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<ArticleSet>
  <Article>
    <Journal>
      <PublisherName>Science and Education Publishing</PublisherName>
      <JournalTitle>American Journal of Applied Mathematics and Statistics</JournalTitle>
      <Issn>2328-7292</Issn>
      <Volume>2</Volume>
      <Issue>1</Issue>
      <PubDate PubStatus="epublish">
        <Year>2014</Year>
        <Month>01</Month>
        <Day>15</Day>
      </PubDate>
    </Journal>
    <ArticleTitle>A Study on New Sequence of Functions Involving H-Function</ArticleTitle>
    <FirstPage>34</FirstPage>
    <LastPage>39</LastPage>
    <Language>EN</Language>
    <AuthorList>
      <Author>
        <FirstName>Praveen</FirstName>
        <LastName>Agarwal</LastName>
        <Affiliation>Department of Mathematics, Anand International College of Engineering, Jaipur, India</Affiliation>
      </Author>
      <Author>
        <FirstName>Mehar</FirstName>
        <LastName>Chand</LastName>
      </Author>
      <Author>
        <FirstName>Saket</FirstName>
        <LastName>Dwivedi</LastName>
      </Author>
    </AuthorList>
    <ArticleIdList>
      <ArticleId IdType="pii">AJAMS2014216</ArticleId>
      <ArticleId IdType="doi">10.12691/ajams-2-1-6</ArticleId>
    </ArticleIdList>
    <History>
      <PubDate PubStatus="received">
        <Year>2013</Year>
        <Month>10</Month>
        <Day>12</Day>
      </PubDate>
      <PubDate PubStatus="revised">
        <Year>2014</Year>
        <Month>01</Month>
        <Day>01</Day>
      </PubDate>
      <PubDate PubStatus="accepted">
        <Year>2014</Year>
        <Month>01</Month>
        <Day>15</Day>
      </PubDate>
    </History>
    <Abstract>A remarkably large number of operational techniques have drawn the attention of several researchers in the study of sequence of functions and polynomials. Very recently, Agarwal and Chand gave certain new sequence of functions involving the special functions in their series of papers. In this sequel, here, we aim to introduce a new sequence of functions involving the Generalized Mellin-Barnes Type of Contour Integrals by using operational techniques. Some generating relations and finite summation formulae of the sequence presented here are also considered. These generating relations and finite summation formulae are unified in nature and act as key formulae from which, we can obtain as their special cases.</Abstract>
  </Article>
</ArticleSet>