann integral Lebesgue integration Contour integration
Integration by
Parts Discs Cylindrical shells Substitution (trigonometric) Partial fractions Order Reduction formulae

Series

Convergence tests
Geometric (arithmetico-geometric) Harmonic Alternating Power Binomial Taylor
Summand limit (term test) Ratio Root Integral Direct comparison Limit comparison Alternating series Cauchy condensation Dirichlet Abel

Vector

Theorems
Gradient Divergence Curl Laplacian Directional derivative Identities
Divergence Gradient Green's Kelvin–Stokes

Multivariable

Formalisms
Matrix Tensor Exterior Geometric
Definitions
Partial derivative Multiple integral Line integral Surface integral Volume integral Jacobian Hessian matrix

Specialized

The term differential is used in calculus to refer to an infinitesimal (infinitely small) change in some varying quantity. For example, if x is a variable, then a change in the value of x is often denoted Δx (pronounced delta x). The differential dx represents an infinitely small change in the variable x. The idea of an infinitely small or infinitely slow change is extremely useful intuitively, and there are a number of ways to make the notion mathematically precise.

Using calculus, it is possible to relate the infinitely small changes of various variables to each other mathematically using derivatives. If y is a function of x, then the differential dy of y is related to dx by the formula

\mathrm {d} y={\frac {\mathrm {d} y}{\mathrm {d} x}}\,\mathrm {d} x,

where dy/dx denotes the derivative of y with respect to x. This formula summarizes the intuitive idea that the derivative of y with respect to x is the limit of the ratio of differences Δy/Δx as Δx becomes infinitesimal.

There are several approaches for making the notion of differentials mathematically precise.

Differentials as linear maps. This approach underlies the definition of the derivative and the exterior derivative in differential geometry.^[1]
Differentials as nilpotent elements of commutative rings. This approach is popular in algebraic geometry.^[2]
Differentials in smooth models of set theory. This approach is known as synthetic differential geometry or smooth infinitesimal analysis and is closely related to the algebraic geometric approach, except that ideas from topos theory are used to hide the mechanisms by which nilpotent infinitesimals are introduced.^[3]
Differentials as infinitesimals in hyperreal number systems, which are extensions of the real numbers that contain invertible infinitesimals and infinitely large numbers. This is the approach of nonstandard analysis pioneered by Abraham Robinson.^[4]

These approaches are very different from each other, but they have in common the idea to be quantitative, i.e., to say not just that a differential is infinitely small, but how small it is.

History and usage

Differentials as linear maps

There is a simple way to make precise sense of differentials by regarding them as linear maps. One way to explain this point of view is to regard the variable x in an expression such as f(x) as a function on the real line, the standard coordinate or identity map, which takes a real number p to itself (x(p) = p): then f(x) denotes the composite f ∘ x of f with x, whose value at p is f(x(p)) = f(p). The differential df is then a function of f whose value at p (usually denoted df_p) is not a number, but a linear map from R to R. Since a linear map from R to R is given by a 1×1 matrix, it is essentially the same thing as a number, but the change in the point of view allows us to think of df_p as an infinitesimal and compare it with the standard infinitesimal dx_p, which is again just the identity map from R to R (a 1×1 matrix with entry 1). The identity map has the property that if ε is very small, then dx_p(ε) is very small, which enables us to regard it as infinitesimal. The differential df_p has the same property, because it is just a multiple of dx_p, and this multiple is the derivative f ′(p) by definition. We therefore obtain that df_p = f ′(p) dx_p, and hence df = f ′ dx. Thus we recover the idea that f ′ is the ratio of the differentials df and dx.

This would just be a trick were it not for the fact that:

it captures the idea of the derivative of f at p as the best linear approximation to f at p;
it has many generalizations.

For instance, if f is a function from Rⁿ to R, then we say that f is differentiable^[6] at p ∈ Rⁿ if there is a linear map df_p from Rⁿ to R such that for any ε > 0, there is a neighbourhood N of p such that for x ∈ N

\left|f(x)-f(p)-{\mathrm {d}}f_{p}(x-p)\right|<\varepsilon \left|x-p\right|.\,

We can now use the same trick as in the one-dimensional case and think of the expression f(x¹, x², …, xⁿ) as the composite of f with the standard coordinates x¹, x², …, xⁿ on Rⁿ (so that x^j(p) is the j-th component of p ∈ Rⁿ). Then the differentials (dx¹)_p, (dx²)_p, (dxⁿ)_p (at a point p) form a basis for the vector space of linear maps from Rⁿ to R and therefore, if f is differentiable at p, we can write df_p as a linear combination of these basis elements:

\mathrm {d} f_{p}=\sum _{j=1}^{n}D_{j}f(p)\,(\mathrm {d} x^{j})_{p}.

The coefficients D_jf(p) are (by definition) the partial derivatives of f at p with respect to x¹, x², …, xⁿ. Hence, if f is differentiable on all of Rⁿ, we can write, more concisely:

{\mathrm {d}}f={\frac {\partial f}{\partial x^{1}}}\,{\mathrm {d}}x^{1}+{\frac {\partial f}{\partial x^{2}}}\,{\mathrm {d}}x^{2}+\cdots +{\frac {\partial f}{\partial x^{n}}}\,{\mathrm {d}}x^{n}.

In the one-dimensional case this becomes

{\mathrm {d}}f={\frac {{\mathrm {d}}f}{{\mathrm {d}}x}}{\mathrm {d}}x

as before.

This idea generalizes straightforwardly to functions from Rⁿ to R^m. Furthermore, it has the decisive advantage over other definitions of the derivative that it is invariant under changes of coordinates. This means that the same idea can be used to define the differential of smooth maps between smooth manifolds.

Aside: Note that the existence of all the partial derivatives of f(x) at x is a necessary condition for the existence of a differential at x. However it is not a sufficient condition. For counterexamples, see Gâteaux derivative.

Algebraic geometry

In algebraic geometry, differentials and other infinitesimal notions are handled in a very explicit way by accepting that the coordinate ring or structure sheaf of a space may contain nilpotent elements. The simplest example is the ring of dual numbers R[ε], where ε² = 0.

This can be motivated by the algebro-geometric point of view on the derivative of a function f from R to R at a point p. For this, note first that f − f(p)1 (where 1 is the identity function) belongs to the ideal I_p of functions on R which vanish at p. If the derivative f vanishes at p, then f − f(p)1 belongs to the square I_p² of this ideal. Hence the derivative of f at p may be captured by the equivalence class [f − f(p)1] in the quotient space I_p/I_p², and the 1-jet of f (which encodes its value and its first derivative) is the equivalence class of f in the space of all functions modulo I_p². Algebraic geometers regard this equivalence class as the restriction of f to a thickened version of the point p whose coordinate ring is not R (which is the quotient space of functions on R modulo I_p) but R[ε] which is the quotient space of functions on R modulo I_p². Such a thickened point is a simple example of a scheme.^[2]

Synthetic differential geometry

A third approach to infinitesimals is the method of synthetic differential geometry^[7] or smooth infinitesimal analysis.^[8] This is closely related to the algebraic-geometric approach, except that the infinitesimals are more implicit and intuitive. The main idea of this approach is to replace the category of sets with another category of smoothly varying sets which is a topos. In this category, one can define the real numbers, smooth functions, and so on, but the real numbers automatically contain nilpotent infinitesimals, so these do not need to be introduced by hand as in the algebraic geometric approach. However the logic in this new category is not identical to the familiar logic of the category of sets: in particular, the law of the excluded middle does not hold. This means that set-theoretic mathematical arguments only extend to smooth infinitesimal analysis if they are constructive (e.g., do not use proof by contradiction). Some regard this disadvantage as a positive thing, since it forces one to find constructive arguments wherever they are available.

Nonstandard analysis

The final approach to infinitesimals again involves extending the real numbers, but in a less drastic way. In the nonstandard analysis approach there are no nilpotent infinitesimals, only invertible ones, which may be viewed as the reciprocals of infinitely large numbers.^[4] Such extensions of the real numbers may be constructed explicitly using equivalence classes of sequences of real numbers, so that, for example, the sequence (1, 1/2, 1/3, …, 1/n, …) represents an infinitesimal. The first-order logic of this new set of hyperreal numbers is the same as the logic for the usual real numbers, but the completeness axiom (which involves second-order logic) does not hold. Nevertheless, this suffices to develop an elementary and quite intuitive approach to calculus using infinitesimals, see transfer principle.

Notes

↑ Darling 1994.
1 2 Eisenbud & Harris 1998.
↑ See Kock 2006 and Moerdijk & Reyes 1991.
1 2 See Robinson 1996 and Keisler 1986.
↑ Boyer 1991.
↑ See, for instance, Apostol 1967.
↑ See Kock 2006 and Lawvere 1968.
↑ See Moerdijk & Reyes 1991 and Bell 1998.

References

Apostol, Tom M. (1967), Calculus (2nd ed.), Wiley, ISBN 978-0-471-00005-1 .
Bell, John L. (1998), Invitation to Smooth Infinitesimal Analysis (PDF) .
Boyer, Carl B. (1991), "Archimedes of Syracuse", A History of Mathematics (2nd ed.), John Wiley & Sons, Inc., ISBN 978-0-471-54397-8 .
Darling, R. W. R. (1994), Differential forms and connections, Cambridge, UK: Cambridge University Press, ISBN 978-0-521-46800-8 .
Eisenbud, David; Harris, Joe (1998), The Geometry of Schemes, Springer-Verlag, ISBN 978-0-387-98637-1
Keisler, H. Jerome (1986), Elementary Calculus: An Infinitesimal Approach (2nd ed.) .
Kock, Anders (2006), Synthetic Differential Geometry (PDF) (2nd ed.), Cambridge University Press .
Lawvere, F.W. (1968), Outline of synthetic differential geometry (PDF) (published 1998) .
Moerdijk, I.; Reyes, G.E. (1991), Models for Smooth Infinitesimal Analysis, Springer-Verlag .
Robinson, Abraham (1996), Non-standard analysis, Princeton University Press, ISBN 978-0-691-04490-3 .

Infinitesimals

History	Adequality Leibniz's notation Integral symbol Criticism of non-standard analysis The Analyst The Method of Mechanical Theorems Cavalieri's principle Method of indivisibles

Related branches	Non-standard analysis Non-standard calculus Internal set theory Synthetic differential geometry Constructive non-standard analysis Infinitesimal strain theory (physics)

Formalizations	Differentials Hyperreal numbers Dual numbers Surreal numbers

Individual concepts	Standard part function Transfer principle Hyperinteger Increment theorem Monad Internal set Levi-Civita field Hyperfinite set Law of Continuity Overspill Microcontinuity Transcendental law of homogeneity

Scientists	Gottfried Wilhelm Leibniz Abraham Robinson Pierre de Fermat Augustin-Louis Cauchy Leonhard Euler

Textbooks	Analyse des Infiniment Petits Elementary Calculus Cours d'Analyse

This article is issued from Wikipedia - version of the 4/17/2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.