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Foundations, Volume 3, Issue 2 (June 2023) – 13 articles

Cover Story (view full-size image): The dynamic equilibrium between death and regeneration is well established at the cell level. Conversely, no study has investigated the homeostatic control of shape at the whole organism level through processes involving apoptosis. To address this fundamental biological question, we took advantage of the morphological and functional properties of the carnivorous sponge Lycopodina hypogea. During its feeding cycle, this sponge undergoes spectacular shape changes. This unusual mode of nutrition provides a unique opportunity to better understand the processes involved in cell renewal and regeneration in adult tissues. Throughout these processes, cell proliferation and apoptosis are interconnected key actors. Therefore, L. hypogea is an ideal organism to study how molecular and cellular processes are mechanistically coupled to ensure global shape homeostasis. View this paper
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40 pages, 480 KiB  
Review
A Comprehensive Review of the Hermite–Hadamard Inequality Pertaining to Quantum Calculus
by Muhammad Tariq, Sotiris K. Ntouyas and Asif Ali Shaikh
Foundations 2023, 3(2), 340-379; https://doi.org/10.3390/foundations3020026 - 15 Jun 2023
Cited by 2 | Viewed by 1303
Abstract
A review of results on Hermite–Hadamard (H-H) type inequalities in quantum calculus, associated with a variety of classes of convexities, is presented. In the various classes of convexities this includes classical convex functions, quasi-convex functions, p-convex functions, (p,s) [...] Read more.
A review of results on Hermite–Hadamard (H-H) type inequalities in quantum calculus, associated with a variety of classes of convexities, is presented. In the various classes of convexities this includes classical convex functions, quasi-convex functions, p-convex functions, (p,s)-convex functions, modified (p,s)-convex functions, (p,h)-convex functions, tgs-convex functions, η-quasi-convex functions, ϕ-convex functions, (α,m)-convex functions, ϕ-quasi-convex functions, and coordinated convex functions. Quantum H-H type inequalities via preinvex functions and Green functions are also presented. Finally, H-H type inequalities for (p,q)-calculus, h-calculus, and (qh)-calculus are also included. Full article
5 pages, 214 KiB  
Editorial
Editorial for the Special Issue of Foundations “Recent Advances in Fractional Differential Equations and Inclusions”
by Sotiris K. Ntouyas
Foundations 2023, 3(2), 335-339; https://doi.org/10.3390/foundations3020025 - 15 Jun 2023
Viewed by 985
Abstract
The subject of fractional calculus addresses the research of asserted fractional derivatives and integrations over complex domains and their utilization [...] Full article
(This article belongs to the Section Mathematical Sciences)
12 pages, 1324 KiB  
Brief Report
Deriving an Electric Wave Equation from Weber’s Electrodynamics
by Qingsong Li and Simon Maher
Foundations 2023, 3(2), 323-334; https://doi.org/10.3390/foundations3020024 - 7 Jun 2023
Viewed by 2108
Abstract
Weber’s electrodynamics presents an alternative theory to the widely accepted Maxwell–Lorentz electromagnetism. It is founded on the concept of direct action between particles, and has recently gained some momentum through theoretical and experimental advancements. However, a major criticism remains: the lack of a [...] Read more.
Weber’s electrodynamics presents an alternative theory to the widely accepted Maxwell–Lorentz electromagnetism. It is founded on the concept of direct action between particles, and has recently gained some momentum through theoretical and experimental advancements. However, a major criticism remains: the lack of a comprehensive electromagnetic wave equation for free space. Our motivation in this research article is to address this criticism, in some measure, by deriving an electric wave equation from Weber’s electrodynamics based on the axiom of vacuum polarization. Although this assumption has limited experimental evidence and its validity remains a topic of debate among researchers, it has been shown to be useful in the calculation of various quantum mechanical phenomena. Based on this concept, and beginning with Weber’s force, we derive an expression which resembles the familiar electric field wave equation derived from Maxwell’s equations. Full article
(This article belongs to the Special Issue Advances in Fundamental Physics II)
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33 pages, 481 KiB  
Article
Galerkin Finite Element Approximation of a Stochastic Semilinear Fractional Wave Equation Driven by Fractionally Integrated Additive Noise
by Bernard A. Egwu and Yubin Yan
Foundations 2023, 3(2), 290-322; https://doi.org/10.3390/foundations3020023 - 29 May 2023
Viewed by 4921
Abstract
We investigate the application of the Galerkin finite element method to approximate a stochastic semilinear space–time fractional wave equation. The equation is driven by integrated additive noise, and the time fractional order α(1,2). The existence of [...] Read more.
We investigate the application of the Galerkin finite element method to approximate a stochastic semilinear space–time fractional wave equation. The equation is driven by integrated additive noise, and the time fractional order α(1,2). The existence of a unique solution of the problem is proved by using the Banach fixed point theorem, and the spatial and temporal regularities of the solution are established. The noise is approximated with the piecewise constant function in time in order to obtain a stochastic regularized semilinear space–time wave equation which is then approximated using the Galerkin finite element method. The optimal error estimates are proved based on the various smoothing properties of the Mittag–Leffler functions. Numerical examples are provided to demonstrate the consistency between the theoretical findings and the obtained numerical results. Full article
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15 pages, 309 KiB  
Article
Random Solutions for Generalized Caputo Periodic and Non-Local Boundary Value Problems
by Bashir Ahmad, Mokhtar Boumaaza, Abdelkrim Salim and Mouffak Benchohra
Foundations 2023, 3(2), 275-289; https://doi.org/10.3390/foundations3020022 - 29 May 2023
Cited by 1 | Viewed by 1176
Abstract
In this article, we present some results on the existence and uniqueness of random solutions to a non-linear implicit fractional differential equation involving the generalized Caputo fractional derivative operator and supplemented with non-local and periodic boundary conditions. We make use of the fixed [...] Read more.
In this article, we present some results on the existence and uniqueness of random solutions to a non-linear implicit fractional differential equation involving the generalized Caputo fractional derivative operator and supplemented with non-local and periodic boundary conditions. We make use of the fixed point theorems due to Banach and Krasnoselskii to derive the desired results. Examples illustrating the obtained results are also presented. Full article
15 pages, 321 KiB  
Article
Existence in the Large for Caputo Fractional Multi-Order Systems with Initial Conditions
by Zachary Denton and Aghalaya S. Vatsala
Foundations 2023, 3(2), 260-274; https://doi.org/10.3390/foundations3020021 - 26 May 2023
Cited by 2 | Viewed by 1106
Abstract
One of the key applications of the Caputo fractional derivative is that the fractional order of the derivative can be utilized as a parameter to improve the mathematical model by comparing it to real data. To do so, we must first establish that [...] Read more.
One of the key applications of the Caputo fractional derivative is that the fractional order of the derivative can be utilized as a parameter to improve the mathematical model by comparing it to real data. To do so, we must first establish that the solution to the fractional dynamic equations exists and is unique on its interval of existence. The vast majority of existence and uniqueness results available in the literature, including Picard’s method, for ordinary and/or fractional dynamic equations will result in only local existence results. In this work, we generalize Picard’s method to obtain the existence and uniqueness of the solution of the nonlinear multi-order Caputo derivative system with initial conditions, on the interval where the solution is bounded. The challenge presented to establish our main result is in developing a generalized form of the Mittag–Leffler function that will cooperate with all the different fractional derivative orders involved in the multi-order nonlinear Caputo fractional differential system. In our work, we have developed the generalized Mittag–Leffler function that suffices to establish the generalized Picard’s method for the nonlinear multi-order system. As a result, we have obtained the existence and uniqueness of the nonlinear multi-order Caputo derivative system with initial conditions in the large. In short, the solution exists and is unique on the interval where the norm of the solution is bounded. The generalized Picard’s method we have developed is both a theoretical and a computational method of computing the unique solution on the interval of its existence. Full article
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19 pages, 355 KiB  
Article
Coupled Systems of Nonlinear Proportional Fractional Differential Equations of the Hilfer-Type with Multi-Point and Integro-Multi-Strip Boundary Conditions
by Sotiris K. Ntouyas, Bashir Ahmad and Jessada Tariboon
Foundations 2023, 3(2), 241-259; https://doi.org/10.3390/foundations3020020 - 24 May 2023
Cited by 3 | Viewed by 2790
Abstract
In this paper, we study a coupled system of nonlinear proportional fractional differential equations of the Hilfer-type with a new kind of multi-point and integro-multi-strip boundary conditions. Results on the existence and uniqueness of the solutions are achieved by using Banach’s contraction principle, [...] Read more.
In this paper, we study a coupled system of nonlinear proportional fractional differential equations of the Hilfer-type with a new kind of multi-point and integro-multi-strip boundary conditions. Results on the existence and uniqueness of the solutions are achieved by using Banach’s contraction principle, the Leray–Schauder alternative and the well-known fixed-point theorem of Krasnosel’skiĭ. Finally, the main results are illustrated by constructing numerical examples. Full article
10 pages, 382 KiB  
Communication
Emergent Gravity Simulations for Schwarzschild–de Sitter Scenarios
by Arno Keppens
Foundations 2023, 3(2), 231-240; https://doi.org/10.3390/foundations3020019 - 14 May 2023
Viewed by 1412
Abstract
Building on previous work that considered gravity to emerge from the collective behaviour of discrete, pre-geometric spacetime constituents, this work identifies these constituents with gravitons and rewrites their effective gravity-inducing interaction in terms of local variables for Schwarzschild–de Sitter scenarios. This formulation enables [...] Read more.
Building on previous work that considered gravity to emerge from the collective behaviour of discrete, pre-geometric spacetime constituents, this work identifies these constituents with gravitons and rewrites their effective gravity-inducing interaction in terms of local variables for Schwarzschild–de Sitter scenarios. This formulation enables graviton-level simulations of entire emergent gravitational systems. A first simulation scenario confirms that the effective graviton interaction induces the emergence of spacetime curvature upon the insertion of a graviton condensate into a flat spacetime background. A second simulation scenario demonstrates that free fall can be considered to be fine-tuned towards a geodesic trajectory, for which the graviton flux, as experienced by a test mass, disappears. Full article
(This article belongs to the Special Issue Advances in Fundamental Physics II)
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11 pages, 4502 KiB  
Review
Using the Carnivorous Sponge Lycopodina hypogea as a Nonclassical Model for Understanding Apoptosis-Mediated Shape Homeostasis at the Organism Level
by Stephen Baghdiguian, Emilie Le Goff, Laure Paradis, Jean Vacelet and Nelly Godefroy
Foundations 2023, 3(2), 220-230; https://doi.org/10.3390/foundations3020018 - 18 Apr 2023
Cited by 1 | Viewed by 1850
Abstract
The dynamic equilibrium between death and regeneration is well established at the cell level. Conversely, no study has investigated the homeostatic control of shape at the whole organism level through processes involving apoptosis. To address this fundamental biological question, we took advantage of [...] Read more.
The dynamic equilibrium between death and regeneration is well established at the cell level. Conversely, no study has investigated the homeostatic control of shape at the whole organism level through processes involving apoptosis. To address this fundamental biological question, we took advantage of the morphological and functional properties of the carnivorous sponge Lycopodina hypogea. During its feeding cycle, this sponge undergoes spectacular shape changes. Starved animals display many elongated filaments to capture prey. After capture, prey are digested in the absence of any centralized digestive structure. Strikingly, the elongated filaments actively regress and reform to maintain a constant, homeostatically controlled number and size of filaments in resting sponges. This unusual mode of nutrition provides a unique opportunity to better understand the processes involved in cell renewal and regeneration in adult tissues. Throughout these processes, cell proliferation and apoptosis are interconnected key actors. Therefore, L. hypogea is an ideal organism to study how molecular and cellular processes are mechanistically coupled to ensure global shape homeostasis. Full article
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21 pages, 334 KiB  
Article
Different Mass Definitions and Their Pluses and Minuses Related to Gravity
by Espen Gaarder Haug
Foundations 2023, 3(2), 199-219; https://doi.org/10.3390/foundations3020017 - 18 Apr 2023
Cited by 3 | Viewed by 3221
Abstract
The discussion of what matter and mass are has been going on for more than 2500 years. Much has been discovered about mass in various areas, such as relativity theory and modern quantum mechanics. Still, quantum mechanics has not been unified with gravity. [...] Read more.
The discussion of what matter and mass are has been going on for more than 2500 years. Much has been discovered about mass in various areas, such as relativity theory and modern quantum mechanics. Still, quantum mechanics has not been unified with gravity. This indicates that there is perhaps something essential not understood about mass in relation to gravity. In relation to gravity, several new mass definitions have been suggested in recent years. We will provide here an overview of a series of potential mass definitions and how some of them appear likely preferable for a potential improved understanding of gravity at a quantum level. This also has implications for practical things such as getting gravity predictions with minimal uncertainty. Full article
(This article belongs to the Special Issue Advances in Fundamental Physics II)
18 pages, 327 KiB  
Article
A Comparison Result for the Nabla Fractional Difference Operator
by Jagan Mohan Jonnalagadda
Foundations 2023, 3(2), 181-198; https://doi.org/10.3390/foundations3020016 - 12 Apr 2023
Viewed by 1201
Abstract
This article establishes a comparison principle for the nabla fractional difference operator ρ(a)ν, 1<ν<2. For this purpose, we consider a two-point nabla fractional boundary value problem with separated boundary conditions and derive [...] Read more.
This article establishes a comparison principle for the nabla fractional difference operator ρ(a)ν, 1<ν<2. For this purpose, we consider a two-point nabla fractional boundary value problem with separated boundary conditions and derive the corresponding Green’s function. I prove that this Green’s function satisfies a positivity property. Then, I deduce a relatively general comparison result for the considered boundary value problem. Full article
14 pages, 407 KiB  
Article
Controllability of a Class of Heterogeneous Networked Systems
by Abhijith Ajayakumar and Raju K. George
Foundations 2023, 3(2), 167-180; https://doi.org/10.3390/foundations3020015 - 6 Apr 2023
Viewed by 1423
Abstract
This paper examines the controllability of a class of heterogeneous networked systems where the nodes are linear time-invariant systems (LTI), and the network topology is triangularizable. The literature contains necessary and sufficient conditions for the controllability of such systems where the control input [...] Read more.
This paper examines the controllability of a class of heterogeneous networked systems where the nodes are linear time-invariant systems (LTI), and the network topology is triangularizable. The literature contains necessary and sufficient conditions for the controllability of such systems where the control input matrices are identical in each node. Here, we extend this result to a class of heterogeneous systems where the control input matrices are distinct in each node. Additionally, we discuss the controllability of a more general system with triangular network topology and obtain necessary and sufficient conditions for controllability. Theoretical results are supplemented with numerical examples. Full article
(This article belongs to the Section Mathematical Sciences)
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13 pages, 314 KiB  
Article
A Newton-like Midpoint Method for Solving Equations in Banach Space
by Samundra Regmi, Ioannis K. Argyros, Gagan Deep and Laxmi Rathour
Foundations 2023, 3(2), 154-166; https://doi.org/10.3390/foundations3020014 - 27 Mar 2023
Cited by 1 | Viewed by 1259
Abstract
The present paper includes the local and semilocal convergence analysis of a fourth-order method based on the quadrature formula in Banach spaces. The weaker hypotheses used are based only on the first Fréchet derivative. The new approach provides the residual errors, number of [...] Read more.
The present paper includes the local and semilocal convergence analysis of a fourth-order method based on the quadrature formula in Banach spaces. The weaker hypotheses used are based only on the first Fréchet derivative. The new approach provides the residual errors, number of iterations, convergence radii, expected order of convergence, and estimates of the uniqueness of the solution. Such estimates are not provided in the approaches using Taylor expansions involving higher-order derivatives, which may not exist or may be very expensive or impossible to compute. Numerical examples, including a nonlinear integral equation and a partial differential equation, are provided to validate the theoretical results. Full article
(This article belongs to the Section Mathematical Sciences)
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