Itô formula

A formula by which one can compute the stochastic differential of a function of an Itô process. Let a (random) function $ f ( t , x ) $ be defined for all real $ x $ and $ t $, be twice continuously differentiable in $ x $ and once continuously differentiable in $ t $, and suppose that a process $ X _ {t} $ has stochastic differential

$$ d X _ {t} = a ( t) d t + \sigma ( t) d W _ {t} . $$

Then the stochastic differential of the process $ f ( t , X _ {t} ) $ has the form

$$ d f ( t , X _ {t} ) = \ [ f _ {t} ^ { \prime } ( t , X _ {t} ) + a ( t) f _ {x} ^ { \prime } ( t , X _ {t} ) + $$

$$ + {} \sigma ^ {2} ( t) f _ {xx} ^ { \prime\prime } ( t , X _ {t} ) /2 ] d t + \sigma ( t) f _ {x} ^ { \prime } ( t , X _ {t} ) d W _ {t} . $$

This formula was obtained by K. Itô [1]. An analogous formula holds for vectorial $ X _ {t} $ and $ f ( t , x ) $. Itô's formula can be generalized to certain classes of non-smooth functions [2] and semi-martingales (cf. Semi-martingale).

References

Comments

Nowadays, Itô's formula is more generally the usual name given to the change of variable formula in a stochastic integral with respect to a semi-martingale. Either in its narrow or enlarged meaning, Itô's formula is one of the cornerstones of modern stochastic integral and differential calculus.

References