PATH INTEGRAL: AN INVERSION OF PATH DERIVATIVES

Shusheng Fu

doi:10.2307/44152493

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Home > Journals > Real Anal. Exchange > Volume 20 > Issue 1 > Article

1994/1995 PATH INTEGRAL: AN INVERSION OF PATH DERIVATIVES

Shusheng Fu

Real Anal. Exchange 20(1): 340-346 (1994/1995). DOI: 10.2307/44152493

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Abstract

We introduce the concept of a path integral which integrates the path derivatives and recovers the primitives. The path integral is an extension of the Henstock integral. Moreover, we introduce the $E$ -strong Lusin condition. Using this new concept, we give a descriptive definition of a path integral and a monotone theorem of a path differentiable function.