Surface states

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In mathematics, the symmetric derivative is an operation related to the ordinary derivative.

It is defined as:

limh0f(x+h)f(xh)2h.

A function is symmetrically differentiable at a point x if its symmetric derivative exists at that point. It can be shown that if a function is differentiable at a point, it is also symmetrically differentiable, but the converse is not true. The best known example is the absolute value function f(x) = |x|, which is not differentiable at x = 0, but is symmetrically differentiable here with symmetric derivative 0. It can also be shown that the symmetric derivative at a point is the mean of the one-sided derivatives at that point, if they both exist.

Examples

1. The modulus function,f(x)=|x|
For absolute value function, or the modulus function, we have, at x=0,

fs(0)=limh0f(0+h)f(0h)2hfs(0)=limh0f(h)f(h)2hfs(0)=limh0|h||h|2hfs(0)=limh0h((h))2hfs(0)=0

only, where remember that h>0 and h0, and hence |h| is equal to (h) only! So, we observe that the symmetric derivative of the modulus function exists at x=0,and is equal to zero, even if its ordinary derivative won't exist at that point (due to a "sharp" turn in the curve at x=0).

. Note the sharp turn at x=0, leading to non differentiability of the curve at x=0. The function hence possesses no ordinary derivative at x=0. Symmetric Derivative, however exists for the function at x=0.

2. The function f(x)=1/x2
For the function f(x)=1/x2, we have, at x=0,

fs(0)=limh0f(0+h)f(0h)2hfs(0)=limh0f(h)f(h)2hfs(0)=limh01/h21/(h)22hfs(0)=limh01/h21/h22hfs(0)=0

only, where again, h>0 and h0. See that again, for this function, its symmetric derivative exists at x=0, its ordinary derivative does not occur at x=0, due to discontinuity in the curve at x=0 (i.e. essential discontinuity).

Graph of y=1/x². Note the discontinuity at x=0. The function hence possesses no ordinary derivative at x=0. Symmetric Derivative, however exists for the function at x=0.

3. The Dirichlet function, defined as:

f(x)={1,if x is rational0,if x is irrational

may be analysed to realize that it has symmetric derivatives x but not x, i.e. symmetric derivative exists for rational numbers bur not for irrational numbers.

See also

References

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