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Filtros : "LYRA, JORGE LACERDA DE" "Foong, S K" Limpar

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  • Artigo de periodico

    Finite lattice systems with true critical behavior (1992)

    Lyra, Jorge Lacerda de; Foong, S K; Gallivan, T E

    Source: Physical Review D. Unidade: IF

    Assunto: FÍSICA DE PARTÍCULAS

    How to cite
    A citação é gerada automaticamente e pode não estar totalmente de acordo com as normas

    • ABNT

      LYRA, Jorge Lacerda de e FOONG, S K e GALLIVAN, T E. Finite lattice systems with true critical behavior. Physical Review D, v. 46, n. 4 , p. 1643-57, 1992Tradução . . Acesso em: 10 nov. 2024.

    • APA

      Lyra, J. L. de, Foong, S. K., & Gallivan, T. E. (1992). Finite lattice systems with true critical behavior. Physical Review D, 46( 4 ), 1643-57.

    • NLM

      Lyra JL de, Foong SK, Gallivan TE. Finite lattice systems with true critical behavior. Physical Review D. 1992 ;46( 4 ): 1643-57.[citado 2024 nov. 10 ]

    • Vancouver

      Lyra JL de, Foong SK, Gallivan TE. Finite lattice systems with true critical behavior. Physical Review D. 1992 ;46( 4 ): 1643-57.[citado 2024 nov. 10 ]

  • Artigo de periodico

    Quantitezed o (1,2) / o (2)x'Z IND.2' 'SIGMA' model has no continuum limit in four dimensions. I. Theoretical framework (1992)

    Lyra, Jorge Lacerda de; Dewitt, B; Foong, S K; Gallivan, T E; Harrington, R; Kapulkin, A; Myers, E; Polchinski, J

    Source: Physical Review D. Unidade: IF

    Assunto: FÍSICA DE PARTÍCULAS

    How to cite
    A citação é gerada automaticamente e pode não estar totalmente de acordo com as normas

    • ABNT

      LYRA, Jorge Lacerda de et al. Quantitezed o (1,2) / o (2)x'Z IND.2' 'SIGMA' model has no continuum limit in four dimensions. I. Theoretical framework. Physical Review D, v. 46, n. 6 , p. 2527, 1992Tradução . . Acesso em: 10 nov. 2024.

    • APA

      Lyra, J. L. de, Dewitt, B., Foong, S. K., Gallivan, T. E., Harrington, R., Kapulkin, A., et al. (1992). Quantitezed o (1,2) / o (2)x'Z IND.2' 'SIGMA' model has no continuum limit in four dimensions. I. Theoretical framework. Physical Review D, 46( 6 ), 2527.

    • NLM

      Lyra JL de, Dewitt B, Foong SK, Gallivan TE, Harrington R, Kapulkin A, Myers E, Polchinski J. Quantitezed o (1,2) / o (2)x'Z IND.2' 'SIGMA' model has no continuum limit in four dimensions. I. Theoretical framework. Physical Review D. 1992 ;46( 6 ): 2527.[citado 2024 nov. 10 ]

    • Vancouver

      Lyra JL de, Dewitt B, Foong SK, Gallivan TE, Harrington R, Kapulkin A, Myers E, Polchinski J. Quantitezed o (1,2) / o (2)x'Z IND.2' 'SIGMA' model has no continuum limit in four dimensions. I. Theoretical framework. Physical Review D. 1992 ;46( 6 ): 2527.[citado 2024 nov. 10 ]

  • Artigo de periodico

    Quantized o (1,2) / o (2)*z2 sigma model has no continuum limit in 4 dimensions. 2. Lattice simulation (1992)

    Lyra, Jorge Lacerda de; Dewitt, B; Foong, S K; Gallivan, T E; Harrington, R; Kapulkin, A; Myers, E; Polchinski, J

    Source: Physical Review D. Unidade: IF

    Assunto: FÍSICA DE PARTÍCULAS

    How to cite
    A citação é gerada automaticamente e pode não estar totalmente de acordo com as normas

    • ABNT

      LYRA, Jorge Lacerda de et al. Quantized o (1,2) / o (2)*z2 sigma model has no continuum limit in 4 dimensions. 2. Lattice simulation. Physical Review D, v. 46, n. 6 , p. 2538-52, 1992Tradução . . Acesso em: 10 nov. 2024.

    • APA

      Lyra, J. L. de, Dewitt, B., Foong, S. K., Gallivan, T. E., Harrington, R., Kapulkin, A., et al. (1992). Quantized o (1,2) / o (2)*z2 sigma model has no continuum limit in 4 dimensions. 2. Lattice simulation. Physical Review D, 46( 6 ), 2538-52.

    • NLM

      Lyra JL de, Dewitt B, Foong SK, Gallivan TE, Harrington R, Kapulkin A, Myers E, Polchinski J. Quantized o (1,2) / o (2)*z2 sigma model has no continuum limit in 4 dimensions. 2. Lattice simulation. Physical Review D. 1992 ;46( 6 ): 2538-52.[citado 2024 nov. 10 ]

    • Vancouver

      Lyra JL de, Dewitt B, Foong SK, Gallivan TE, Harrington R, Kapulkin A, Myers E, Polchinski J. Quantized o (1,2) / o (2)*z2 sigma model has no continuum limit in 4 dimensions. 2. Lattice simulation. Physical Review D. 1992 ;46( 6 ): 2538-52.[citado 2024 nov. 10 ]

  • Artigo de periodico

    Differentiability and continuity of quantum fields on a lattice (1991)

    Lyra, Jorge Lacerda de; Foong, S K; Gallivan, T E

    Source: Physical Review D. Unidade: IF

    Assunto: FÍSICA DE PARTÍCULAS

    How to cite
    A citação é gerada automaticamente e pode não estar totalmente de acordo com as normas

    • ABNT

      LYRA, Jorge Lacerda de e FOONG, S K e GALLIVAN, T E. Differentiability and continuity of quantum fields on a lattice. Physical Review D, v. 43, n. 2 , p. 476-84, 1991Tradução . . Acesso em: 10 nov. 2024.

    • APA

      Lyra, J. L. de, Foong, S. K., & Gallivan, T. E. (1991). Differentiability and continuity of quantum fields on a lattice. Physical Review D, 43( 2 ), 476-84.

    • NLM

      Lyra JL de, Foong SK, Gallivan TE. Differentiability and continuity of quantum fields on a lattice. Physical Review D. 1991 ;43( 2 ): 476-84.[citado 2024 nov. 10 ]

    • Vancouver

      Lyra JL de, Foong SK, Gallivan TE. Differentiability and continuity of quantum fields on a lattice. Physical Review D. 1991 ;43( 2 ): 476-84.[citado 2024 nov. 10 ]
  • 1

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