Double Integral Inequalities of Hermite-Hadamard-Type for ɸh-Convex Functions on Linear Spaces | Zendy

Fagbemigun Opeyemi Bosede | Zendy; Adesanmi Alao Mogbademu | Zendy; J. O. Olaleru | Zendy

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Double Integral Inequalities of Hermite-Hadamard-Type for ɸh-Convex Functions on Linear Spaces

Author(s) -

Fagbemigun Opeyemi Bosede,

Adesanmi Alao Mogbademu,

J. O. Olaleru

Publication year - 2019

Publication title -

journal of nepal mathematical society

Language(s) - English

Resource type - Journals

eISSN - 2616-0161

pISSN - 2616-0153

DOI - 10.3126/jnms.v2i2.33006

Subject(s) - mathematics , hadamard transform , hermite polynomials , convex function , convex analysis , pure mathematics , convexity , subderivative , type (biology) , convex combination , proper convex function , mathematical analysis , regular polygon , convex optimization , geometry , ecology , financial economics , economics , biology

The concept of φh-convexity is extended for functions defined on closed φh-convex subsets of linear spaces. Consequently, some double integral inequalities of Hermite-Hadamard type defined on timescaled linear spaces are established for φh-convex functions.

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