Let H be a real Hilbert space, and let C be a nonempty closed convex subset of H. Let α > 0, and let A be an α-inverse strongly-monotone mapping of C into H. Let T be a generalized hybrid mapping of C into H. Let B andW be maximal monotone operators on H such that the domains of B andW are included in C. Let 0 < k < 1, and let g be a k-contraction of H into itself. Let V be a γ -strongly monoto...

Abstract We study properties of $\mathcal {A}$ A -harmonic and -superharmonic functions involving an operator having generalized Orlicz growth. Our framework embraces reflexive spaces, as well natural variants variable exponent double-phase spaces. In particular, Harnack’s Principle Minimum are provided for f...

In this paper we show that for any fusion \(\mathcal {B}\) of an association scheme {A}\), the generalized Hamming \(H(n,\mathcal {B})\) is a nontrivial {A})\). We analyze case where {A}\) on strongly-regular graph, and determine parameters all graphs which scheme, \(H(2,\mathcal {A})\), has extra fusions, in addition to one arising from trivial {A}\).

In this paper, a new approach for solving the second order fuzzy differential equations (FDE) with fuzzy initial value, under strongly generalized H-differentiability is presented. Solving first order fuzzy differential equations by extending 1-cut solution of the original problem and solving fuzzy integro-differential equations has been investigated by some authors (see for example cite{darabi...