In this article, we give a new notion of (p, q) derivatives for continuous functions on coordinates. We also derive post quantum Ostrowski-type inequalities for coordinated convex functions. Our significant results ar...
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In this article, we give a new notion of (p, q) derivatives for continuous functions on coordinates. We also derive post quantum Ostrowski-type inequalities for coordinated convex functions. Our significant results are considered as the generalizations of other results that appeared in the literature.
In this paper, we establish several new inequalities for q-differentiable coordinated convex functions that are related to the right side of Hermite-Hadamard inequalities for coordinated convex functions. We also show...
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In this paper, we establish several new inequalities for q-differentiable coordinated convex functions that are related to the right side of Hermite-Hadamard inequalities for coordinated convex functions. We also show that the inequalities proved in this paper generalize the results given in earlier works. Moreover, we give some examples in order to demonstrate our main results.
Integral inequality is an interesting mathematical model due to its wide and significant applications in mathematical analysis and fractional calculus. In this study, authors have established some generalized Raina fr...
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Integral inequality is an interesting mathematical model due to its wide and significant applications in mathematical analysis and fractional calculus. In this study, authors have established some generalized Raina fractional integral inequalities using an (l1,h1)-(l2,h2)-convexfunction on coordinates. Also, we obtain an integral identity for partial differentiable functions. As an effect of this result, two interesting integral inequalities for the (l1,h1)-(l2,h2)-convexfunction on coordinates are given. Finally, we can say that our findings recapture some recent results as special cases.
In this investigation, we demonstrate the quantum version of Montgomery identity for the functions of two variables. Then we use the result to derive some new Ostrowski-type inequalities for the functions of two varia...
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In this investigation, we demonstrate the quantum version of Montgomery identity for the functions of two variables. Then we use the result to derive some new Ostrowski-type inequalities for the functions of two variables via quantum integrals. We also consider the particular cases of the key results and offer some new integral inequalities.
The aim of this paper is to establish some new inequalities of Hermite-Hadamard and Fejer type using generalized h-convex and generalized (h(1), h(2))-convexfunctions on the co-ordinates. Some known results are recap...
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The aim of this paper is to establish some new inequalities of Hermite-Hadamard and Fejer type using generalized h-convex and generalized (h(1), h(2))-convexfunctions on the co-ordinates. Some known results are recaptured from our results as special cases.
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