Research article

Least squares solutions of matrix equation $ AXB = C $ under semi-tensor product

  • Received: 24 January 2024 Revised: 22 March 2024 Accepted: 12 April 2024 Published: 19 April 2024
  • This paper mainly studies the least-squares solutions of matrix equation $ AXB = C $ under a semi-tensor product. According to the definition of the semi-tensor product, the equation is transformed into an ordinary matrix equation. Then, the least-squares solutions of matrix-vector and matrix equations respectively investigated by applying the derivation of matrix operations. Finally, the specific form of the least-squares solutions is given.

    Citation: Jin Wang. Least squares solutions of matrix equation $ AXB = C $ under semi-tensor product[J]. Electronic Research Archive, 2024, 32(5): 2976-2993. doi: 10.3934/era.2024136

    Related Papers:

  • This paper mainly studies the least-squares solutions of matrix equation $ AXB = C $ under a semi-tensor product. According to the definition of the semi-tensor product, the equation is transformed into an ordinary matrix equation. Then, the least-squares solutions of matrix-vector and matrix equations respectively investigated by applying the derivation of matrix operations. Finally, the specific form of the least-squares solutions is given.



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