BG-Volterra İntegral Denklemleri ve BG-Diferansiyel Denklemlerle İlişkisi

Abstract: In this study, the Volterra integral equations are defined in the sense of bigeometric calculus by the aid of bigeometric integral. The main aim of the study is to research the relationship between bigeometric Volterra integral equations and bigeometric differential equations.

“…As first order bigeometric derivative is 𝑓 𝜋 , taking one more time bigeometric derivative we get the second order bigeometric derivative which is denoted by 𝑓 𝜋𝜋 . According to this the second order bigeometric derivative can be given as below (Güngör, 2020); Similarly the 𝑛 𝑡ℎ order bigeometric derivative of 𝑓 is denoted by 𝑓 𝜋(𝑛) and it is written as (Güngör, 2020);…”

On Bigeometric Laplace Integral Transform

“…As first order bigeometric derivative is 𝑓 𝜋 , taking one more time bigeometric derivative we get the second order bigeometric derivative which is denoted by 𝑓 𝜋𝜋 . According to this the second order bigeometric derivative can be given as below (Güngör, 2020); Similarly the 𝑛 𝑡ℎ order bigeometric derivative of 𝑓 is denoted by 𝑓 𝜋(𝑛) and it is written as (Güngör, 2020);…”

On Bigeometric Laplace Integral Transform