TY  - Type of reference 
TI  - Weyl almost automorphic functions and applications 
AU  - M. Kostić 
AB  - In this paper, we reconsider the notion of a Weyl p-almost automorphic function introduced by S. Abbas [1] in 2012 and propose several new ways for introduction of the class of Weyl p-almost automorphic functions (1 ⩽ p < ∞). We first analyze the introduced classes of Weyl p-almost automorphic functions of type 1, jointly Weyl p-almost automorphic functions and Weyl p-almost automorphic functions of type 2 in the one-dimensional setting. After that, we introduce and analyze generalizations of these classes in the multi-dimensional setting, working with general Lebesgue spaces with variable exponents. We provide several illustrative examples and applications to the abstract Volterra integro-differential equations. 
DO  - 10.21494/ISTE.OP.2023.0998 
JF  - Advances in Pure and Applied Mathematics 
KW  - Weyl almost automorphic functions,  Weyl almost periodic functions,  double sequences,  Lebesgue spaces with variable exponents,  abstract Volterra integro-differential equations, Weyl almost automorphic functions,  Weyl almost periodic functions,  double sequences,  Lebesgue spaces with variable exponents,  abstract Volterra integro-differential equations,  
L1  - https://openscience.fr/IMG/pdf/iste_apam23v14n4_1.pdf 
LA  - en 
PB  - ISTE OpenScience 
DA  - 2023/09/8 
SN  - 1869-6090 
TT  - Les fonctions de Weyl presque automorphes et applications 
UR  - https://openscience.fr/Weyl-almost-automorphic-functions-and-applications 
IS  - Issue 4 (September 2023) 
VL  - 14 
ER  -