Asosiy kontentga oʻtish
AkademIndex

Mahsulotlar

Ishlab chiquvchilar uchun

AkademBaseEkotizim uchun ochiq API
Maqola

Existence and uniqueness of some Cauchy type problems in fractional q-difference calculus

Serikbol ShaimardanL.N. Gumilyev Eurasian National UniversityPer O. Å. PerssonN.S. TokmagambetovL.N. Gumilyev Eurasian National University
2020en
ABI

Annotatsiya

In this paper we derive a sufficient condition for the existence of a unique solution of a Cauchy type q-fractional problem (involving the fractional q-derivative of Riemann-Liouville type) for some nonlinear differential equations. The key technique is to first prove that this Cauchy type q-fractional problem is equivalent to a corresponding Volterra q-integral equation. Moreover, we define the q-analogue of the Hilfer fractional derivative or composite fractional derivative operator and prove some similar new equivalence, existence and uniqueness results as above. Finally, some examples are presented to illustrate our main results in cases where we can even give concrete formulas for these unique solutions.

Hali tarjima qilinmagan

Identifikatorlar

Iqtiboslar va manbalar

3 ta iqtibos0 ta foydalanilgan manba