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Generalization of Tangential Complexes of Weight Three and Their Connections with Grassmannian Complex

Author

Listed:
  • Sadaqat Hussain
  • Nasreen Kausar
  • Sajida Kousar
  • Parameshwari Kattel
  • Tahir Shahzad
  • Ardashir Mohammadzadeh

Abstract

Following earlier work by Gangl, Cathelineaue, and others, Siddiqui defined the Siegel’s cross-ratio identity and Goncharov’s triple ratios over the truncated polynomial ring Fεν. They used these constructions to introduce both dialogarithmic and trilogarithmic tangential complexes of first order. They proposed various maps to relate first-order tangent complex to the Grassmannian complex. Later, we extended all the notions related to dialogarithmic complexes to a general order n. Now, this study is aimed to generalize all of the constructions associated to trilogarithmic tangential complexes to higher orders. We also propose morphisms between the tangent to Goncharov’s complex and Grassmannian subcomplex for general order. Moreover, we connect both of these complexes by demonstrating that the resulting diagrams are commutative. In this generalization process, the classical Newton’s identities are used. The results reveal that the tangent group TB3nF of a higher order and defining relations are feasible for all orders.

Suggested Citation

  • Sadaqat Hussain & Nasreen Kausar & Sajida Kousar & Parameshwari Kattel & Tahir Shahzad & Ardashir Mohammadzadeh, 2022. "Generalization of Tangential Complexes of Weight Three and Their Connections with Grassmannian Complex," Mathematical Problems in Engineering, Hindawi, vol. 2022, pages 1-11, April.
  • Handle: RePEc:hin:jnlmpe:5746202
    DOI: 10.1155/2022/5746202
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